[a45622a] | 1 | ##################################################################### |
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| 2 | #This software was developed by the University of Tennessee as part of the |
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| 3 | #Distributed Data Analysis of Neutron Scattering Experiments (DANSE) |
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| 4 | #project funded by the US National Science Foundation. |
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| 5 | #See the license text in license.txt |
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| 6 | #copyright 2010, University of Tennessee |
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| 7 | ###################################################################### |
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[2e94cbde] | 8 | |
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| 9 | """ |
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[a45622a] | 10 | This module implements invariant and its related computations. |
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[2e94cbde] | 11 | |
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[a45622a] | 12 | :author: Gervaise B. Alina/UTK |
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| 13 | :author: Mathieu Doucet/UTK |
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| 14 | :author: Jae Cho/UTK |
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[c75a8ed] | 15 | |
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[75047cf] | 16 | """ |
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| 17 | import math |
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[ef9ed58] | 18 | import numpy |
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[75047cf] | 19 | |
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[e0459a0] | 20 | from sans.dataloader.data_info import Data1D as LoaderData1D |
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[75047cf] | 21 | |
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[b6666d4] | 22 | # The minimum q-value to be used when extrapolating |
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| 23 | Q_MINIMUM = 1e-5 |
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| 24 | |
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| 25 | # The maximum q-value to be used when extrapolating |
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| 26 | Q_MAXIMUM = 10 |
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| 27 | |
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| 28 | # Number of steps in the extrapolation |
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| 29 | INTEGRATION_NSTEPS = 1000 |
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| 30 | |
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[59a41066] | 31 | class Transform(object): |
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[ef9ed58] | 32 | """ |
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[a45622a] | 33 | Define interface that need to compute a function or an inverse |
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| 34 | function given some x, y |
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[59a41066] | 35 | """ |
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[76c1727] | 36 | |
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| 37 | def linearize_data(self, data): |
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[59a41066] | 38 | """ |
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[a45622a] | 39 | Linearize data so that a linear fit can be performed. |
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| 40 | Filter out the data that can't be transformed. |
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| 41 | |
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| 42 | :param data: LoadData1D instance |
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| 43 | |
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[76c1727] | 44 | """ |
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| 45 | # Check that the vector lengths are equal |
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| 46 | assert(len(data.x)==len(data.y)) |
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| 47 | if data.dy is not None: |
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| 48 | assert(len(data.x)==len(data.dy)) |
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| 49 | dy = data.dy |
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| 50 | else: |
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[bdd162f] | 51 | dy = numpy.ones(len(data.y)) |
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[76c1727] | 52 | |
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| 53 | # Transform the data |
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[bdd162f] | 54 | data_points = zip(data.x, data.y, dy) |
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| 55 | |
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[76c1727] | 56 | output_points = [(self.linearize_q_value(p[0]), |
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| 57 | math.log(p[1]), |
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[cbaa2f4] | 58 | p[2]/p[1]) for p in data_points if p[0]>0 and \ |
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| 59 | p[1]>0 and p[2]>0] |
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[76c1727] | 60 | |
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| 61 | x_out, y_out, dy_out = zip(*output_points) |
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| 62 | |
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[bdd162f] | 63 | # Create Data1D object |
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[76c1727] | 64 | x_out = numpy.asarray(x_out) |
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| 65 | y_out = numpy.asarray(y_out) |
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| 66 | dy_out = numpy.asarray(dy_out) |
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[bdd162f] | 67 | linear_data = LoaderData1D(x=x_out, y=y_out, dy=dy_out) |
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[76c1727] | 68 | |
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| 69 | return linear_data |
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[bdd162f] | 70 | |
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| 71 | def get_allowed_bins(self, data): |
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[76c1727] | 72 | """ |
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[a45622a] | 73 | Goes through the data points and returns a list of boolean values |
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| 74 | to indicate whether each points is allowed by the model or not. |
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| 75 | |
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| 76 | :param data: Data1D object |
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[59a41066] | 77 | """ |
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[cbaa2f4] | 78 | return [p[0]>0 and p[1]>0 and p[2]>0 for p in zip(data.x, data.y, |
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| 79 | data.dy)] |
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[bdd162f] | 80 | |
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[aafa962] | 81 | def linearize_q_value(self, value): |
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[59a41066] | 82 | """ |
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[a45622a] | 83 | Transform the input q-value for linearization |
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[59a41066] | 84 | """ |
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[82703a1] | 85 | return NotImplemented |
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[aafa962] | 86 | |
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[bdd162f] | 87 | def extract_model_parameters(self, constant, slope, dconstant=0, dslope=0): |
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[59a41066] | 88 | """ |
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[a45622a] | 89 | set private member |
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[59a41066] | 90 | """ |
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[82703a1] | 91 | return NotImplemented |
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[aafa962] | 92 | |
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| 93 | def evaluate_model(self, x): |
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[59a41066] | 94 | """ |
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[a45622a] | 95 | Returns an array f(x) values where f is the Transform function. |
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[59a41066] | 96 | """ |
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[82703a1] | 97 | return NotImplemented |
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| 98 | |
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[bdd162f] | 99 | def evaluate_model_errors(self, x): |
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| 100 | """ |
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[a45622a] | 101 | Returns an array of I(q) errors |
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[bdd162f] | 102 | """ |
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| 103 | return NotImplemented |
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| 104 | |
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[59a41066] | 105 | class Guinier(Transform): |
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| 106 | """ |
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[a45622a] | 107 | class of type Transform that performs operations related to guinier |
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| 108 | function |
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[59a41066] | 109 | """ |
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| 110 | def __init__(self, scale=1, radius=60): |
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| 111 | Transform.__init__(self) |
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| 112 | self.scale = scale |
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| 113 | self.radius = radius |
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[bdd162f] | 114 | ## Uncertainty of scale parameter |
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| 115 | self.dscale = 0 |
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| 116 | ## Unvertainty of radius parameter |
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| 117 | self.dradius = 0 |
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[76c1727] | 118 | |
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[aafa962] | 119 | def linearize_q_value(self, value): |
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[82703a1] | 120 | """ |
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[a45622a] | 121 | Transform the input q-value for linearization |
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| 122 | |
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| 123 | :param value: q-value |
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| 124 | |
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| 125 | :return: q*q |
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[82703a1] | 126 | """ |
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| 127 | return value * value |
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[59a41066] | 128 | |
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[bdd162f] | 129 | def extract_model_parameters(self, constant, slope, dconstant=0, dslope=0): |
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[a45622a] | 130 | """ |
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| 131 | assign new value to the scale and the radius |
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[82703a1] | 132 | """ |
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[bdd162f] | 133 | self.scale = math.exp(constant) |
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[07eb396] | 134 | if slope > 0: |
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| 135 | slope = 0.0 |
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[bdd162f] | 136 | self.radius = math.sqrt(-3 * slope) |
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| 137 | # Errors |
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| 138 | self.dscale = math.exp(constant)*dconstant |
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[07eb396] | 139 | if slope == 0.0: |
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| 140 | n_zero = -1.0e-24 |
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| 141 | self.dradius = -3.0/2.0/math.sqrt(-3 * n_zero)*dslope |
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| 142 | else: |
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| 143 | self.dradius = -3.0/2.0/math.sqrt(-3 * slope)*dslope |
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[59a41066] | 144 | |
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[c4f52e3] | 145 | return [self.radius, self.scale], [self.dradius, self.dscale] |
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| 146 | |
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[aafa962] | 147 | def evaluate_model(self, x): |
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[59a41066] | 148 | """ |
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[a45622a] | 149 | return F(x)= scale* e-((radius*x)**2/3) |
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[59a41066] | 150 | """ |
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| 151 | return self._guinier(x) |
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[aafa962] | 152 | |
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[bdd162f] | 153 | def evaluate_model_errors(self, x): |
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| 154 | """ |
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[a45622a] | 155 | Returns the error on I(q) for the given array of q-values |
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| 156 | |
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| 157 | :param x: array of q-values |
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[bdd162f] | 158 | """ |
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[cbaa2f4] | 159 | p1 = numpy.array([self.dscale * math.exp(-((self.radius * q)**2/3)) \ |
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| 160 | for q in x]) |
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| 161 | p2 = numpy.array([self.scale * math.exp(-((self.radius * q)**2/3))\ |
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| 162 | * (-(q**2/3)) * 2 * self.radius * self.dradius for q in x]) |
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[bdd162f] | 163 | diq2 = p1*p1 + p2*p2 |
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| 164 | return numpy.array( [math.sqrt(err) for err in diq2] ) |
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| 165 | |
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[59a41066] | 166 | def _guinier(self, x): |
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| 167 | """ |
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[240bdc80] | 168 | Retrieve the guinier function after apply an inverse guinier function |
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[a45622a] | 169 | to x |
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| 170 | Compute a F(x) = scale* e-((radius*x)**2/3). |
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| 171 | |
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| 172 | :param x: a vector of q values |
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| 173 | :param scale: the scale value |
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| 174 | :param radius: the guinier radius value |
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| 175 | |
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| 176 | :return: F(x) |
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[59a41066] | 177 | """ |
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| 178 | # transform the radius of coming from the inverse guinier function to a |
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| 179 | # a radius of a guinier function |
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| 180 | if self.radius <= 0: |
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[cbaa2f4] | 181 | msg = "Rg expected positive value, but got %s"%self.radius |
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| 182 | raise ValueError(msg) |
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[59a41066] | 183 | value = numpy.array([math.exp(-((self.radius * i)**2/3)) for i in x ]) |
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| 184 | return self.scale * value |
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| 185 | |
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| 186 | class PowerLaw(Transform): |
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| 187 | """ |
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[a45622a] | 188 | class of type transform that perform operation related to power_law |
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| 189 | function |
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[ef9ed58] | 190 | """ |
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[59a41066] | 191 | def __init__(self, scale=1, power=4): |
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| 192 | Transform.__init__(self) |
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| 193 | self.scale = scale |
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| 194 | self.power = power |
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[76c1727] | 195 | |
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[aafa962] | 196 | def linearize_q_value(self, value): |
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| 197 | """ |
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[a45622a] | 198 | Transform the input q-value for linearization |
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| 199 | |
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| 200 | :param value: q-value |
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| 201 | |
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| 202 | :return: log(q) |
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[aafa962] | 203 | """ |
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| 204 | return math.log(value) |
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| 205 | |
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[bdd162f] | 206 | def extract_model_parameters(self, constant, slope, dconstant=0, dslope=0): |
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[82703a1] | 207 | """ |
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[a45622a] | 208 | Assign new value to the scale and the power |
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[82703a1] | 209 | """ |
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[bdd162f] | 210 | self.power = -slope |
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| 211 | self.scale = math.exp(constant) |
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| 212 | |
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| 213 | # Errors |
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| 214 | self.dscale = math.exp(constant)*dconstant |
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[c4f52e3] | 215 | self.dpower = -dslope |
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| 216 | |
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| 217 | return [self.power, self.scale], [self.dpower, self.dscale] |
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[82703a1] | 218 | |
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[aafa962] | 219 | def evaluate_model(self, x): |
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[59a41066] | 220 | """ |
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[a45622a] | 221 | given a scale and a radius transform x, y using a power_law |
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| 222 | function |
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[59a41066] | 223 | """ |
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| 224 | return self._power_law(x) |
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[bdd162f] | 225 | |
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| 226 | def evaluate_model_errors(self, x): |
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| 227 | """ |
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[a45622a] | 228 | Returns the error on I(q) for the given array of q-values |
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| 229 | :param x: array of q-values |
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[bdd162f] | 230 | """ |
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| 231 | p1 = numpy.array([self.dscale * math.pow(q, -self.power) for q in x]) |
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[cbaa2f4] | 232 | p2 = numpy.array([self.scale * self.power * math.pow(q, -self.power-1)\ |
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| 233 | * self.dpower for q in x]) |
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[bdd162f] | 234 | diq2 = p1*p1 + p2*p2 |
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| 235 | return numpy.array( [math.sqrt(err) for err in diq2] ) |
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[59a41066] | 236 | |
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| 237 | def _power_law(self, x): |
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| 238 | """ |
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[a45622a] | 239 | F(x) = scale* (x)^(-power) |
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| 240 | when power= 4. the model is porod |
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| 241 | else power_law |
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| 242 | The model has three parameters: :: |
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| 243 | 1. x: a vector of q values |
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| 244 | 2. power: power of the function |
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| 245 | 3. scale : scale factor value |
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| 246 | |
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| 247 | :param x: array |
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| 248 | :return: F(x) |
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[59a41066] | 249 | """ |
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| 250 | if self.power <= 0: |
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[cbaa2f4] | 251 | msg = "Power_law function expected positive power," |
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| 252 | msg += " but got %s"%self.power |
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| 253 | raise ValueError(msg) |
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[59a41066] | 254 | if self.scale <= 0: |
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[cbaa2f4] | 255 | msg = "scale expected positive value, but got %s"%self.scale |
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| 256 | raise ValueError(msg) |
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[59a41066] | 257 | |
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| 258 | value = numpy.array([ math.pow(i, -self.power) for i in x ]) |
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| 259 | return self.scale * value |
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[ef9ed58] | 260 | |
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[59a41066] | 261 | class Extrapolator: |
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[75047cf] | 262 | """ |
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[a45622a] | 263 | Extrapolate I(q) distribution using a given model |
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[75047cf] | 264 | """ |
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[bdd162f] | 265 | def __init__(self, data, model=None): |
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[75047cf] | 266 | """ |
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[a45622a] | 267 | Determine a and b given a linear equation y = ax + b |
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| 268 | |
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| 269 | If a model is given, it will be used to linearize the data before |
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[cbaa2f4] | 270 | the extrapolation is performed. If None, |
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| 271 | a simple linear fit will be done. |
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[a45622a] | 272 | |
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| 273 | :param data: data containing x and y such as y = ax + b |
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| 274 | :param model: optional Transform object |
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[75047cf] | 275 | """ |
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| 276 | self.data = data |
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[bdd162f] | 277 | self.model = model |
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[59a41066] | 278 | |
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[2a11d09] | 279 | # Set qmin as the lowest non-zero value |
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| 280 | self.qmin = Q_MINIMUM |
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| 281 | for q_value in self.data.x: |
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[59a41066] | 282 | if q_value > 0: |
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[2a11d09] | 283 | self.qmin = q_value |
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| 284 | break |
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| 285 | self.qmax = max(self.data.x) |
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[bdd162f] | 286 | |
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| 287 | def fit(self, power=None, qmin=None, qmax=None): |
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[75047cf] | 288 | """ |
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[a45622a] | 289 | Fit data for y = ax + b return a and b |
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| 290 | |
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| 291 | :param power: a fixed, otherwise None |
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| 292 | :param qmin: Minimum Q-value |
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| 293 | :param qmax: Maximum Q-value |
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[75047cf] | 294 | """ |
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[bdd162f] | 295 | if qmin is None: |
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| 296 | qmin = self.qmin |
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| 297 | if qmax is None: |
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| 298 | qmax = self.qmax |
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| 299 | |
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| 300 | # Identify the bin range for the fit |
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| 301 | idx = (self.data.x >= qmin) & (self.data.x <= qmax) |
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| 302 | |
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[437a9f0] | 303 | fx = numpy.zeros(len(self.data.x)) |
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[59a41066] | 304 | |
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[bdd162f] | 305 | # Uncertainty |
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[cbaa2f4] | 306 | if type(self.data.dy)==numpy.ndarray and \ |
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[78ecdcc] | 307 | len(self.data.dy)==len(self.data.x) and \ |
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| 308 | numpy.all(self.data.dy>0): |
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[3082632] | 309 | sigma = self.data.dy |
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[2a11d09] | 310 | else: |
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| 311 | sigma = numpy.ones(len(self.data.x)) |
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[78ecdcc] | 312 | |
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[9b6497bb] | 313 | # Compute theory data f(x) |
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[bdd162f] | 314 | fx[idx] = self.data.y[idx] |
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[472b11c] | 315 | |
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[bdd162f] | 316 | # Linearize the data |
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| 317 | if self.model is not None: |
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[cbaa2f4] | 318 | linearized_data = self.model.linearize_data(\ |
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| 319 | LoaderData1D(self.data.x[idx], |
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[bdd162f] | 320 | fx[idx], |
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[cbaa2f4] | 321 | dy = sigma[idx])) |
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[bdd162f] | 322 | else: |
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| 323 | linearized_data = LoaderData1D(self.data.x[idx], |
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| 324 | fx[idx], |
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| 325 | dy = sigma[idx]) |
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[59a41066] | 326 | |
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[472b11c] | 327 | ##power is given only for function = power_law |
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| 328 | if power != None: |
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[bdd162f] | 329 | sigma2 = linearized_data.dy * linearized_data.dy |
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[eb62193] | 330 | a = -(power) |
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[bdd162f] | 331 | b = (numpy.sum(linearized_data.y/sigma2) \ |
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| 332 | - a*numpy.sum(linearized_data.x/sigma2))/numpy.sum(1.0/sigma2) |
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| 333 | |
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[82703a1] | 334 | |
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[cbaa2f4] | 335 | deltas = linearized_data.x*a + \ |
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| 336 | numpy.ones(len(linearized_data.x))*b-linearized_data.y |
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[bdd162f] | 337 | residuals = numpy.sum(deltas*deltas/sigma2) |
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[78ecdcc] | 338 | |
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[bdd162f] | 339 | err = math.fabs(residuals) / numpy.sum(1.0/sigma2) |
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| 340 | return [a, b], [0, math.sqrt(err)] |
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| 341 | else: |
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| 342 | A = numpy.vstack([ linearized_data.x/linearized_data.dy, |
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| 343 | 1.0/linearized_data.dy]).T |
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[cbaa2f4] | 344 | (p, residuals, rank, s) = numpy.linalg.lstsq(A, |
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| 345 | linearized_data.y/linearized_data.dy) |
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[bdd162f] | 346 | |
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| 347 | # Get the covariance matrix, defined as inv_cov = a_transposed * a |
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| 348 | err = numpy.zeros(2) |
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| 349 | try: |
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| 350 | inv_cov = numpy.dot(A.transpose(), A) |
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| 351 | cov = numpy.linalg.pinv(inv_cov) |
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| 352 | err_matrix = math.fabs(residuals) * cov |
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| 353 | err = [math.sqrt(err_matrix[0][0]), math.sqrt(err_matrix[1][1])] |
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| 354 | except: |
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| 355 | err = [-1.0, -1.0] |
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| 356 | |
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| 357 | return p, err |
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[aafa962] | 358 | |
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[b6666d4] | 359 | |
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[75047cf] | 360 | class InvariantCalculator(object): |
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| 361 | """ |
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[a45622a] | 362 | Compute invariant if data is given. |
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| 363 | Can provide volume fraction and surface area if the user provides |
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| 364 | Porod constant and contrast values. |
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| 365 | |
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| 366 | :precondition: the user must send a data of type DataLoader.Data1D |
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| 367 | the user provide background and scale values. |
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| 368 | |
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| 369 | :note: Some computations depends on each others. |
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[75047cf] | 370 | """ |
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| 371 | def __init__(self, data, background=0, scale=1 ): |
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| 372 | """ |
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[a45622a] | 373 | Initialize variables. |
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| 374 | |
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| 375 | :param data: data must be of type DataLoader.Data1D |
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[cbaa2f4] | 376 | :param background: Background value. The data will be corrected |
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| 377 | before processing |
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| 378 | :param scale: Scaling factor for I(q). The data will be corrected |
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| 379 | before processing |
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[75047cf] | 380 | """ |
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[b6666d4] | 381 | # Background and scale should be private data member if the only way to |
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| 382 | # change them are by instantiating a new object. |
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| 383 | self._background = background |
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| 384 | self._scale = scale |
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[7182d96] | 385 | # slit height for smeared data |
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| 386 | self._smeared = None |
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[b6666d4] | 387 | # The data should be private |
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| 388 | self._data = self._get_data(data) |
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[7182d96] | 389 | # get the dxl if the data is smeared: This is done only once on init. |
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[16f60cb] | 390 | if self._data.dxl != None and self._data.dxl.all() >0: |
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[7182d96] | 391 | # assumes constant dxl |
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[16f60cb] | 392 | self._smeared = self._data.dxl[0] |
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[f31ab59] | 393 | |
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[b6666d4] | 394 | # Since there are multiple variants of Q*, you should force the |
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| 395 | # user to use the get method and keep Q* a private data member |
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| 396 | self._qstar = None |
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| 397 | |
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| 398 | # You should keep the error on Q* so you can reuse it without |
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| 399 | # recomputing the whole thing. |
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| 400 | self._qstar_err = 0 |
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[75047cf] | 401 | |
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[b6666d4] | 402 | # Extrapolation parameters |
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| 403 | self._low_extrapolation_npts = 4 |
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[59a41066] | 404 | self._low_extrapolation_function = Guinier() |
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[4e80ae0] | 405 | self._low_extrapolation_power = None |
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[90e5ca1] | 406 | self._low_extrapolation_power_fitted = None |
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[ef9ed58] | 407 | |
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[b6666d4] | 408 | self._high_extrapolation_npts = 4 |
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[59a41066] | 409 | self._high_extrapolation_function = PowerLaw() |
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[4e80ae0] | 410 | self._high_extrapolation_power = None |
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[90e5ca1] | 411 | self._high_extrapolation_power_fitted = None |
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[75047cf] | 412 | |
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[2e94cbde] | 413 | # Extrapolation range |
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| 414 | self._low_q_limit = Q_MINIMUM |
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| 415 | |
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[b6666d4] | 416 | def _get_data(self, data): |
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[75047cf] | 417 | """ |
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[a45622a] | 418 | :note: this function must be call before computing any type |
---|
| 419 | of invariant |
---|
| 420 | |
---|
| 421 | :return: new data = self._scale *data - self._background |
---|
[75047cf] | 422 | """ |
---|
[b6666d4] | 423 | if not issubclass(data.__class__, LoaderData1D): |
---|
| 424 | #Process only data that inherited from DataLoader.Data_info.Data1D |
---|
| 425 | raise ValueError,"Data must be of type DataLoader.Data1D" |
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[6d55d81] | 426 | #from copy import deepcopy |
---|
[82703a1] | 427 | new_data = (self._scale * data) - self._background |
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[bdd162f] | 428 | |
---|
| 429 | # Check that the vector lengths are equal |
---|
| 430 | assert(len(new_data.x)==len(new_data.y)) |
---|
| 431 | |
---|
| 432 | # Verify that the errors are set correctly |
---|
| 433 | if new_data.dy is None or len(new_data.x) != len(new_data.dy) or \ |
---|
| 434 | (min(new_data.dy)==0 and max(new_data.dy)==0): |
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| 435 | new_data.dy = numpy.ones(len(new_data.x)) |
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[82703a1] | 436 | return new_data |
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| 437 | |
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[c4f52e3] | 438 | def _fit(self, model, qmin=Q_MINIMUM, qmax=Q_MAXIMUM, power=None): |
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[75047cf] | 439 | """ |
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[a45622a] | 440 | fit data with function using |
---|
| 441 | data = self._get_data() |
---|
| 442 | fx = Functor(data , function) |
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| 443 | y = data.y |
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| 444 | slope, constant = linalg.lstsq(y,fx) |
---|
| 445 | |
---|
| 446 | :param qmin: data first q value to consider during the fit |
---|
| 447 | :param qmax: data last q value to consider during the fit |
---|
| 448 | :param power : power value to consider for power-law |
---|
| 449 | :param function: the function to use during the fit |
---|
| 450 | |
---|
| 451 | :return a: the scale of the function |
---|
| 452 | :return b: the other parameter of the function for guinier will be radius |
---|
| 453 | for power_law will be the power value |
---|
[ef9ed58] | 454 | """ |
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[bdd162f] | 455 | extrapolator = Extrapolator(data=self._data, model=model) |
---|
| 456 | p, dp = extrapolator.fit(power=power, qmin=qmin, qmax=qmax) |
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[82703a1] | 457 | |
---|
[cbaa2f4] | 458 | return model.extract_model_parameters(constant=p[1], slope=p[0], |
---|
| 459 | dconstant=dp[1], dslope=dp[0]) |
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[ef9ed58] | 460 | |
---|
| 461 | def _get_qstar(self, data): |
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[75047cf] | 462 | """ |
---|
[a45622a] | 463 | Compute invariant for pinhole data. |
---|
| 464 | This invariant is given by: :: |
---|
| 465 | |
---|
| 466 | q_star = x0**2 *y0 *dx0 +x1**2 *y1 *dx1 |
---|
[7182d96] | 467 | + ..+ xn**2 *yn *dxn for non smeared data |
---|
| 468 | |
---|
| 469 | q_star = dxl0 *x0 *y0 *dx0 +dxl1 *x1 *y1 *dx1 |
---|
| 470 | + ..+ dlxn *xn *yn *dxn for smeared data |
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[a45622a] | 471 | |
---|
[669aaf9] | 472 | where n >= len(data.x)-1 |
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[7182d96] | 473 | dxl = slit height dQl |
---|
[75047cf] | 474 | dxi = 1/2*(xi+1 - xi) + (xi - xi-1) |
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[3bb37ef] | 475 | dx0 = (x1 - x0)/2 |
---|
| 476 | dxn = (xn - xn-1)/2 |
---|
[a45622a] | 477 | |
---|
| 478 | :param data: the data to use to compute invariant. |
---|
| 479 | |
---|
| 480 | :return q_star: invariant value for pinhole data. q_star > 0 |
---|
[75047cf] | 481 | """ |
---|
[ef9ed58] | 482 | if len(data.x) <= 1 or len(data.y) <= 1 or len(data.x)!= len(data.y): |
---|
| 483 | msg = "Length x and y must be equal" |
---|
[cbaa2f4] | 484 | msg += " and greater than 1; got x=%s, y=%s"%(len(data.x), |
---|
| 485 | len(data.y)) |
---|
[ef9ed58] | 486 | raise ValueError, msg |
---|
| 487 | else: |
---|
[7182d96] | 488 | # Take care of smeared data |
---|
| 489 | if self._smeared is None: |
---|
| 490 | gx = data.x * data.x |
---|
| 491 | # assumes that len(x) == len(dxl). |
---|
| 492 | else: |
---|
| 493 | gx = data.dxl * data.x |
---|
| 494 | |
---|
[ef9ed58] | 495 | n = len(data.x)- 1 |
---|
| 496 | #compute the first delta q |
---|
[3bb37ef] | 497 | dx0 = (data.x[1] - data.x[0])/2 |
---|
[ef9ed58] | 498 | #compute the last delta q |
---|
[3bb37ef] | 499 | dxn = (data.x[n] - data.x[n-1])/2 |
---|
[ef9ed58] | 500 | sum = 0 |
---|
[7182d96] | 501 | sum += gx[0] * data.y[0] * dx0 |
---|
| 502 | sum += gx[n] * data.y[n] * dxn |
---|
[ef9ed58] | 503 | |
---|
| 504 | if len(data.x) == 2: |
---|
| 505 | return sum |
---|
| 506 | else: |
---|
[cbaa2f4] | 507 | #iterate between for element different |
---|
| 508 | #from the first and the last |
---|
[ef9ed58] | 509 | for i in xrange(1, n-1): |
---|
| 510 | dxi = (data.x[i+1] - data.x[i-1])/2 |
---|
[7182d96] | 511 | sum += gx[i] * data.y[i] * dxi |
---|
[ef9ed58] | 512 | return sum |
---|
| 513 | |
---|
[bdd162f] | 514 | def _get_qstar_uncertainty(self, data): |
---|
[75047cf] | 515 | """ |
---|
[a45622a] | 516 | Compute invariant uncertainty with with pinhole data. |
---|
| 517 | This uncertainty is given as follow: :: |
---|
| 518 | |
---|
| 519 | dq_star = math.sqrt[(x0**2*(dy0)*dx0)**2 + |
---|
| 520 | (x1**2 *(dy1)*dx1)**2 + ..+ (xn**2 *(dyn)*dxn)**2 ] |
---|
| 521 | where n >= len(data.x)-1 |
---|
| 522 | dxi = 1/2*(xi+1 - xi) + (xi - xi-1) |
---|
| 523 | dx0 = (x1 - x0)/2 |
---|
| 524 | dxn = (xn - xn-1)/2 |
---|
| 525 | dyn: error on dy |
---|
| 526 | |
---|
| 527 | :param data: |
---|
| 528 | :note: if data doesn't contain dy assume dy= math.sqrt(data.y) |
---|
[bdd162f] | 529 | """ |
---|
[ef9ed58] | 530 | if len(data.x) <= 1 or len(data.y) <= 1 or \ |
---|
[bdd162f] | 531 | len(data.x) != len(data.y) or \ |
---|
| 532 | (data.dy is not None and (len(data.dy) != len(data.y))): |
---|
[ef9ed58] | 533 | msg = "Length of data.x and data.y must be equal" |
---|
| 534 | msg += " and greater than 1; got x=%s, y=%s"%(len(data.x), |
---|
| 535 | len(data.y)) |
---|
| 536 | raise ValueError, msg |
---|
| 537 | else: |
---|
| 538 | #Create error for data without dy error |
---|
[bdd162f] | 539 | if data.dy is None: |
---|
[3fc01c5] | 540 | dy = math.sqrt(data.y) |
---|
[ef9ed58] | 541 | else: |
---|
| 542 | dy = data.dy |
---|
[7182d96] | 543 | # Take care of smeared data |
---|
| 544 | if self._smeared is None: |
---|
| 545 | gx = data.x * data.x |
---|
| 546 | # assumes that len(x) == len(dxl). |
---|
| 547 | else: |
---|
| 548 | gx = data.dxl * data.x |
---|
| 549 | |
---|
[ef9ed58] | 550 | n = len(data.x) - 1 |
---|
| 551 | #compute the first delta |
---|
[3bb37ef] | 552 | dx0 = (data.x[1] - data.x[0])/2 |
---|
[ef9ed58] | 553 | #compute the last delta |
---|
[3bb37ef] | 554 | dxn= (data.x[n] - data.x[n-1])/2 |
---|
[ef9ed58] | 555 | sum = 0 |
---|
[7182d96] | 556 | sum += (gx[0] * dy[0] * dx0)**2 |
---|
| 557 | sum += (gx[n] * dy[n] * dxn)**2 |
---|
[ef9ed58] | 558 | if len(data.x) == 2: |
---|
| 559 | return math.sqrt(sum) |
---|
| 560 | else: |
---|
[cbaa2f4] | 561 | #iterate between for element different |
---|
| 562 | #from the first and the last |
---|
[ef9ed58] | 563 | for i in xrange(1, n-1): |
---|
| 564 | dxi = (data.x[i+1] - data.x[i-1])/2 |
---|
[7182d96] | 565 | sum += (gx[i] * dy[i] * dxi)**2 |
---|
[ef9ed58] | 566 | return math.sqrt(sum) |
---|
[b6666d4] | 567 | |
---|
[aafa962] | 568 | def _get_extrapolated_data(self, model, npts=INTEGRATION_NSTEPS, |
---|
| 569 | q_start=Q_MINIMUM, q_end=Q_MAXIMUM): |
---|
| 570 | """ |
---|
[a45622a] | 571 | :return: extrapolate data create from data |
---|
[aafa962] | 572 | """ |
---|
| 573 | #create new Data1D to compute the invariant |
---|
| 574 | q = numpy.linspace(start=q_start, |
---|
[bdd162f] | 575 | stop=q_end, |
---|
| 576 | num=npts, |
---|
| 577 | endpoint=True) |
---|
[aafa962] | 578 | iq = model.evaluate_model(q) |
---|
[bdd162f] | 579 | diq = model.evaluate_model_errors(q) |
---|
[aafa962] | 580 | |
---|
[bdd162f] | 581 | result_data = LoaderData1D(x=q, y=iq, dy=diq) |
---|
[7182d96] | 582 | if self._smeared != None: |
---|
| 583 | result_data.dxl = self._smeared * numpy.ones(len(q)) |
---|
[aafa962] | 584 | return result_data |
---|
[76c1727] | 585 | |
---|
[6d55d81] | 586 | def get_data(self): |
---|
| 587 | """ |
---|
[a45622a] | 588 | :return: self._data |
---|
[6d55d81] | 589 | """ |
---|
| 590 | return self._data |
---|
| 591 | |
---|
[90e5ca1] | 592 | def get_extrapolation_power(self, range='high'): |
---|
| 593 | """ |
---|
[cbaa2f4] | 594 | :return: the fitted power for power law function for a given |
---|
| 595 | extrapolation range |
---|
[90e5ca1] | 596 | """ |
---|
| 597 | if range == 'low': |
---|
| 598 | return self._low_extrapolation_power_fitted |
---|
| 599 | return self._high_extrapolation_power_fitted |
---|
| 600 | |
---|
[bdd162f] | 601 | def get_qstar_low(self): |
---|
[75047cf] | 602 | """ |
---|
[a45622a] | 603 | Compute the invariant for extrapolated data at low q range. |
---|
| 604 | |
---|
| 605 | Implementation: |
---|
| 606 | data = self._get_extra_data_low() |
---|
| 607 | return self._get_qstar() |
---|
[b6666d4] | 608 | |
---|
[a45622a] | 609 | :return q_star: the invariant for data extrapolated at low q. |
---|
[75047cf] | 610 | """ |
---|
[aafa962] | 611 | # Data boundaries for fitting |
---|
[ef9ed58] | 612 | qmin = self._data.x[0] |
---|
[437a9f0] | 613 | qmax = self._data.x[self._low_extrapolation_npts - 1] |
---|
[aafa962] | 614 | |
---|
[2a11d09] | 615 | # Extrapolate the low-Q data |
---|
[c4f52e3] | 616 | p, dp = self._fit(model=self._low_extrapolation_function, |
---|
| 617 | qmin=qmin, |
---|
| 618 | qmax=qmax, |
---|
| 619 | power=self._low_extrapolation_power) |
---|
| 620 | self._low_extrapolation_power_fitted = p[0] |
---|
[bdd162f] | 621 | |
---|
| 622 | # Distribution starting point |
---|
[2e94cbde] | 623 | self._low_q_limit = Q_MINIMUM |
---|
[3bb37ef] | 624 | if Q_MINIMUM >= qmin: |
---|
[2e94cbde] | 625 | self._low_q_limit = qmin/10 |
---|
[82703a1] | 626 | |
---|
[cbaa2f4] | 627 | data = self._get_extrapolated_data(\ |
---|
| 628 | model=self._low_extrapolation_function, |
---|
| 629 | npts=INTEGRATION_NSTEPS, |
---|
| 630 | q_start=self._low_q_limit, q_end=qmin) |
---|
[bdd162f] | 631 | |
---|
| 632 | # Systematic error |
---|
| 633 | # If we have smearing, the shape of the I(q) distribution at low Q will |
---|
[992199e] | 634 | # may not be a Guinier or simple power law. The following is |
---|
| 635 | # a conservative estimation for the systematic error. |
---|
[cbaa2f4] | 636 | err = qmin*qmin*math.fabs((qmin-self._low_q_limit)*\ |
---|
| 637 | (data.y[0] - data.y[INTEGRATION_NSTEPS-1])) |
---|
[bdd162f] | 638 | return self._get_qstar(data), self._get_qstar_uncertainty(data)+err |
---|
| 639 | |
---|
| 640 | def get_qstar_high(self): |
---|
[75047cf] | 641 | """ |
---|
[a45622a] | 642 | Compute the invariant for extrapolated data at high q range. |
---|
| 643 | |
---|
| 644 | Implementation: |
---|
| 645 | data = self._get_extra_data_high() |
---|
| 646 | return self._get_qstar() |
---|
[75047cf] | 647 | |
---|
[a45622a] | 648 | :return q_star: the invariant for data extrapolated at high q. |
---|
[75047cf] | 649 | """ |
---|
[82703a1] | 650 | # Data boundaries for fitting |
---|
[ef9ed58] | 651 | x_len = len(self._data.x) - 1 |
---|
[82703a1] | 652 | qmin = self._data.x[x_len - (self._high_extrapolation_npts - 1)] |
---|
[ef9ed58] | 653 | qmax = self._data.x[x_len] |
---|
| 654 | |
---|
[59a41066] | 655 | # fit the data with a model to get the appropriate parameters |
---|
[c4f52e3] | 656 | p, dp = self._fit(model=self._high_extrapolation_function, |
---|
| 657 | qmin=qmin, |
---|
| 658 | qmax=qmax, |
---|
| 659 | power=self._high_extrapolation_power) |
---|
| 660 | self._high_extrapolation_power_fitted = p[0] |
---|
[aafa962] | 661 | |
---|
[ef9ed58] | 662 | #create new Data1D to compute the invariant |
---|
[cbaa2f4] | 663 | data = self._get_extrapolated_data(\ |
---|
| 664 | model=self._high_extrapolation_function, |
---|
[bdd162f] | 665 | npts=INTEGRATION_NSTEPS, |
---|
[2e94cbde] | 666 | q_start=qmax, q_end=Q_MAXIMUM) |
---|
[76c1727] | 667 | |
---|
[bdd162f] | 668 | return self._get_qstar(data), self._get_qstar_uncertainty(data) |
---|
[76c1727] | 669 | |
---|
[c75a8ed] | 670 | def get_extra_data_low(self, npts_in=None, q_start=None, npts=20): |
---|
[2e94cbde] | 671 | """ |
---|
[a45622a] | 672 | Returns the extrapolated data used for the loew-Q invariant calculation. |
---|
| 673 | By default, the distribution will cover the data points used for the |
---|
| 674 | extrapolation. The number of overlap points is a parameter (npts_in). |
---|
| 675 | By default, the maximum q-value of the distribution will be |
---|
| 676 | the minimum q-value used when extrapolating for the purpose of the |
---|
| 677 | invariant calculation. |
---|
| 678 | |
---|
[cbaa2f4] | 679 | :param npts_in: number of data points for which |
---|
| 680 | the extrapolated data overlap |
---|
[a45622a] | 681 | :param q_start: is the minimum value to uses for extrapolated data |
---|
| 682 | :param npts: the number of points in the extrapolated distribution |
---|
[1702180] | 683 | |
---|
[76c1727] | 684 | """ |
---|
[2e94cbde] | 685 | # Get extrapolation range |
---|
| 686 | if q_start is None: |
---|
| 687 | q_start = self._low_q_limit |
---|
[bdd162f] | 688 | |
---|
[2e94cbde] | 689 | if npts_in is None: |
---|
[76c1727] | 690 | npts_in = self._low_extrapolation_npts |
---|
[2e94cbde] | 691 | q_end = self._data.x[max(0, npts_in-1)] |
---|
[76c1727] | 692 | |
---|
[2e94cbde] | 693 | if q_start >= q_end: |
---|
| 694 | return numpy.zeros(0), numpy.zeros(0) |
---|
| 695 | |
---|
[cbaa2f4] | 696 | return self._get_extrapolated_data(\ |
---|
| 697 | model=self._low_extrapolation_function, |
---|
[c75a8ed] | 698 | npts=npts, |
---|
[2e94cbde] | 699 | q_start=q_start, q_end=q_end) |
---|
[76c1727] | 700 | |
---|
[2e94cbde] | 701 | def get_extra_data_high(self, npts_in=None, q_end=Q_MAXIMUM, npts=20): |
---|
| 702 | """ |
---|
[a45622a] | 703 | Returns the extrapolated data used for the high-Q invariant calculation. |
---|
| 704 | By default, the distribution will cover the data points used for the |
---|
| 705 | extrapolation. The number of overlap points is a parameter (npts_in). |
---|
| 706 | By default, the maximum q-value of the distribution will be Q_MAXIMUM, |
---|
| 707 | the maximum q-value used when extrapolating for the purpose of the |
---|
| 708 | invariant calculation. |
---|
| 709 | |
---|
[cbaa2f4] | 710 | :param npts_in: number of data points for which the |
---|
| 711 | extrapolated data overlap |
---|
[a45622a] | 712 | :param q_end: is the maximum value to uses for extrapolated data |
---|
| 713 | :param npts: the number of points in the extrapolated distribution |
---|
[76c1727] | 714 | """ |
---|
[2e94cbde] | 715 | # Get extrapolation range |
---|
| 716 | if npts_in is None: |
---|
[76c1727] | 717 | npts_in = self._high_extrapolation_npts |
---|
[c75a8ed] | 718 | _npts = len(self._data.x) |
---|
| 719 | q_start = self._data.x[min(_npts, _npts-npts_in)] |
---|
[76c1727] | 720 | |
---|
[2e94cbde] | 721 | if q_start >= q_end: |
---|
| 722 | return numpy.zeros(0), numpy.zeros(0) |
---|
| 723 | |
---|
[cbaa2f4] | 724 | return self._get_extrapolated_data(\ |
---|
| 725 | model=self._high_extrapolation_function, |
---|
[2e94cbde] | 726 | npts=npts, |
---|
| 727 | q_start=q_start, q_end=q_end) |
---|
[4e80ae0] | 728 | |
---|
| 729 | def set_extrapolation(self, range, npts=4, function=None, power=None): |
---|
| 730 | """ |
---|
[a45622a] | 731 | Set the extrapolation parameters for the high or low Q-range. |
---|
| 732 | Note that this does not turn extrapolation on or off. |
---|
| 733 | |
---|
| 734 | :param range: a keyword set the type of extrapolation . type string |
---|
[cbaa2f4] | 735 | :param npts: the numbers of q points of data to consider |
---|
| 736 | for extrapolation |
---|
| 737 | :param function: a keyword to select the function to use |
---|
| 738 | for extrapolation. |
---|
[a45622a] | 739 | of type string. |
---|
| 740 | :param power: an power to apply power_low function |
---|
[4e80ae0] | 741 | |
---|
| 742 | """ |
---|
| 743 | range = range.lower() |
---|
| 744 | if range not in ['high', 'low']: |
---|
| 745 | raise ValueError, "Extrapolation range should be 'high' or 'low'" |
---|
| 746 | function = function.lower() |
---|
| 747 | if function not in ['power_law', 'guinier']: |
---|
[cbaa2f4] | 748 | msg = "Extrapolation function should be 'guinier' or 'power_law'" |
---|
| 749 | raise ValueError, msg |
---|
[4e80ae0] | 750 | |
---|
| 751 | if range == 'high': |
---|
| 752 | if function != 'power_law': |
---|
[cbaa2f4] | 753 | msg = "Extrapolation only allows a power law at high Q" |
---|
| 754 | raise ValueError, msg |
---|
[4e80ae0] | 755 | self._high_extrapolation_npts = npts |
---|
| 756 | self._high_extrapolation_power = power |
---|
[90e5ca1] | 757 | self._high_extrapolation_power_fitted = power |
---|
[4e80ae0] | 758 | else: |
---|
| 759 | if function == 'power_law': |
---|
[59a41066] | 760 | self._low_extrapolation_function = PowerLaw() |
---|
[4e80ae0] | 761 | else: |
---|
[59a41066] | 762 | self._low_extrapolation_function = Guinier() |
---|
[4e80ae0] | 763 | self._low_extrapolation_npts = npts |
---|
| 764 | self._low_extrapolation_power = power |
---|
[90e5ca1] | 765 | self._low_extrapolation_power_fitted = power |
---|
[4e80ae0] | 766 | |
---|
| 767 | def get_qstar(self, extrapolation=None): |
---|
| 768 | """ |
---|
[a45622a] | 769 | Compute the invariant of the local copy of data. |
---|
| 770 | |
---|
| 771 | :param extrapolation: string to apply optional extrapolation |
---|
[4e80ae0] | 772 | |
---|
[a45622a] | 773 | :return q_star: invariant of the data within data's q range |
---|
| 774 | |
---|
[cbaa2f4] | 775 | :warning: When using setting data to Data1D , |
---|
| 776 | the user is responsible of |
---|
| 777 | checking that the scale and the background are |
---|
| 778 | properly apply to the data |
---|
[a45622a] | 779 | |
---|
[4e80ae0] | 780 | """ |
---|
[bdd162f] | 781 | self._qstar = self._get_qstar(self._data) |
---|
| 782 | self._qstar_err = self._get_qstar_uncertainty(self._data) |
---|
[4e80ae0] | 783 | |
---|
| 784 | if extrapolation is None: |
---|
| 785 | return self._qstar |
---|
[bdd162f] | 786 | |
---|
| 787 | # Compute invariant plus invariant of extrapolated data |
---|
[4e80ae0] | 788 | extrapolation = extrapolation.lower() |
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| 789 | if extrapolation == "low": |
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[bdd162f] | 790 | qs_low, dqs_low = self.get_qstar_low() |
---|
| 791 | qs_hi, dqs_hi = 0, 0 |
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| 792 | |
---|
[4e80ae0] | 793 | elif extrapolation == "high": |
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[bdd162f] | 794 | qs_low, dqs_low = 0, 0 |
---|
| 795 | qs_hi, dqs_hi = self.get_qstar_high() |
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| 796 | |
---|
[4e80ae0] | 797 | elif extrapolation == "both": |
---|
[bdd162f] | 798 | qs_low, dqs_low = self.get_qstar_low() |
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| 799 | qs_hi, dqs_hi = self.get_qstar_high() |
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| 800 | |
---|
| 801 | self._qstar += qs_low + qs_hi |
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| 802 | self._qstar_err = math.sqrt(self._qstar_err*self._qstar_err \ |
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| 803 | + dqs_low*dqs_low + dqs_hi*dqs_hi) |
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| 804 | |
---|
| 805 | return self._qstar |
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[4e80ae0] | 806 | |
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[bdd162f] | 807 | def get_surface(self, contrast, porod_const, extrapolation=None): |
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[4e80ae0] | 808 | """ |
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[a45622a] | 809 | Compute the specific surface from the data. |
---|
| 810 | |
---|
| 811 | Implementation:: |
---|
| 812 | |
---|
| 813 | V = self.get_volume_fraction(contrast, extrapolation) |
---|
| 814 | |
---|
| 815 | Compute the surface given by: |
---|
| 816 | surface = (2*pi *V(1- V)*porod_const)/ q_star |
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| 817 | |
---|
| 818 | :param contrast: contrast value to compute the volume |
---|
| 819 | :param porod_const: Porod constant to compute the surface |
---|
| 820 | :param extrapolation: string to apply optional extrapolation |
---|
[4e80ae0] | 821 | |
---|
[a45622a] | 822 | :return: specific surface |
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[4e80ae0] | 823 | """ |
---|
| 824 | # Compute the volume |
---|
[bdd162f] | 825 | volume = self.get_volume_fraction(contrast, extrapolation) |
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[cbaa2f4] | 826 | return 2 * math.pi * volume *(1 - volume) * \ |
---|
| 827 | float(porod_const)/self._qstar |
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[4e80ae0] | 828 | |
---|
[bdd162f] | 829 | def get_volume_fraction(self, contrast, extrapolation=None): |
---|
[4e80ae0] | 830 | """ |
---|
[a45622a] | 831 | Compute volume fraction is deduced as follow: :: |
---|
| 832 | |
---|
[4e80ae0] | 833 | q_star = 2*(pi*contrast)**2* volume( 1- volume) |
---|
| 834 | for k = 10^(-8)*q_star/(2*(pi*|contrast|)**2) |
---|
| 835 | we get 2 values of volume: |
---|
| 836 | with 1 - 4 * k >= 0 |
---|
| 837 | volume1 = (1- sqrt(1- 4*k))/2 |
---|
| 838 | volume2 = (1+ sqrt(1- 4*k))/2 |
---|
| 839 | |
---|
| 840 | q_star: the invariant value included extrapolation is applied |
---|
| 841 | unit 1/A^(3)*1/cm |
---|
| 842 | q_star = self.get_qstar() |
---|
| 843 | |
---|
[bdd162f] | 844 | the result returned will be 0 <= volume <= 1 |
---|
[a45622a] | 845 | |
---|
| 846 | :param contrast: contrast value provides by the user of type float. |
---|
| 847 | contrast unit is 1/A^(2)= 10^(16)cm^(2) |
---|
| 848 | :param extrapolation: string to apply optional extrapolation |
---|
| 849 | |
---|
| 850 | :return: volume fraction |
---|
| 851 | |
---|
| 852 | :note: volume fraction must have no unit |
---|
[4e80ae0] | 853 | """ |
---|
[bdd162f] | 854 | if contrast <= 0: |
---|
| 855 | raise ValueError, "The contrast parameter must be greater than zero" |
---|
[4e80ae0] | 856 | |
---|
[bdd162f] | 857 | # Make sure Q star is up to date |
---|
| 858 | self.get_qstar(extrapolation) |
---|
[4e80ae0] | 859 | |
---|
[bdd162f] | 860 | if self._qstar <= 0: |
---|
[cbaa2f4] | 861 | msg = "Invalid invariant: Invariant Q* must be greater than zero" |
---|
| 862 | raise RuntimeError, msg |
---|
[4e80ae0] | 863 | |
---|
| 864 | # Compute intermediate constant |
---|
| 865 | k = 1.e-8 * self._qstar/(2 * (math.pi * math.fabs(float(contrast)))**2) |
---|
[bdd162f] | 866 | # Check discriminant value |
---|
[4e80ae0] | 867 | discrim = 1 - 4 * k |
---|
| 868 | |
---|
| 869 | # Compute volume fraction |
---|
| 870 | if discrim < 0: |
---|
[cbaa2f4] | 871 | msg = "Could not compute the volume fraction: negative discriminant" |
---|
| 872 | raise RuntimeError, msg |
---|
[4e80ae0] | 873 | elif discrim == 0: |
---|
| 874 | return 1/2 |
---|
| 875 | else: |
---|
| 876 | volume1 = 0.5 * (1 - math.sqrt(discrim)) |
---|
| 877 | volume2 = 0.5 * (1 + math.sqrt(discrim)) |
---|
| 878 | |
---|
| 879 | if 0 <= volume1 and volume1 <= 1: |
---|
| 880 | return volume1 |
---|
| 881 | elif 0 <= volume2 and volume2 <= 1: |
---|
| 882 | return volume2 |
---|
[cbaa2f4] | 883 | msg = "Could not compute the volume fraction: inconsistent results" |
---|
| 884 | raise RuntimeError, msg |
---|
[ef9ed58] | 885 | |
---|
| 886 | def get_qstar_with_error(self, extrapolation=None): |
---|
[75047cf] | 887 | """ |
---|
[a45622a] | 888 | Compute the invariant uncertainty. |
---|
| 889 | This uncertainty computation depends on whether or not the data is |
---|
| 890 | smeared. |
---|
| 891 | |
---|
| 892 | :param extrapolation: string to apply optional extrapolation |
---|
| 893 | |
---|
| 894 | :return: invariant, the invariant uncertainty |
---|
[bdd162f] | 895 | """ |
---|
| 896 | self.get_qstar(extrapolation) |
---|
[ef9ed58] | 897 | return self._qstar, self._qstar_err |
---|
| 898 | |
---|
[bdd162f] | 899 | def get_volume_fraction_with_error(self, contrast, extrapolation=None): |
---|
[75047cf] | 900 | """ |
---|
[a45622a] | 901 | Compute uncertainty on volume value as well as the volume fraction |
---|
| 902 | This uncertainty is given by the following equation: :: |
---|
| 903 | |
---|
[75047cf] | 904 | dV = 0.5 * (4*k* dq_star) /(2* math.sqrt(1-k* q_star)) |
---|
| 905 | |
---|
[437a9f0] | 906 | for k = 10^(-8)*q_star/(2*(pi*|contrast|)**2) |
---|
[2cce133] | 907 | |
---|
[75047cf] | 908 | q_star: the invariant value including extrapolated value if existing |
---|
| 909 | dq_star: the invariant uncertainty |
---|
| 910 | dV: the volume uncertainty |
---|
[a45622a] | 911 | |
---|
| 912 | The uncertainty will be set to -1 if it can't be computed. |
---|
| 913 | |
---|
| 914 | :param contrast: contrast value |
---|
| 915 | :param extrapolation: string to apply optional extrapolation |
---|
| 916 | |
---|
| 917 | :return: V, dV = volume fraction, error on volume fraction |
---|
[75047cf] | 918 | """ |
---|
[bdd162f] | 919 | volume = self.get_volume_fraction(contrast, extrapolation) |
---|
[75047cf] | 920 | |
---|
[bdd162f] | 921 | # Compute error |
---|
[437a9f0] | 922 | k = 1.e-8 * self._qstar /(2 * (math.pi* math.fabs(float(contrast)))**2) |
---|
[bdd162f] | 923 | # Check value inside the sqrt function |
---|
[ef9ed58] | 924 | value = 1 - k * self._qstar |
---|
[bad9ae2] | 925 | if (value) <= 0: |
---|
[bdd162f] | 926 | uncertainty = -1 |
---|
[ef9ed58] | 927 | # Compute uncertainty |
---|
[cbaa2f4] | 928 | uncertainty = math.fabs((0.5 * 4 * k * \ |
---|
| 929 | self._qstar_err)/(2 * math.sqrt(1 - k * self._qstar))) |
---|
[ef9ed58] | 930 | |
---|
[bdd162f] | 931 | return volume, uncertainty |
---|
[ef9ed58] | 932 | |
---|
[bdd162f] | 933 | def get_surface_with_error(self, contrast, porod_const, extrapolation=None): |
---|
[75047cf] | 934 | """ |
---|
[a45622a] | 935 | Compute uncertainty of the surface value as well as the surface value. |
---|
| 936 | The uncertainty is given as follow: :: |
---|
| 937 | |
---|
[75047cf] | 938 | dS = porod_const *2*pi[( dV -2*V*dV)/q_star |
---|
| 939 | + dq_star(v-v**2) |
---|
| 940 | |
---|
[bdd162f] | 941 | q_star: the invariant value |
---|
[75047cf] | 942 | dq_star: the invariant uncertainty |
---|
| 943 | V: the volume fraction value |
---|
| 944 | dV: the volume uncertainty |
---|
[a45622a] | 945 | |
---|
| 946 | :param contrast: contrast value |
---|
| 947 | :param porod_const: porod constant value |
---|
| 948 | :param extrapolation: string to apply optional extrapolation |
---|
| 949 | |
---|
| 950 | :return S, dS: the surface, with its uncertainty |
---|
[75047cf] | 951 | """ |
---|
[bdd162f] | 952 | # We get the volume fraction, with error |
---|
| 953 | # get_volume_fraction_with_error calls get_volume_fraction |
---|
| 954 | # get_volume_fraction calls get_qstar |
---|
| 955 | # which computes Qstar and dQstar |
---|
| 956 | v, dv = self.get_volume_fraction_with_error(contrast, extrapolation) |
---|
| 957 | |
---|
[c75a8ed] | 958 | s = self.get_surface(contrast=contrast, porod_const=porod_const, |
---|
| 959 | extrapolation=extrapolation) |
---|
[ef9ed58] | 960 | ds = porod_const * 2 * math.pi * (( dv - 2 * v * dv)/ self._qstar\ |
---|
| 961 | + self._qstar_err * ( v - v**2)) |
---|
[bdd162f] | 962 | |
---|
[ef9ed58] | 963 | return s, ds |
---|