smearer.cpp @ 34c2649

ESS_GUIESS_GUI_DocsESS_GUI_batch_fittingESS_GUI_bumps_abstractionESS_GUI_iss1116ESS_GUI_iss879ESS_GUI_iss959ESS_GUI_openclESS_GUI_orderingESS_GUI_sync_sascalccostrafo411magnetic_scattrelease-4.1.1release-4.1.2release-4.2.2release_4.0.1ticket-1009ticket-1094-headlessticket-1242-2d-resolutionticket-1243ticket-1249ticket885unittest-saveload

Last change on this file since 34c2649 was 510e7ad, checked in by Jae Cho <jhjcho@…>, 14 years ago
made correct way of slit_smear w/ height and width non zeros
Property mode set to `100644`
File size: 11.5 KB

Rev	Line
[642b259]	1	/**
	2	This software was developed by the University of Tennessee as part of the
	3	Distributed Data Analysis of Neutron Scattering Experiments (DANSE)
	4	project funded by the US National Science Foundation.
	5
	6	If you use DANSE applications to do scientific research that leads to
	7	publication, we ask that you acknowledge the use of the software with the
	8	following sentence:
	9
	10	"This work benefited from DANSE software developed under NSF award DMR-0520547."
	11
	12	copyright 2009, University of Tennessee
	13	*/
	14	#include "smearer.hh"
	15	#include <stdio.h>
	16	#include <math.h>
	17	using namespace std;
	18
	19
	20	/**
	21	* Constructor for BaseSmearer
	22	*
	23	* @param qmin: minimum Q value
	24	* @param qmax: maximum Q value
	25	* @param nbins: number of Q bins
	26	*/
	27	BaseSmearer :: BaseSmearer(double qmin, double qmax, int nbins) {
	28	// Number of bins
	29	this->nbins = nbins;
	30	this->qmin = qmin;
	31	this->qmax = qmax;
	32	// Flag to keep track of whether we have a smearing matrix or
	33	// whether we need to compute one
	34	has_matrix = false;
	35	even_binning = true;
	36	};
	37
	38	/**
	39	* Constructor for BaseSmearer
	40	*
	41	* Used for uneven binning
	42	* @param q: array of Q values
	43	* @param nbins: number of Q bins
	44	*/
	45	BaseSmearer :: BaseSmearer(double* q, int nbins) {
	46	// Number of bins
	47	this->nbins = nbins;
	48	this->q_values = q;
	49	// Flag to keep track of whether we have a smearing matrix or
	50	// whether we need to compute one
	51	has_matrix = false;
	52	even_binning = false;
	53	};
	54
	55	/**
	56	* Constructor for SlitSmearer
	57	*
	58	* @param width: slit width in Q units
	59	* @param height: slit height in Q units
	60	* @param qmin: minimum Q value
	61	* @param qmax: maximum Q value
	62	* @param nbins: number of Q bins
	63	*/
	64	SlitSmearer :: SlitSmearer(double width, double height, double qmin, double qmax, int nbins) :
	65	BaseSmearer(qmin, qmax, nbins){
	66	this->height = height;
	67	this->width = width;
	68	};
	69
	70	/**
	71	* Constructor for SlitSmearer
	72	*
	73	* @param width: slit width in Q units
	74	* @param height: slit height in Q units
	75	* @param q: array of Q values
	76	* @param nbins: number of Q bins
	77	*/
	78	SlitSmearer :: SlitSmearer(double width, double height, double* q, int nbins) :
	79	BaseSmearer(q, nbins){
	80	this->height = height;
	81	this->width = width;
	82	};
	83
	84	/**
	85	* Constructor for QSmearer
	86	*
	87	* @param width: array slit widths for each Q point, in Q units
	88	* @param qmin: minimum Q value
	89	* @param qmax: maximum Q value
	90	* @param nbins: number of Q bins
	91	*/
	92	QSmearer :: QSmearer(double* width, double qmin, double qmax, int nbins) :
	93	BaseSmearer(qmin, qmax, nbins){
	94	this->width = width;
	95	};
	96
	97	/**
	98	* Constructor for QSmearer
	99	*
	100	* @param width: array slit widths for each Q point, in Q units
	101	* @param q: array of Q values
	102	* @param nbins: number of Q bins
	103	*/
	104	QSmearer :: QSmearer(double* width, double* q, int nbins) :
	105	BaseSmearer(q, nbins){
	106	this->width = width;
	107	};
	108
	109	/**
	110	* Compute the slit smearing matrix
	111	*
	112	* For even binning (q_min to q_max with nbins):
	113	*
	114	* step = (q_max-q_min)/(nbins-1)
	115	* first bin goes from q_min to q_min+step
	116	* last bin goes from q_max to q_max+step
	117	*
	118	* For binning according to q array:
	119	*
	120	* Each q point represents a bin going from half the distance between it
	121	* and the previous point to half the distance between it and the next point.
	122	*
	123	* Example: bin i goes from (q_values[i-1]+q_values[i])/2 to (q_values[i]+q_values[i+1])/2
	124	*
	125	* The exceptions are the first and last bins, which are centered at the first and
	126	* last q-values, respectively. The width of the first and last bins is the distance between
	127	* their respective neighboring q-value.
	128	*/
	129	void SlitSmearer :: compute_matrix(){
	130
	131	weights = new vector<double>(nbins*nbins,0);
	132
	133	// Check the length of the data
	134	if (nbins<2) return;
	135	int npts_h = height>0.0 ? npts : 1;
	136	int npts_w = width>0.0 ? npts : 1;
	137
	138	// If both height and width are great than zero,
	139	// modify the number of points in each direction so
	140	// that the total number of points is still what
	141	// the user would expect (downgrade resolution)
	142	//if(npts_h>1 && npts_w>1){
	143	// npts_h = (int)ceil(sqrt((double)npts));
	144	// npts_w = npts_h;
	145	//}
	146	double shift_h, shift_w, hbin_size, wbin_size;
	147	// Make sure height and width are all positive (FWMH/2)
	148	// Assumption; height and width are all same for all q points
	149	if(npts_h == 1){
	150	shift_h = 0.0;
	151	} else {
	152	shift_h = fabs(height);
	153	}
	154	if(npts_w == 1){
	155	shift_w = 0.0;
	156	} else {
	157	shift_w = fabs(width);
	158	}
	159	// size of the h bin and w bin
	160	hbin_size = shift_h / nbins;
	161	wbin_size = shift_w / nbins;
	162
	163	// Loop over all q-values
	164	for(int i=0; i<nbins; i++) {
	165	// Find Weights
	166	// Find q where the resolution smearing calculation of I(q) occurs
	167	double q, q_min, q_max, q_0;
	168	get_bin_range(i, &q, &q_min, &q_max);
	169	// Block q becomes <=0
	170	if (q <= 0){
	171	continue;
	172	}
	173	bool last_qpoint = true;
	174	// Find q[0] value to normalize the weight later,
	175	// otherwise, we will have a precision problem.
	176	if (i == 0){
	177	q_0 = q;
	178	}
	179	// Loop over all qj-values
	180	bool first_w = true;
	181	for(int j=0; j<nbins; j++) {
	182	double q_j, q_high, q_low;
	183	// Calculate bin size of q_j
	184	get_bin_range(j, &q_j, &q_low, &q_high);
	185	// Block q_j becomes <=0
	186	if (q_j <= 0){
	187	continue;
	188	}
	189	// Check q_low that can not be negative.
	190	if (q_low < 0.0){
	191	q_low = 0.0;
	192	}
	193	// default parameter values
	194	(weights)[inbins+j] = 0.0;
	195	// protect for negative q
	196	if (q <= 0.0 \|\| q_j <= 0.0){
	197	continue;
	198	}
	199	double shift_w = 0.0;
	200	// Condition: zero slit smear.
	201	if (npts_w == 1 && npts_h == 1){
	202	if(q_j == q) {
	203	(weights)[inbins+j] = 1.0;
	204	}
	205	}
	206	//Condition:Smear weight integration for width >0 when the height (=0) does not present.
	207	//Or height << width.
	208	else if((npts_w!=1 && npts_h == 1)\|\| (npts_w!=1 && npts_h != 1 && width/height > 100.0)){
	209	shift_w = width;
	210	//del_w = width/((double)npts_w-1.0);
	211	double q_shifted_low = q - shift_w;
	212	// High limit of the resolution range
	213	double q_shifted_high = q + shift_w;
	214	// Go through all the q_js for weighting those points
	215	if(q_j >= q_shifted_low && q_j <= q_shifted_high) {
	216	// The weighting factor comes,
	217	// Give some weight (delq_bin) for the q_j within the resolution range
	218	// Weight should be same for all qs except
	219	// for the q bin size at j.
	220	// Note that the division by q_0 is only due to the precision problem
	221	// where q_high - q_low gets to very small.
	222	// Later, it will be normalized again.
	223	(weights)[inbins+j] += (q_high - q_low)/q_0 ;
	224	}
	225	}
	226	else{
	227	// Loop for width (;Height is analytical.)
	228	// Condition: height >>> width, otherwise, below is not accurate enough.
	229	// Smear weight numerical iteration for width >0 when the height (>0) presents.
	230	// When width = 0, the numerical iteration will be skipped.
	231	// The resolution calculation for the height is done by direct integration,
	232	// assuming the I(q'=sqrt(q_j^2-(q+shift_w)^2)) is constant within a q' bin, [q_high, q_low].
	233	// In general, this weight numerical iteration for width >0 might be a rough approximation,
	234	// but it must be good enough when height >>> width.
	235	for(int k=(-npts_w + 1); k<npts_w; k++){
	236	if(npts_w!=1){
	237	shift_w = width/((double)npts_w-1.0)*(double)k;
	238	}
	239	// For each q-value, compute the weight of each other q-bin
	240	// in the I(q) array
	241	// Low limit of the resolution range
	242	double q_shift = q + shift_w;
	243	if (q_shift < 0.0){
	244	q_shift = 0.0;
	245	}
	246	double q_shifted_low = q_shift;
	247	// High limit of the resolution range
	248	double q_shifted_high = sqrt(q_shift * q_shift + shift_h * shift_h);
	249
	250
	251	// Go through all the q_js for weighting those points
	252	if(q_j >= q_shifted_low && q_j <= q_shifted_high) {
	253	// The weighting factor comes,
	254	// Give some weight (delq_bin) for the q_j within the resolution range
	255	// Weight should be same for all qs except
	256	// for the q bin size at j.
	257	// Note that the division by q_0 is only due to the precision problem
	258	// where q_high - q_low gets to very small.
	259	// Later, it will be normalized again.
	260
	261	double q_shift_min = q - width;
	262
	263	double u = (q_j * q_j - (q_shift) * (q_shift));
	264	// The fabs below are not necessary but in case: the weight should never be imaginary.
	265	// At the edge of each sub_width. weight += u(at q_high bin) - u(0), where u(0) = 0,
	266	// and weighted by (2.0* npts_w -1.0)once for each q.
[510e7ad]	267	//if (q == q_j) {
	268	if (q_low <= q_shift && q_high > q_shift) {
	269	//if (k==0)
	270	(weights)[inbins+j] += (sqrt(fabs((q_high)(q_high)-q_shift q_shift)))/q_0;// * (2.0*double(npts_w)-1.0);
[642b259]	271	}
	272	// For the rest of sub_width. weight += u(at q_high bin) - u(at q_low bin)
[510e7ad]	273	else{// if (u > 0.0){
[642b259]	274	(weights)[inbins+j] += (sqrt(fabs((q_high)(q_high)- q_shift q_shift))-sqrt(fabs((q_low)(q_low)- q_shift q_shift)))/q_0 ;
	275	}
	276	}
	277	}
	278	}
	279	}
	280	}
	281	};
	282
	283	/**
	284	* Compute the point smearing matrix
	285	*/
	286	void QSmearer :: compute_matrix(){
	287	weights = new vector<double>(nbins*nbins,0);
	288
	289	// Loop over all q-values
	290	double step = (qmax-qmin)/((double)nbins-1.0);
	291	double q, q_min, q_max;
	292	double q_j, q_jmax, q_jmin;
	293	for(int i=0; i<nbins; i++) {
	294	get_bin_range(i, &q, &q_min, &q_max);
	295
	296	for(int j=0; j<nbins; j++) {
	297	get_bin_range(j, &q_j, &q_jmin, &q_jmax);
	298
	299	// Compute the fraction of the Gaussian contributing
	300	// to the q_j bin between q_jmin and q_jmax
[510e7ad]	301	long double value = erf( (q_jmax-q)/(sqrt(2.0)*width[i]) );
[642b259]	302	value -= erf( (q_jmin-q)/(sqrt(2.0)*width[i]) );
	303	(weights)[inbins+j] += value;
	304	}
	305	}
	306	}
	307
	308	/**
	309	* Computes the Q range of a given bin of the Q distribution.
	310	* The range is computed according the the data distribution that
	311	* was given to the object at initialization.
	312	*
	313	* @param i: number of the bin in the distribution
	314	* @param q: q-value of bin i
	315	* @param q_min: lower bound of the bin
	316	* @param q_max: higher bound of the bin
	317	*
	318	*/
	319	int BaseSmearer :: get_bin_range(int i, double* q, double* q_min, double* q_max) {
	320	if (even_binning) {
	321	double step = (qmax-qmin)/((double)nbins-1.0);
	322	q = qmin + (double)istep;
	323	q_min = q - 0.5*step;
	324	q_max = q + 0.5*step;
	325	return 1;
	326	} else if (i>=0 && i<nbins) {
	327	*q = q_values[i];
	328	if (i==0) {
	329	double step = (q_values[1]-q_values[0])/2.0;
	330	q_min = q - step;
	331	q_max = q + step;
	332	} else if (i==nbins-1) {
	333	double step = (q_values[i]-q_values[i-1])/2.0;
	334	q_min = q - step;
	335	q_max = q + step;
	336	} else {
	337	q_min = q - (q_values[i]-q_values[i-1])/2.0;
	338	q_max = q + (q_values[i+1]-q_values[i])/2.0;
	339	}
	340	return 1;
	341	}
	342	return -1;
	343	}
	344
	345	/**
	346	* Perform smearing by applying the smearing matrix to the input Q array
	347	*/
	348	void BaseSmearer :: smear(double iq_in, double iq_out, int first_bin, int last_bin){
	349
	350	// If we haven't computed the smearing matrix, do it now
	351	if(!has_matrix) {
	352	compute_matrix();
	353	has_matrix = true;
	354	}
	355
	356	// Loop over q-values and multiply apply matrix
	357	for(int q_i=first_bin; q_i<=last_bin; q_i++){
	358	double sum = 0.0;
	359	double counts = 0.0;
	360
	361	for(int i=first_bin; i<=last_bin; i++){
	362	// Skip if weight is less than 1e-03(this value is much smaller than
	363	// the weight at the 3*sigma distance
	364	// Will speed up a little bit...
	365	if ((weights)[q_inbins+i] < 1.0e-003){
	366	continue;
	367	}
	368	sum += iq_in[i] * (weights)[q_inbins+i];
	369	counts += (weights)[q_inbins+i];
	370	}
	371
	372	// Normalize counts
	373	iq_out[q_i] = (counts>0.0) ? sum/counts : 0.0;
	374	}
	375	}

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source: sasview/sansmodels/src/sans/models/c_smearer/smearer.cpp @ 34c2649

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