source: sasmodels/sasmodels/models/elliptical_cylinder.c @ 275b07dc

core_shell_microgelsmagnetic_modelticket-1257-vesicle-productticket_1156ticket_1265_superballticket_822_more_unit_tests
Last change on this file since 275b07dc was 108e70e, checked in by Paul Kienzle <pkienzle@…>, 6 years ago

use Iqac/Iqabc? for the new orientation interface but Iqxy for the old
  • Property mode set to 100644
File size: 2.4 KB
RevLine 
[2a0b2b1]1static double
[251f54b]2form_volume(double radius_minor, double r_ratio, double length)
[a8b3cdb]3{
[a807206]4    return M_PI * radius_minor * radius_minor * r_ratio * length;
[a8b3cdb]5}
6
[2a0b2b1]7static double
[68425bf]8Iq(double q, double radius_minor, double r_ratio, double length,
9   double sld, double solvent_sld)
10{
[a8b3cdb]11    // orientational average limits
[68425bf]12    const double va = 0.0;
13    const double vb = 1.0;
[a8b3cdb]14    // inner integral limits
[68425bf]15    const double vaj=0.0;
16    const double vbj=M_PI;
[a8b3cdb]17
[68425bf]18    const double radius_major = r_ratio * radius_minor;
19    const double rA = 0.5*(square(radius_major) + square(radius_minor));
20    const double rB = 0.5*(square(radius_major) - square(radius_minor));
[a8b3cdb]21
[68425bf]22    //initialize integral
23    double outer_sum = 0.0;
[74768cb]24    for(int i=0;i<GAUSS_N;i++) {
[a8b3cdb]25        //setup inner integral over the ellipsoidal cross-section
[74768cb]26        const double cos_val = ( GAUSS_Z[i]*(vb-va) + va + vb )/2.0;
[68425bf]27        const double sin_val = sqrt(1.0 - cos_val*cos_val);
28        //const double arg = radius_minor*sin_val;
29        double inner_sum=0;
[74768cb]30        for(int j=0;j<GAUSS_N;j++) {
31            const double theta = ( GAUSS_Z[j]*(vbj-vaj) + vaj + vbj )/2.0;
[68425bf]32            const double r = sin_val*sqrt(rA - rB*cos(theta));
[592343f]33            const double be = sas_2J1x_x(q*r);
[74768cb]34            inner_sum += GAUSS_W[j] * be * be;
[a8b3cdb]35        }
36        //now calculate the value of the inner integral
[68425bf]37        inner_sum *= 0.5*(vbj-vaj);
[a8b3cdb]38
39        //now calculate outer integral
[1e7b0db0]40        const double si = sas_sinx_x(q*0.5*length*cos_val);
[74768cb]41        outer_sum += GAUSS_W[i] * inner_sum * si * si;
[a8b3cdb]42    }
[68425bf]43    outer_sum *= 0.5*(vb-va);
[a8b3cdb]44
[40a87fa]45    //divide integral by Pi
[68425bf]46    const double form = outer_sum/M_PI;
[a8b3cdb]47
[68425bf]48    // scale by contrast and volume, and convert to to 1/cm units
[a807206]49    const double vol = form_volume(radius_minor, r_ratio, length);
[68425bf]50    const double delrho = sld - solvent_sld;
51    return 1.0e-4*square(delrho*vol)*form;
[a8b3cdb]52}
53
54
[2a0b2b1]55static double
[108e70e]56Iqabc(double qa, double qb, double qc,
[68425bf]57     double radius_minor, double r_ratio, double length,
[becded3]58     double sld, double solvent_sld)
[68425bf]59{
60    // Compute:  r = sqrt((radius_major*cos_nu)^2 + (radius_minor*cos_mu)^2)
61    // Given:    radius_major = r_ratio * radius_minor
[82592da]62    const double qr = radius_minor*sqrt(square(r_ratio*qb) + square(qa));
[2a0b2b1]63    const double be = sas_2J1x_x(qr);
64    const double si = sas_sinx_x(qc*0.5*length);
[68425bf]65    const double Aq = be * si;
66    const double delrho = sld - solvent_sld;
[a807206]67    const double vol = form_volume(radius_minor, r_ratio, length);
[68425bf]68    return 1.0e-4 * square(delrho * vol * Aq);
[a8b3cdb]69}
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