| 1 | static double |
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| 2 | form_volume(double radius_minor, double r_ratio, double length) |
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| 3 | { |
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| 4 | return M_PI * radius_minor * radius_minor * r_ratio * length; |
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| 5 | } |
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| 6 | |
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| 7 | static double |
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| 8 | radius_from_volume(double radius_minor, double r_ratio, double length) |
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| 9 | { |
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| 10 | const double volume_ellcyl = form_volume(radius_minor,r_ratio,length); |
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| 11 | return cbrt(0.75*volume_ellcyl/M_PI); |
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| 12 | } |
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| 13 | |
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| 14 | static double |
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| 15 | radius_from_min_dimension(double radius_minor, double r_ratio, double length) |
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| 16 | { |
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| 17 | const double rad_min = (r_ratio > 1.0 ? radius_minor : r_ratio*radius_minor); |
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| 18 | return (rad_min < length ? rad_min : length); |
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| 19 | } |
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| 20 | |
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| 21 | static double |
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| 22 | radius_from_max_dimension(double radius_minor, double r_ratio, double length) |
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| 23 | { |
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| 24 | const double rad_max = (r_ratio < 1.0 ? radius_minor : r_ratio*radius_minor); |
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| 25 | return (rad_max > length ? rad_max : length); |
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| 26 | } |
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| 27 | |
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| 28 | static double |
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| 29 | radius_from_diagonal(double radius_minor, double r_ratio, double length) |
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| 30 | { |
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| 31 | const double radius_max = (r_ratio > 1.0 ? radius_minor*r_ratio : radius_minor); |
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| 32 | return sqrt(radius_max*radius_max + 0.25*length*length); |
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| 33 | } |
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| 34 | |
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| 35 | static double |
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| 36 | effective_radius(int mode, double radius_minor, double r_ratio, double length) |
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| 37 | { |
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| 38 | if (mode == 1) { |
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| 39 | return radius_from_volume(radius_minor, r_ratio, length); |
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| 40 | } else if (mode == 2) { |
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| 41 | return 0.5*radius_minor*(1.0 + r_ratio); |
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| 42 | } else if (mode == 3) { |
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| 43 | return (r_ratio > 1.0 ? radius_minor : r_ratio*radius_minor); |
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| 44 | } else if (mode == 4) { |
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| 45 | return (r_ratio < 1.0 ? radius_minor : r_ratio*radius_minor); |
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| 46 | } else if (mode == 5) { |
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| 47 | return sqrt(radius_minor*radius_minor*r_ratio); |
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| 48 | } else if (mode == 6) { |
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| 49 | return 0.5*length; |
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| 50 | } else if (mode == 7) { |
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| 51 | return radius_from_min_dimension(radius_minor,r_ratio,length); |
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| 52 | } else if (mode == 8) { |
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| 53 | return radius_from_max_dimension(radius_minor,r_ratio,length); |
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| 54 | } else { |
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| 55 | return radius_from_diagonal(radius_minor,r_ratio,length); |
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| 56 | } |
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| 57 | } |
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| 58 | |
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| 59 | static void |
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| 60 | Fq(double q, double *F1, double *F2, double radius_minor, double r_ratio, double length, |
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| 61 | double sld, double solvent_sld) |
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| 62 | { |
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| 63 | // orientational average limits |
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| 64 | const double va = 0.0; |
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| 65 | const double vb = 1.0; |
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| 66 | // inner integral limits |
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| 67 | const double vaj=0.0; |
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| 68 | const double vbj=M_PI; |
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| 69 | |
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| 70 | const double radius_major = r_ratio * radius_minor; |
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| 71 | const double rA = 0.5*(square(radius_major) + square(radius_minor)); |
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| 72 | const double rB = 0.5*(square(radius_major) - square(radius_minor)); |
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| 73 | |
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| 74 | //initialize integral |
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| 75 | double outer_sum_F1 = 0.0; |
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| 76 | double outer_sum_F2 = 0.0; |
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| 77 | for(int i=0;i<GAUSS_N;i++) { |
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| 78 | //setup inner integral over the ellipsoidal cross-section |
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| 79 | const double cos_val = ( GAUSS_Z[i]*(vb-va) + va + vb )/2.0; |
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| 80 | const double sin_val = sqrt(1.0 - cos_val*cos_val); |
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| 81 | //const double arg = radius_minor*sin_val; |
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| 82 | double inner_sum_F1 = 0.0; |
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| 83 | double inner_sum_F2 = 0.0; |
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| 84 | for(int j=0;j<GAUSS_N;j++) { |
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| 85 | const double theta = ( GAUSS_Z[j]*(vbj-vaj) + vaj + vbj )/2.0; |
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| 86 | const double r = sin_val*sqrt(rA - rB*cos(theta)); |
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| 87 | const double be = sas_2J1x_x(q*r); |
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| 88 | inner_sum_F1 += GAUSS_W[j] * be; |
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| 89 | inner_sum_F2 += GAUSS_W[j] * be * be; |
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| 90 | } |
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| 91 | //now calculate the value of the inner integral |
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| 92 | inner_sum_F1 *= 0.5*(vbj-vaj); |
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| 93 | inner_sum_F2 *= 0.5*(vbj-vaj); |
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| 94 | |
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| 95 | //now calculate outer integral |
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| 96 | const double si = sas_sinx_x(q*0.5*length*cos_val); |
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| 97 | outer_sum_F1 += GAUSS_W[i] * inner_sum_F1 * si; |
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| 98 | outer_sum_F2 += GAUSS_W[i] * inner_sum_F2 * si * si; |
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| 99 | } |
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| 100 | // correct limits and divide integral by pi |
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| 101 | outer_sum_F1 *= 0.5*(vb-va)/M_PI; |
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| 102 | outer_sum_F2 *= 0.5*(vb-va)/M_PI; |
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| 103 | |
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| 104 | // scale by contrast and volume, and convert to to 1/cm units |
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| 105 | const double volume = form_volume(radius_minor, r_ratio, length); |
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| 106 | const double contrast = sld - solvent_sld; |
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| 107 | const double s = contrast*volume; |
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| 108 | *F1 = 1.0e-2*s*outer_sum_F1; |
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| 109 | *F2 = 1.0e-4*s*s*outer_sum_F2; |
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| 110 | } |
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| 111 | |
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| 112 | |
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| 113 | static double |
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| 114 | Iqabc(double qa, double qb, double qc, |
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| 115 | double radius_minor, double r_ratio, double length, |
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| 116 | double sld, double solvent_sld) |
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| 117 | { |
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| 118 | // Compute: r = sqrt((radius_major*cos_nu)^2 + (radius_minor*cos_mu)^2) |
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| 119 | // Given: radius_major = r_ratio * radius_minor |
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| 120 | const double qr = radius_minor*sqrt(square(r_ratio*qb) + square(qa)); |
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| 121 | const double be = sas_2J1x_x(qr); |
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| 122 | const double si = sas_sinx_x(qc*0.5*length); |
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| 123 | const double fq = be * si; |
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| 124 | const double contrast = sld - solvent_sld; |
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| 125 | const double volume = form_volume(radius_minor, r_ratio, length); |
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| 126 | return 1.0e-4 * square(contrast * volume * fq); |
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| 127 | } |
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