smear_computation.html @ b9a5f0e

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	8	<body lang=EN-US>
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	10	<div class=WordSection1>
	11
	12	<p class=MsoNormal><span style='font-size:16.0pt;line-height:115%;font-family:
[5cc39f10]	13	"Times New Roman","serif"'><h4>Smear Computation </h4></span></p>
[17574ae]	14
[6e8b436]	15
	16	<ul style='margin-top:0in' type=disc>
	17	<li class=MsoNormal style='line-height:115%'><a href="#Slit Smear"><b>Slit Smear</b></a>
	18	</li>
	19	<li class=MsoNormal style='line-height:115%'><a href="#Pinhole Smear"><b>Pinhole Smear</b></a>
	20	</li>
	21	<li class=MsoNormal style='line-height:115%'><a href="#2D Smear"><b>2D Smear</b></a>
	22	</li>
	23	</ul>
[17574ae]	24
[6e8b436]	25	<p class=MsoListParagraph><span style='font-size:14.0pt;line-height:115%;
[5cc39f10]	26	font-family:"Times New Roman","serif"'><h5><a name="Slit Smear">Slit Smear</a></h5></span></p>
[6e8b436]	27
	28	<p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>The sit
	29	smeared scattering intensity for SANS is defined by</span></p>
	30
[318b5bbb]	31	<p class=MsoNormal><img
[87f8971]	32	src="img/sm_image002.gif" align=left hspace=12></p>
[6e8b436]	33
[17574ae]	34	<p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>
[318b5bbb]	35	---- 1)</span><br clear=all>
[6e8b436]	36	<span style='font-family:"Times New Roman","serif"'>where Norm = <span
[318b5bbb]	37	style='position:relative;top:15.0pt'><img
[87f8971]	38	src="img/sm_image003.gif"></span>.</span></p>
[318b5bbb]	39	<br>
[6e8b436]	40	<p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>The
[318b5bbb]	41	functions <span style='position:relative;top:6.0pt'><img
[87f8971]	42	src="img/sm_image004.gif"></span> and <span style='position:
[318b5bbb]	43	relative;top:6.0pt'><img
[87f8971]	44	src="img/sm_image005.gif"></span> refer to the slit width weighting
[6e8b436]	45	function and the slit height weighting determined at the q point, respectively.
[17574ae]	46	Here, we assumes that the weighting function is described by a rectangular
[6e8b436]	47	function, i.e.,</span></p>
	48
[318b5bbb]	49	<p class=MsoNormal><span style='position:relative;top:7.0pt'><img
[87f8971]	50	src="img/sm_image006.gif">
[17574ae]	51	</span><span style='font-family:"Times New Roman","serif";position:relative;
[318b5bbb]	52	top:7.0pt'> ---- 2)</span></p>
[6e8b436]	53
	54	<p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>and </span></p>
	55
[318b5bbb]	56	<p class=MsoNormal><span style='position:relative;top:7.0pt'><img
[87f8971]	57	src="img/sm_image007.gif"></span>,
[318b5bbb]	58	<span style='font-family:"Times New Roman","serif"'> ---- 3)</span></p>
	59
	60	<p>so that <img
[87f8971]	61	src="img/sm_image008.gif"> <img src="img/sm_image009.gif"> for <img
	62	src="img/sm_image010.gif"> and <i>u</i>. The <img src="img/sm_image011.gif">
	63	and <img src="img/sm_image012.gif"> stand for the slit height (FWHM/2) and the slit
[6e8b436]	64	width (FWHM/2) in the q space. Now the integral of Eq. (1) is simplified to</span></p>
	65
[318b5bbb]	66	<p class=MsoNormal><img
[87f8971]	67	src="img/sm_image013.gif" align=left hspace=12><span
[17574ae]	68	style='font-family:"Times New Roman","serif"'>
[318b5bbb]	69	---- 4)</span></p>
[6e8b436]	70
	71	<p class=MsoNormal><span style='font-family:"Times New Roman","serif";
	72	position:relative;top:20.0pt'> </span></p>
	73
	74	<p class=MsoListParagraphCxSpFirst style='margin-left:0in'><b><span
	75	style='font-family:"Times New Roman","serif"'>Numerical Implementation of Eq.
	76	(4) </span></b></p>
	77
	78	<p class=MsoListParagraphCxSpMiddle style='margin-left:.25in;text-indent:-.25in'><span
	79	style='font-family:"Times New Roman","serif"'>1)<span style='font:7.0pt "Times New Roman"'>
	80	</span></span><span style='font-family:"Times New Roman","serif"'>For </span><span
[318b5bbb]	81	style='position:relative;top:6.0pt'><img
[87f8971]	82	src="img/sm_image012.gif"></span>= 0 <span style='font-family:
[6e8b436]	83	"Times New Roman","serif"'>and </span><span style='position:relative;
[87f8971]	84	top:6.0pt'><img src="img/sm_image011.gif"></span> =
[6e8b436]	85	<span style='font-family:"Times New Roman","serif"'>constant:</span></p>
	86
[318b5bbb]	87	<p>
[87f8971]	88	<img src="img/sm_image016.gif"></p>
[6e8b436]	89
[318b5bbb]	90	<p> For discrete q values, at the q
[17574ae]	91	values from the data points and at the q values extended up to q<sub>N</sub>=
[87f8971]	92	q<sub>i</sub> + <img src="img/sm_image011.gif"> , the smeared intensity can be
[318b5bbb]	93	calculated approximately, </p>
[6e8b436]	94
[318b5bbb]	95	<p><img
[87f8971]	96	src="img/sm_image017.gif">.
[318b5bbb]	97	---- 5)</p>
[6e8b436]	98
	99	<p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'><span
[318b5bbb]	100	style='position:relative;top:7.0pt'><img
[87f8971]	101	src="img/sm_image018.gif"></span> <span style='font-family:
[6e8b436]	102	"Times New Roman","serif"'>= 0 for <i>I<sub>s</sub></i> in</span> <i><span
	103	style='font-family:"Times New Roman","serif"'>j < i</span></i><span
	104	style='font-family:"Times New Roman","serif"'> or<i> j>N-1</i>.</span></p>
	105
	106	<p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'><span
	107	style='font-family:"Times New Roman","serif"'> </span></p>
	108
	109	<p class=MsoListParagraphCxSpMiddle style='margin-left:.25in;text-indent:-.25in'><span
	110	style='font-family:"Times New Roman","serif"'>2)<span style='font:7.0pt "Times New Roman"'>
[17574ae]	111	</span></span><span style='font-family:"Times New Roman","serif"'>For </span><span
[318b5bbb]	112	style='position:relative;top:6.0pt'><img
[87f8971]	113	src="img/sm_image012.gif"></span>= <span style='font-family:
[17574ae]	114	"Times New Roman","serif"'>constant </span> <span style='font-family:"Times New Roman","serif"'>and
[318b5bbb]	115	</span><span style='position:relative;top:6.0pt'><img
[87f8971]	116	src="img/sm_image011.gif"></span> = <span style='font-family:
[6e8b436]	117	"Times New Roman","serif"'>0:</span></p>
	118
	119	<p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'><span
	120	style='font-family:"Times New Roman","serif"'>Similarly to 1), we get</span></p>
	121
	122	<p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'>
[87f8971]	123	<img src="img/sm_image019.gif">
[318b5bbb]	124	<span style='font-family:"Times New Roman","serif"'> ---- 6)</span></p>
[6e8b436]	125
	126	<p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'><span
[17574ae]	127	style='font-family:"Times New Roman","serif"'>for q<sub>p</sub> = q<sub>i</sub>
[318b5bbb]	128	- </span><span style='position:relative;top:6.0pt'><img
[87f8971]	129	src="img/sm_image012.gif"></span><span style='font-family:
[17574ae]	130	"Times New Roman","serif"'> and</span> <span style='font-family:"Times New Roman","serif"'>q<sub>N</sub>
[6e8b436]	131	= q<sub>i</sub> + </span><span style='position:relative;top:6.0pt'><img
[87f8971]	132	src="img/sm_image012.gif"></span>. <span
[318b5bbb]	133	style='position:relative;top:7.0pt'><img
[87f8971]	134	src="img/sm_image018.gif"></span> <span style='font-family:
[6e8b436]	135	"Times New Roman","serif"'>= 0 for <i>I<sub>s</sub></i> in</span> <i><span
	136	style='font-family:"Times New Roman","serif"'>j < p</span></i><span
	137	style='font-family:"Times New Roman","serif"'> or<i> j>N-1</i>.</span></p>
	138
	139	<p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'> </p>
	140
	141	<p class=MsoListParagraphCxSpMiddle style='margin-left:.25in;text-indent:-.25in'><span
	142	style='font-family:"Times New Roman","serif"'>3)<span style='font:7.0pt "Times New Roman"'>
[17574ae]	143	</span></span><span style='font-family:"Times New Roman","serif"'>For </span><span
[318b5bbb]	144	style='position:relative;top:6.0pt'><img
[87f8971]	145	src="img/sm_image011.gif"></span>= <span style='font-family:
[17574ae]	146	"Times New Roman","serif"'>constant </span> <span style='font-family:"Times New Roman","serif"'>and
[318b5bbb]	147	</span><span style='position:relative;top:6.0pt'><img
[87f8971]	148	src="img/sm_image011.gif"></span> = <span style='font-family:
[6e8b436]	149	"Times New Roman","serif"'>constant:</span></p>
	150
	151	<p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'><span
	152	style='font-family:"Times New Roman","serif"'>This case, the best way is to
	153	perform the integration, Eq. (1), numerically for both slit height and width.
	154	However, the numerical integration is not correct enough unless given a large
	155	number of iteration, say at least 10000 by 10000 for each element of the matrix
	156	W, which will take minutes and minutes to finish the calculation for a set of
	157	typical SANS data. An alternative way which is correct for slit width <<
[17574ae]	158	slit hight, is used in the SANSView: This method is a mixed method that
[6e8b436]	159	combines the method 1) with the numerical integration for the slit width.</span></p>
	160
	161	<p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'>
	162	</p>
	163
	164	<p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'>
[87f8971]	165	<img src="img/sm_image020.gif"> <span style='font-family:
[318b5bbb]	166	"Times New Roman","serif"'> ---- (7)</span></p>
[6e8b436]	167
	168	<p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'><span
[17574ae]	169	style='font-family:"Times New Roman","serif"'>for q<sub>p</sub> = q<sub>i</sub>
[318b5bbb]	170	- </span><span style='position:relative;top:6.0pt'><img
[87f8971]	171	src="img/sm_image012.gif"></span><span style='font-family:
[17574ae]	172	"Times New Roman","serif"'> and</span> <span style='font-family:"Times New Roman","serif"'>q<sub>N</sub>
[6e8b436]	173	= q<sub>i</sub> + </span><span style='position:relative;top:6.0pt'><img
[87f8971]	174	src="img/sm_image012.gif"></span>. <span
[318b5bbb]	175	style='position:relative;top:7.0pt'><img
[87f8971]	176	src="img/sm_image018.gif"></span> <span style='font-family:
[6e8b436]	177	"Times New Roman","serif"'>= 0 for <i>I<sub>s</sub></i> in</span> <i><span
	178	style='font-family:"Times New Roman","serif"'>j < p</span></i><span
	179	style='font-family:"Times New Roman","serif"'> or<i> j>N-1</i>. </span></p>
	180
	181	<p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'><span
	182	style='font-family:"Times New Roman","serif"'> </span></p>
	183
	184	<p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'><span
	185	style='font-family:"Times New Roman","serif"'> </span></p>
	186
	187	<p class=MsoListParagraphCxSpLast><span style='font-size:14.0pt;line-height:
[5cc39f10]	188	115%;font-family:"Times New Roman","serif"'><h5><a name="Pinhole Smear">Pinhole Smear</a></h5></span></p>
[6e8b436]	189
	190	<p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>The
	191	pinhole smearing computation is done similar to the Case 2) above except that
	192	the weight function used was the Gaussian function, so that the Eq. 6) for this
	193	case becomes</span></p>
	194
[87f8971]	195	<p class=MsoNormal><img src="img/sm_image021.gif"><span
[318b5bbb]	196	style='font-family:"Times New Roman","serif"'> ---- (8)</span></p>
[6e8b436]	197
	198	<p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>For all
	199	the cases above, the weighting matrix <i>W</i> is calculated when the smearing
	200	is called at the first time, and it includes the ~ 60 q values (finely binned
	201	evenly) below (>0) and above the q range of data in order to cover all data
	202	points of the smearing computation for a given model and for a given slit size.
[17574ae]	203	The <i>Norm</i> factor is found numerically with the weighting matrix, and
[6e8b436]	204	considered on <i>I<sub>s</sub></i> computation.</span></p>
	205
	206	<p class=MsoListParagraphCxSpFirst style='margin-left:.25in'><span
	207	style='font-family:"Times New Roman","serif"'> </span></p>
	208
	209	<p class=MsoListParagraphCxSpLast><span style='font-size:14.0pt;line-height:
[5cc39f10]	210	115%;font-family:"Times New Roman","serif"'><h5><a name="2D Smear">2D Smear</a></h5></span></p>
[6e8b436]	211
	212	<p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>The
	213	2D smearing computation is done similar to the 1D pinhole smearing above
	214	except that the weight function used was the 2D elliptical Gaussian function</span></p>
	215
[87f8971]	216	<p class=MsoNormal><img src="img/sm_image022.gif"><span
[318b5bbb]	217	style='font-family:"Times New Roman","serif"'> ---- (9)</span></p>
[6e8b436]	218
	219	<p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>In Eq
[318b5bbb]	220	(9), x<sub>0</sub> = qcosθ</span><span
	221	style='font-family:"Times New Roman","serif"'> and y<sub>0</sub> = qsinθ</span><span style='font-family:"Times New Roman","serif"'>
	222	, and the primed axes are in the coordinate rotated by an angle θ</span><span style='font-family:"Times New Roman","serif"'>
	223	around z-axis (below) so that x<sub>0</sub> = x<sub>0</sub>cosθ + </span><span style='font-family:"Times New Roman","serif"'>y<sub>0</sub>
	224	sinθ </span><span style='font-family:
	225	"Times New Roman","serif"'>and y<sub>0</sub> = -x<sub>0</sub>sinθ + </span><span style='font-family:"Times New Roman","serif"'>y<sub>0</sub>
	226	cosθ.</span><span style='font-family:
[6e8b436]	227	"Times New Roman","serif"'> Note that the rotation angle is zero for x-y
[318b5bbb]	228	symmetric elliptical Gaussian distribution</span>.
	229	<span style='font-family:"Times New Roman","serif"'>The A is a
[6e8b436]	230	normalization factor.</span></p>
	231
	232	<p class=MsoNormal align=center style='text-align:center'><span
[318b5bbb]	233	style='font-family:"Times New Roman","serif"'><img
[87f8971]	234	id="Object 1" src="img/sm_image023.gif"></span></p>
[6e8b436]	235
	236	<p class=MsoNormal><span style='font-family:"Times New Roman","serif"'> </span></p>
	237
	238	<p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>Now we
[318b5bbb]	239	consider a numerical integration where each bins in </span> Θ </span><span style='font-family:"Times New Roman","serif"'>
[6e8b436]	240	and R are <b>evenly </b>(this is to simplify the equation below) distributed by
[318b5bbb]	241	</span>ΔΘ </span><span style='font-family:
	242	"Times New Roman","serif"'>and </span> Δ</span><span
[6e8b436]	243	style='font-family:"Times New Roman","serif"'>R, respectively, and it is
	244	assumed that I(x, y) is constant within the bins which in turn becomes</span></p>
	245
[87f8971]	246	<p class=MsoNormal><img src="img/sm_image024.gif"></p>
[6e8b436]	247
[17574ae]	248	<p class=MsoNormal> <span
[318b5bbb]	249	style='font-family:"Times New Roman","serif"'> ---- (10)</span></p>
[6e8b436]	250
	251	<p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>Since we
	252	have found the weighting factor on each bin points, it is convenient to
[318b5bbb]	253	transform x-y back to x-y coordinate (rotating it by -θ</span><span style='font-family:"Times New Roman","serif"'>
[17574ae]	254	around z axis). Then, for the polar symmetric smear,</span></p>
[6e8b436]	255
[87f8971]	256	<p class=MsoNormal><img src="img/sm_image025.gif"><span
[318b5bbb]	257	style='position:relative;top:35.0pt'> </span> ---- (11)</p>
[6e8b436]	258
	259	<p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>where,</span></p>
	260
[87f8971]	261	<p class=MsoNormal><img src="img/sm_image026.gif">,</p>
[6e8b436]	262
	263	<p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>while
	264	for the x-y symmetric smear,</span></p>
	265
[87f8971]	266	<p class=MsoNormal><img src="img/sm_image027.gif"><span
[318b5bbb]	267	style='font-family:"Times New Roman","serif"'> ---- (12)</span></p>
[6e8b436]	268
	269	<p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>where,</span></p>
	270
[87f8971]	271	<p class=MsoNormal><img src="img/sm_image028.gif"></p>
[6e8b436]	272
	273	<p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>Here, the
	274	current version of the SANSVIEW uses the Eq. (11) for 2D smearing assuming that
	275	all the Gaussian weighting functions are aligned in the polar coordinate. </span></p>
[50764a4]	276	<p> In the control panel, the higher accuracy indicates more and finer binnng points
	277	so that it costs more in time. </p>
	278
[6e8b436]	279
	280	</div>
	281
	282	</body>
	283

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