Changes in / [e1aa129:4903cfd] in sasmodels

Location:

sasmodels

Files:

• compare.py (modified) (2 diffs)
• models/core_multi_shell.c (modified) (2 diffs)
• models/core_multi_shell.py (modified) (1 diff)
• models/flexible_cylinder.c (modified) (1 diff)
• models/lamellar_hg_stack_caille.c (modified) (4 diffs)
• models/lamellar_stack_caille.c (modified) (3 diffs)
• models/lamellar_stack_paracrystal.c (modified) (4 diffs)
• models/lamellar_stack_paracrystal.py (modified) (1 diff)
• models/linear_pearls.c (modified) (5 diffs)
• models/linear_pearls.py (modified) (2 diffs)
• models/multilayer_vesicle.c (modified) (2 diffs)
• models/multilayer_vesicle.py (modified) (4 diffs)
• models/onion.c (modified) (1 diff)
• models/onion.py (modified) (2 diffs)
• models/pearl_necklace.c (modified) (4 diffs)
• models/pearl_necklace.py (modified) (2 diffs)
• models/raspberry.py (modified) (1 diff)
• models/rpa.c (modified) (3 diffs)
• models/rpa.py (modified) (1 diff)
• models/spherical_sld.c (modified) (4 diffs)
• models/spherical_sld.py (modified) (3 diffs)
• models/stacked_disks.c (modified) (6 diffs)
• models/stacked_disks.py (modified) (1 diff)
• models/star_polymer.c (modified) (2 diffs)
• models/unified_power_Rg.py (modified) (3 diffs)

sasmodels/compare.py

@@ -340 +340 @@
         if pars['radius'] < pars['thick_string']:
             pars['radius'], pars['thick_string'] = pars['thick_string'], pars['radius']
-        pars['num_pearls'] = math.ceil(pars['num_pearls'])
         pass
 
@@ -353 +352 @@
         for c in '1234':
             pars['Phi'+c] /= total
-
-    elif name == 'stacked_disks':
-        pars['n_stacking'] = math.ceil(pars['n_stacking'])
 
 def parlist(model_info, pars, is2d):

sasmodels/models/core_multi_shell.c

@@ -8 +8 @@
 }
 
-double
-form_volume(double core_radius, double n, double thickness[]);
-double
-form_volume(double core_radius, double n, double thickness[])
+static double
+form_volume(double core_radius, double fp_n, double thickness[])
 {
   double r = core_radius;
+  int n = (int)(fp_n+0.5);
   for (int i=0; i < n; i++) {
     r += thickness[i];
@@ -20 +19 @@
 }
 
-double
+static double
 Iq(double q, double core_sld, double core_radius,
-   double solvent_sld, double num_shells, double sld[], double thickness[]);
-double
-Iq(double q, double core_sld, double core_radius,
-   double solvent_sld, double num_shells, double sld[], double thickness[])
+   double solvent_sld, double fp_n, double sld[], double thickness[])
 {
-  const int n = (int)ceil(num_shells);
+  const int n = (int)(fp_n+0.5);
   double f, r, last_sld;
   r = core_radius;

sasmodels/models/core_multi_shell.py

@@ -107 +107 @@
     Returns the SLD profile *r* (Ang), and *rho* (1e-6/Ang^2).
     """
+    n = int(n+0.5)
     z = []
     rho = []

sasmodels/models/flexible_cylinder.c

@@ -1 +1 @@
 static double
-form_volume(length, kuhn_length, radius)
+form_volume(double length, double kuhn_length, double radius)
 {
     return 1.0;

sasmodels/models/lamellar_hg_stack_caille.c

@@ -3 +3 @@
 */
 
-double Iq(double qval,
-      double length_tail,
-      double length_head,
-      double Nlayers, 
-      double dd,
-      double Cp,
-      double tail_sld,
-      double head_sld,
-      double solvent_sld);
-
-double Iq(double qval,
-      double length_tail,
-      double length_head,
-      double Nlayers, 
-      double dd,
-      double Cp,
-      double tail_sld,
-      double head_sld,
-      double solvent_sld)
+static double
+Iq(double qval,
+   double length_tail,
+   double length_head,
+   double fp_Nlayers,
+   double dd,
+   double Cp,
+   double tail_sld,
+   double head_sld,
+   double solvent_sld)
 {
-  double NN;   //local variables of coefficient wave
+  int Nlayers = (int)(fp_Nlayers+0.5);    //cast to an integer for the loop
   double inten,Pq,Sq,alpha,temp,t2;
   //double dQ, dQDefault, t1, t3;
-  int ii,NNint;
   // from wikipedia 0.577215664901532860606512090082402431042159335
   const double Euler = 0.577215664901533;   // Euler's constant, increased sig figs for new models Feb 2015
@@ -32 +22 @@
   //dQ = dQDefault; // REMOVED UNUSED dQ calculations for new models Feb 2015
 
-  NN = trunc(Nlayers);    //be sure that NN is an integer
-  
-  Pq = (head_sld-solvent_sld)*(sin(qval*(length_head+length_tail))-sin(qval*length_tail)) +
-              (tail_sld-solvent_sld)*sin(qval*length_tail);
+  Pq = (head_sld-solvent_sld)*(sin(qval*(length_head+length_tail))-sin(qval*length_tail))
+       + (tail_sld-solvent_sld)*sin(qval*length_tail);
   Pq *= Pq;
   Pq *= 4.0/(qval*qval);
 
-  NNint = (int)NN;    //cast to an integer for the loop
-  ii=0;
   Sq = 0.0;
-  for(ii=1;ii<=(NNint-1);ii+=1) {
-
-    //fii = (double)ii;   //do I really need to do this? - unused variable, removed 18Feb2015
-
+  for(int ii=1; ii<=Nlayers-1; ii++) {
     temp = 0.0;
     alpha = Cp/4.0/M_PI/M_PI*(log(M_PI*ii) + Euler);
@@ -52 +35 @@
     //t3 = dQ*dQ*dd*dd*ii*ii;
 
-    temp = 1.0-ii/NN;
+    temp = 1.0-(double)ii/(double)Nlayers;
     //temp *= cos(dd*qval*ii/(1.0+t1));
     temp *= cos(dd*qval*ii);
@@ -71 +54 @@
 
   inten *= 1.0e-04;   // 1/A to 1/cm
-  return(inten);
+  return inten;
 }
 

sasmodels/models/lamellar_stack_caille.c

@@ -3 +3 @@
 */
 
-double Iq(double qval,
-      double del,
-      double Nlayers, 
-      double dd,
-          double Cp, 
-      double sld,
-      double solvent_sld);
-
-double Iq(double qval,
-      double del,
-      double Nlayers, 
-      double dd,
-          double Cp, 
-      double sld,
-      double solvent_sld)
+static double
+Iq(double qval,
+   double del,
+   double fp_Nlayers,
+   double dd,
+   double Cp,
+   double sld,
+   double solvent_sld)
 {
-  double contr,NN;   //local variables of coefficient wave
+  int Nlayers = (int)(fp_Nlayers+0.5);    //cast to an integer for the loop
+  double contr;   //local variables of coefficient wave
   double inten,Pq,Sq,alpha,temp,t2;
   //double dQ, dQDefault, t1, t3;
-  int ii,NNint;
   // from wikipedia 0.577215664901532860606512090082402431042159335
   const double Euler = 0.577215664901533;   // Euler's constant, increased sig figs for new models Feb 2015
@@ -28 +21 @@
   //dQ = dQDefault; // REMOVED UNUSED dQ calculations for new models Feb 2015
 
-  NN = trunc(Nlayers);    //be sure that NN is an integer
-  
   contr = sld - solvent_sld;
 
   Pq = 2.0*contr*contr/qval/qval*(1.0-cos(qval*del));
 
-  NNint = (int)NN;    //cast to an integer for the loop
-  ii=0;
   Sq = 0.0;
   // the vital "=" in ii<=  added March 2015
-  for(ii=1;ii<=(NNint-1);ii+=1) {
+  for (int ii=1; ii<=Nlayers-1; ii++) {
 
     //fii = (double)ii;   //do I really need to do this? - unused variable, removed 18Feb2015
@@ -48 +37 @@
     //t3 = dQ*dQ*dd*dd*ii*ii;
 
-    temp = 1.0-ii/NN;
+    temp = 1.0 - (double)ii / (double)Nlayers;
     //temp *= cos(dd*qval*ii/(1.0+t1));
     temp *= cos(dd*qval*ii);

sasmodels/models/lamellar_stack_paracrystal.c

@@ -2 +2 @@
 
 */
-double Iq(double qval,
-      double th,
-      double Nlayers, 
-          double davg, 
-          double pd,
-      double sld,
-      double solvent_sld);
-double paraCryst_sn(double ww, double qval, double davg, long Nlayers, double an);
-double paraCryst_an(double ww, double qval, double davg, long Nlayers);
+double paraCryst_sn(double ww, double qval, double davg, int Nlayers, double an);
+double paraCryst_an(double ww, double qval, double davg, int Nlayers);
 
-double Iq(double qval,
-      double th,
-      double Nlayers, 
-          double davg, 
-          double pd,
-      double sld,
-      double solvent_sld)
+static double
+Iq(double qval,
+   double th,
+   double fp_Nlayers,
+   double davg,
+   double pd,
+   double sld,
+   double solvent_sld)
 {
-    
-        double inten,contr,xn;
-        double xi,ww,Pbil,Znq,Snq,an;
-        long n1,n2;
+        //get the fractional part of Nlayers, to determine the "mixing" of N's
+        int n1 = (int)(fp_Nlayers);             //truncate towards zero
+        int n2 = n1 + 1;
+        const double xn = (double)n2 - fp_Nlayers;      //fractional contribution of n1
         
-        contr = sld - solvent_sld;
-        //get the fractional part of Nlayers, to determine the "mixing" of N's
-        
-        n1 = (long)trunc(Nlayers);              //rounds towards zero
-        n2 = n1 + 1;
-        xn = (double)n2 - Nlayers;                      //fractional contribution of n1
-        
-        ww = exp(-qval*qval*pd*pd*davg*davg/2.0);
+        const double ww = exp(-0.5*square(qval*pd*davg));
 
         //calculate the n1 contribution
+        double Znq,Snq,an;
         an = paraCryst_an(ww,qval,davg,n1);
         Snq = paraCryst_sn(ww,qval,davg,n1,an);
-        
+
         Znq = xn*Snq;
         
@@ -52 +40 @@
 //      Zq = (1-ww^2)/(1+ww^2-2*ww*cos(qval*davg))
         
-        xi = th/2.0;            //use 1/2 the bilayer thickness
-        Pbil = (sin(qval*xi)/(qval*xi))*(sin(qval*xi)/(qval*xi));
+        const double xi = th/2.0;               //use 1/2 the bilayer thickness
+        const double Pbil = square(sas_sinx_x(qval*xi));
         
-        inten = 2.0*M_PI*contr*contr*Pbil*Znq/(qval*qval);
-        inten *= 1.0e-04;
+        const double contr = sld - solvent_sld;
+        const double inten = 2.0*M_PI*contr*contr*Pbil*Znq/(qval*qval);
 //printf("q=%.7e wwm1=%g ww=%.5e an=% 12.5e Snq=% 12.5e Znq=% 12.5e Pbil=% 12.5e\n",qval,wwm1,ww,an,Snq,Znq,Pbil);
-        return(inten);
+        return 1.0e-4*inten;
 }
 
 // functions for the lamellar paracrystal model
 double
-paraCryst_sn(double ww, double qval, double davg, long Nlayers, double an) {
+paraCryst_sn(double ww, double qval, double davg, int Nlayers, double an) {
         
         double Snq;
@@ -69 +57 @@
         Snq = an/( (double)Nlayers*square(1.0+ww*ww-2.0*ww*cos(qval*davg)) );
         
-        return(Snq);
+        return Snq;
 }
 
 double
-paraCryst_an(double ww, double qval, double davg, long Nlayers) {
-        
+paraCryst_an(double ww, double qval, double davg, int Nlayers) {
         double an;
         
@@ -82 +69 @@
         an += 2.0*pow(ww,(Nlayers+1))*cos((double)(Nlayers+1)*qval*davg);
         
-        return(an);
+        return an;
 }
 

sasmodels/models/lamellar_stack_paracrystal.py

@@ -113 +113 @@
 parameters = [["thickness", "Ang", 33.0, [0, inf], "volume",
                "sheet thickness"],
-              ["Nlayers", "", 20, [0, inf], "",
+              ["Nlayers", "", 20, [1, inf], "",
                "Number of layers"],
               ["d_spacing", "Ang", 250., [0.0, inf], "",

sasmodels/models/linear_pearls.c

@@ -4 +4 @@
             double radius,
             double edge_sep,
-            double num_pearls,
+            double fp_num_pearls,
             double pearl_sld,
             double solvent_sld);
@@ -11 +11 @@
             double radius,
             double edge_sep,
-            double num_pearls,
+            int num_pearls,
             double pearl_sld,
             double solvent_sld);
 
 
-double form_volume(double radius, double num_pearls)
+double form_volume(double radius, double fp_num_pearls)
 {
+    int num_pearls = (int)(fp_num_pearls + 0.5);
     // Pearl volume
     double pearl_vol = M_4PI_3 * cube(radius);
@@ -27 +28 @@
             double radius,
             double edge_sep,
-            double num_pearls,
+            int num_pearls,
             double pearl_sld,
             double solvent_sld)
 {
-    double n_contrib;
     //relative sld
     double contrast_pearl = pearl_sld - solvent_sld;
@@ -46 +46 @@
     double psi = sas_3j1x_x(q * radius);
 
-    // N pearls contribution
-    int n_max = num_pearls - 1;
-    n_contrib = num_pearls;
-    for(int num=1; num<=n_max; num++) {
-        n_contrib += (2.0*(num_pearls-num)*sas_sinx_x(q*separation*num));
+    // N pearls interaction terms 
+    double structure_factor = (double)num_pearls;
+    for(int num=1; num<num_pearls; num++) {
+        structure_factor += 2.0*(num_pearls-num)*sas_sinx_x(q*separation*num);
     }
     // form factor for num_pearls
-    double form_factor = 1.0e-4 * n_contrib * square(m_s*psi) / tot_vol;
+    double form_factor = 1.0e-4 * structure_factor * square(m_s*psi) / tot_vol;
 
     return form_factor;
@@ -61 +60 @@
             double radius,
             double edge_sep,
-            double num_pearls,
+            double fp_num_pearls,
             double pearl_sld,
             double solvent_sld)
 {
 
+    int num_pearls = (int)(fp_num_pearls + 0.5);
         double result = linear_pearls_kernel(q,
                     radius,

sasmodels/models/linear_pearls.py

@@ -16 +16 @@
 .. math::
 
-    P(Q) = \frac{scale}{V}\left[ m_{p}^2
-    \left(N+2\sum_{n-1}^{N-1}(N-n)\frac{sin(qnl)}{qnl}\right)
-    \left( 3\frac{sin(qR)-qRcos(qR)}{(qr)^3}\right)^2\right]
+    P(Q) = \frac{\text{scale}}{V}\left[ m_{p}^2
+    \left(N+2\sum_{n-1}^{N-1}(N-n)\frac{\sin(qnl)}{qnl}\right)
+    \left( 3\frac{\sin(qR)-qR\cos(qR)}{(qr)^3}\right)^2\right]
 
 where the mass $m_p$ is $(SLD_{pearl}-SLD_{solvent})*(volume\ of\ N\ pearls)$.
@@ -56 +56 @@
     ["radius",      "Ang",       80.0, [0, inf],     "", "Radius of the pearls"],
     ["edge_sep",    "Ang",      350.0, [0, inf],     "", "Length of the string segment - surface to surface"],
-    ["num_pearls",  "",           3.0, [0, inf],     "", "Number of the pearls"],
+    ["num_pearls",  "",           3.0, [1, inf],     "", "Number of the pearls"],
     ["sld",   "1e-6/Ang^2", 1.0, [-inf, inf],  "sld", "SLD of the pearl spheres"],
     ["sld_solvent", "1e-6/Ang^2", 6.3, [-inf, inf],  "sld", "SLD of the solvent"],

sasmodels/models/multilayer_vesicle.c

@@ -7 +7 @@
           double sld_solvent,
           double sld,
-          double n_pairs)
+          int n_pairs)
 {
     //calculate with a loop, two shells at a time
@@ -47 +47 @@
           double sld_solvent,
           double sld,
-          double n_pairs)
+          double fp_n_pairs)
 {
+    int n_pairs = (int)(fp_n_pairs + 0.5);
     return multilayer_vesicle_kernel(q,
            volfraction,

sasmodels/models/multilayer_vesicle.py

@@ -19 +19 @@
 
 .. math::
+    P(q) = \text{scale} \cdot \frac{V_f}{V_t} F^2(q) + \text{background}
 
-    P(q) = \frac{\text{scale.volfraction}}{V_t} F^2(q) + \text{background}
-
-where
+for
 
 .. math::
+    F(q) = (\rho_\text{shell}-\rho_\text{solv}) \sum_{i=1}^{n_\text{pairs}}
+        \left[
+          3V(R_i)\frac{\sin(qR_i)-qR_i\cos(qR_i)}{(qR_i)^3} \\
+          - 3V(R_i+t_s)\frac{\sin(q(R_i+t_s))-q(R_i+t_s)\cos(q(R_i+t_s))}{(q(R_i+t_s))^3}
+        \right]
 
-     F(q) = (\rho_{shell}-\rho_{solv}) \sum_{i=1}^{n\_pairs} \left[
-     3V(R_i)\frac{\sin(qR_i)-qR_i\cos(qR_i)}{(qR_i)^3} \\
-      - 3V(R_i+t_s)\frac{\sin(q(R_i+t_s))-q(R_i+t_s)\cos(q(R_i+t_s))}{(q(R_i+t_s))^3}
-     \right]
+and
 
+.. math::
+     R_i = r_c + (i-1)(t_s + t_w)
 
-where $R_i = r_c + (i-1)(t_s + t_w)$
-   
-where $V_t$ is the volume of the whole particle, $V(R)$ is the volume of a sphere
-of radius $R$, $r_c$ is the radius of the core, $\rho_{shell}$ is the scattering length 
-density of a shell, $\rho_{solv}$ is the scattering length density of the solvent.
+where $V_f$ is the volume fraction of particles, $V_t$ is the volume of the
+whole particle, $V(r)$ is the volume of a sphere of radius $r$, $r_c$ is the
+radius of the core, $\rho_\text{shell}$ is the scattering length density of a
+shell, $\rho_\text{solv}$ is the scattering length density of the solvent.
 
+The outer most radius, $r_o = R_n + t_s$, is used for both the volume fraction
+normalization and for the effective radius for *S(Q)* when $P(Q) * S(Q)$
+is applied.
 
 The 2D scattering intensity is the same as 1D, regardless of the orientation
@@ -45 +50 @@
 
     q = \sqrt{q_x^2 + q_y^2}
-
-
-The outer most radius
-
-$radius + n\_pairs * thick\_shell + (n\_pairs- 1) * thick\_solvent$
-
-is used for both the volume fraction normalization and for the 
-effective radius for *S(Q)* when $P(Q) * S(Q)$ is applied.
 
 For information about polarised and magnetic scattering, see
@@ -70 +67 @@
 **Author:** NIST IGOR/DANSE **on:** pre 2010
 
-**Last Modified by:** Piotr Rozyczko**on:** Feb 24, 2016
+**Last Modified by:** Piotr Rozyczko **on:** Feb 24, 2016
 
 **Last Reviewed by:** Paul Butler **on:** March 20, 2016
@@ -109 +106 @@
 source = ["lib/sas_3j1x_x.c", "multilayer_vesicle.c"]
 
+# TODO: the following line does nothing
 polydispersity = ["radius", "n_pairs"]
 

sasmodels/models/onion.c

@@ -30 +30 @@
 
 static double
-form_volume(double radius_core, double n, double thickness[])
+form_volume(double radius_core, double n_shells, double thickness[])
 {
-  int i;
+  int n = (int)(n_shells+0.5);
   double r = radius_core;
-  for (i=0; i < n; i++) {
+  for (int i=0; i < n; i++) {
     r += thickness[i];
   }

sasmodels/models/onion.py

@@ -323 +323 @@
     Returns shape profile with x=radius, y=SLD.
     """
-
+    n_shells = int(n_shells+0.5)
     total_radius = 1.25*(sum(thickness[:n_shells]) + radius_core + 1)
     dz = total_radius/400  # 400 points for a smooth plot
@@ -366 +366 @@
     return np.asarray(z), np.asarray(rho)
 
-def ER(radius_core, n, thickness):
+def ER(radius_core, n_shells, thickness):
     """Effective radius"""
-    return np.sum(thickness[:int(n[0])], axis=0) + radius_core
+    n = int(n_shells[0]+0.5)
+    return np.sum(thickness[:n], axis=0) + radius_core
 
 demo = {

sasmodels/models/pearl_necklace.c

@@ -1 +1 @@
 double form_volume(double radius, double edge_sep,
-    double thick_string, double num_pearls);
+    double thick_string, double fp_num_pearls);
 double Iq(double q, double radius, double edge_sep,
-    double thick_string, double num_pearls, double sld, 
+    double thick_string, double fp_num_pearls, double sld,
     double string_sld, double solvent_sld);
 
@@ -9 +9 @@
 // From Igor library
 static double
-_pearl_necklace_kernel(double q, double radius, double edge_sep, double thick_string,
-    double num_pearls, double sld_pearl, double sld_string, double sld_solv)
+pearl_necklace_kernel(double q, double radius, double edge_sep, double thick_string,
+    int num_pearls, double sld_pearl, double sld_string, double sld_solv)
 {
     // number of string segments
@@ -69 +69 @@
 
 double form_volume(double radius, double edge_sep,
-    double thick_string, double num_pearls)
+    double thick_string, double fp_num_pearls)
 {
-    num_pearls = floor(num_pearls + 0.5); //Force integer number of pearls
-
-    const double num_strings = num_pearls - 1.0;
+    const int num_pearls = (int)(fp_num_pearls + 0.5); //Force integer number of pearls
+    const int num_strings = num_pearls - 1;
     const double string_vol = edge_sep * M_PI_4 * thick_string * thick_string;
     const double pearl_vol = M_4PI_3 * radius * radius * radius;
@@ -82 +81 @@
 
 double Iq(double q, double radius, double edge_sep,
-    double thick_string, double num_pearls, double sld, 
+    double thick_string, double fp_num_pearls, double sld,
     double string_sld, double solvent_sld)
 {
-    const double form = _pearl_necklace_kernel(q, radius, edge_sep,
+    const int num_pearls = (int)(fp_num_pearls + 0.5); //Force integer number of pearls
+    const double form = pearl_necklace_kernel(q, radius, edge_sep,
         thick_string, num_pearls, sld, string_sld, solvent_sld);
 

sasmodels/models/pearl_necklace.py

@@ -100 +100 @@
     Redundant with form_volume.
     """
+    num_pearls = int(num_pearls + 0.5)
     number_of_strings = num_pearls - 1.0
     string_vol = edge_sep * pi * pow((thick_string / 2.0), 2.0)
@@ -111 +112 @@
     Calculation for effective radius.
     """
+    num_pearls = int(num_pearls + 0.5)
     tot_vol = volume(radius, edge_sep, thick_string, num_pearls)
     rad_out = (tot_vol/(4.0/3.0*pi)) ** (1./3.)

sasmodels/models/raspberry.py

@@ -10 +10 @@
     Schematic of the raspberry model
 
-In order to calculate the form factor of the entire complex, the self-
-correlation of the large droplet, the self-correlation of the particles, the
-correlation terms between different particles and the cross terms between large
-droplet and small particles all need to be calculated.
+In order to calculate the form factor of the entire complex, the
+self-correlation of the large droplet, the self-correlation of the particles,
+the correlation terms between different particles and the cross terms between
+large droplet and small particles all need to be calculated.
 
-Consider two infinitely thin shells of radii R1 and R2 separated by distance r.
-The general structure of the equation is then the form factor of the two shells
-multiplied by the phase factor that accounts for the separation of their
-centers.
+Consider two infinitely thin shells of radii $R_1$ and $R_2$ separated by
+distance $r$. The general structure of the equation is then the form factor
+of the two shells multiplied by the phase factor that accounts for the
+separation of their centers.
 
 .. math::

sasmodels/models/rpa.c

@@ -1 @@
-double Iq(double q, double case_num,
+double Iq(double q, double fp_case_num,
     double N[], double Phi[], double v[], double L[], double b[],
     double Kab, double Kac, double Kad,
@@ -5 +5 @@
     );
 
-double Iq(double q, double case_num,
+double Iq(double q, double fp_case_num,
     double N[],    // DEGREE OF POLYMERIZATION
     double Phi[],  // VOL FRACTION
@@ -15 +15 @@
     )
 {
-  int icase = (int)case_num;
+  int icase = (int)(fp_case_num+0.5);
 
   double Nab,Nac,Nad,Nbc,Nbd,Ncd;

sasmodels/models/rpa.py

@@ -114 +114 @@
     Return a list of parameters to hide depending on the multiplicity parameter.
     """
+    case_num = int(case_num+0.5)
     if case_num < 2:
         return HIDE_AB

sasmodels/models/spherical_sld.c

@@ -1 +1 @@
 static double form_volume(
-    int n_shells,
+    double fp_n_shells,
     double thickness[],
     double interface[])
 {
+    int n_shells= (int)(fp_n_shells + 0.5);
     double r = 0.0;
     for (int i=0; i < n_shells; i++) {
@@ -20 +21 @@
         return pow(z, nu);
     } else if (shape==2) {
-        return 1.0 - pow(1. - z, nu);
+        return 1.0 - pow(1.0 - z, nu);
     } else if (shape==3) {
         return expm1(-nu*z)/expm1(-nu);
@@ -44 +45 @@
 static double Iq(
     double q,
-    int n_shells,
+    double fp_n_shells,
     double sld_solvent,
     double sld[],
@@ -51 +52 @@
     double shape[],
     double nu[],
-    int n_steps)
+    double fp_n_steps)
 {
     // iteration for # of shells + core + solvent
+    int n_shells = (int)(fp_n_shells + 0.5);
+    int n_steps = (int)(fp_n_steps + 0.5);
     double f=0.0;
     double r=0.0;

sasmodels/models/spherical_sld.py

@@ -233 +233 @@
     """
 
+    n_shells = int(n_shells + 0.5)
+    n_steps = int(n_steps + 0.5)
     z = []
     rho = []
@@ -240 +242 @@
     rho.append(sld[0])
 
-    for i in range(0, int(n_shells)):
+    for i in range(0, n_shells):
         z_next += thickness[i]
         z.append(z_next)
@@ -261 +263 @@
 def ER(n_shells, thickness, interface):
     """Effective radius"""
-    n_shells = int(n_shells)
+    n_shells = int(n_shells + 0.5)
     total = (np.sum(thickness[:n_shells], axis=1)
              + np.sum(interface[:n_shells], axis=1))

sasmodels/models/stacked_disks.c

@@ -1 @@
-double form_volume(double thick_core,
-                   double thick_layer,
-                   double radius,
-                   double n_stacking);
-
-double Iq(double q,
-          double thick_core,
-          double thick_layer,
-          double radius,
-          double n_stacking,
-          double sigma_dnn,
-          double core_sld,
-          double layer_sld,
-          double solvent_sld);
-
-double Iqxy(double qx, double qy,
-          double thick_core,
-          double thick_layer,
-          double radius,
-          double n_stacking,
-          double sigma_dnn,
-          double core_sld,
-          double layer_sld,
-          double solvent_sld,
-          double theta,
-          double phi);
-
-static
-double _kernel(double q,
-               double radius,
-               double core_sld,
-               double layer_sld,
-               double solvent_sld,
-               double halfheight,
-               double thick_layer,
-               double sin_alpha,
-               double cos_alpha,
-               double sigma_dnn,
-               double d,
-               double n_stacking)
+static double stacked_disks_kernel(
+    double q,
+    double halfheight,
+    double thick_layer,
+    double radius,
+    double n_stacking,
+    double sigma_dnn,
+    double core_sld,
+    double layer_sld,
+    double solvent_sld,
+    double sin_alpha,
+    double cos_alpha,
+    double d)
 
 {
@@ -88 +61 @@
 
 
-static
-double stacked_disks_kernel(double q,
-                            double thick_core,
-                            double thick_layer,
-                            double radius,
-                            double n_stacking,
-                            double sigma_dnn,
-                            double core_sld,
-                            double layer_sld,
-                            double solvent_sld)
+static double stacked_disks_1d(
+    double q,
+    double thick_core,
+    double thick_layer,
+    double radius,
+    double n_stacking,
+    double sigma_dnn,
+    double core_sld,
+    double layer_sld,
+    double solvent_sld)
 {
 /*    StackedDiscsX  :  calculates the form factor of a stacked "tactoid" of core shell disks
@@ -111 +84 @@
         double sin_alpha, cos_alpha; // slots to hold sincos function output
         SINCOS(zi, sin_alpha, cos_alpha);
-        double yyy = _kernel(q,
+        double yyy = stacked_disks_kernel(q,
+                           halfheight,
+                           thick_layer,
                            radius,
+                           n_stacking,
+                           sigma_dnn,
                            core_sld,
                            layer_sld,
                            solvent_sld,
-                           halfheight,
-                           thick_layer,
                            sin_alpha,
                            cos_alpha,
-                           sigma_dnn,
-                           d,
-                           n_stacking);
+                           d);
         summ += Gauss76Wt[i] * yyy * sin_alpha;
     }
@@ -132 +105 @@
 }
 
-double form_volume(double thick_core,
-                   double thick_layer,
-                   double radius,
-                   double n_stacking){
+static double form_volume(
+    double thick_core,
+    double thick_layer,
+    double radius,
+    double fp_n_stacking)
+{
+    int n_stacking = (int)(fp_n_stacking + 0.5);
     double d = 2.0 * thick_layer + thick_core;
     return M_PI * radius * radius * d * n_stacking;
 }
 
-double Iq(double q,
-          double thick_core,
-          double thick_layer,
-          double radius,
-          double n_stacking,
-          double sigma_dnn,
-          double core_sld,
-          double layer_sld,
-          double solvent_sld)
+static double Iq(
+    double q,
+    double thick_core,
+    double thick_layer,
+    double radius,
+    double fp_n_stacking,
+    double sigma_dnn,
+    double core_sld,
+    double layer_sld,
+    double solvent_sld)
 {
-    return stacked_disks_kernel(q,
+    int n_stacking = (int)(fp_n_stacking + 0.5);
+    return stacked_disks_1d(q,
                     thick_core,
                     thick_layer,
@@ -162 +140 @@
 
 
-double
-Iqxy(double qx, double qy,
-     double thick_core,
-     double thick_layer,
-     double radius,
-     double n_stacking,
-     double sigma_dnn,
-     double core_sld,
-     double layer_sld,
-     double solvent_sld,
-     double theta,
-     double phi)
+static double Iqxy(double qx, double qy,
+    double thick_core,
+    double thick_layer,
+    double radius,
+    double fp_n_stacking,
+    double sigma_dnn,
+    double core_sld,
+    double layer_sld,
+    double solvent_sld,
+    double theta,
+    double phi)
 {
+    int n_stacking = (int)(fp_n_stacking + 0.5);
     double q, sin_alpha, cos_alpha;
     ORIENT_SYMMETRIC(qx, qy, theta, phi, q, sin_alpha, cos_alpha);
@@ -180 +158 @@
     double d = 2.0 * thick_layer + thick_core;
     double halfheight = 0.5*thick_core;
-    double answer = _kernel(q,
+    double answer = stacked_disks_kernel(q,
+                     halfheight,
+                     thick_layer,
                      radius,
+                     n_stacking,
+                     sigma_dnn,
                      core_sld,
                      layer_sld,
                      solvent_sld,
-                     halfheight,
-                     thick_layer,
                      sin_alpha,
                      cos_alpha,
-                     sigma_dnn,
-                     d,
-                     n_stacking);
+                     d);
 
     //convert to [cm-1]

sasmodels/models/stacked_disks.py

@@ -126 +126 @@
     ["thick_layer", "Ang",        10.0, [0, inf],    "volume",      "Thickness of layer each side of core"],
     ["radius",      "Ang",        15.0, [0, inf],    "volume",      "Radius of the stacked disk"],
-    ["n_stacking",  "",            1.0, [0, inf],    "volume",      "Number of stacked layer/core/layer disks"],
+    ["n_stacking",  "",            1.0, [1, inf],    "volume",      "Number of stacked layer/core/layer disks"],
     ["sigma_d",     "Ang",         0,   [0, inf],    "",            "Sigma of nearest neighbor spacing"],
     ["sld_core",    "1e-6/Ang^2",  4,   [-inf, inf], "sld",         "Core scattering length density"],

sasmodels/models/star_polymer.c

@@ -3 +3 @@
 double Iq(double q, double radius2, double arms);
 
-static double _mass_fractal_kernel(double q, double radius2, double arms)
+static double star_polymer_kernel(double q, double radius2, double arms)
 {
 
@@ -23 +23 @@
 double Iq(double q, double radius2, double arms)
 {
-    return _mass_fractal_kernel(q, radius2, arms);
+    return star_polymer_kernel(q, radius2, arms);
 }

sasmodels/models/unified_power_Rg.py

@@ -97 +97 @@
 
 def Iq(q, level, rg, power, B, G):
-    ilevel = int(level)
-    if ilevel == 0:
+    level = int(level + 0.5)
+    if level == 0:
         with errstate(divide='ignore'):
             return 1./q
@@ -104 +104 @@
     with errstate(divide='ignore', invalid='ignore'):
         result = np.zeros(q.shape, 'd')
-        for i in range(ilevel):
+        for i in range(level):
             exp_now = exp(-(q*rg[i])**2/3.)
             pow_now = (erf(q*rg[i]/sqrt(6.))**3/q)**power[i]
-            if i < ilevel-1:
+            if i < level-1:
                 exp_next = exp(-(q*rg[i+1])**2/3.)
             else:
@@ -113 +113 @@
             result += G[i]*exp_now + B[i]*exp_next*pow_now
 
-    result[q == 0] = np.sum(G[:ilevel])
+    result[q == 0] = np.sum(G[:level])
     return result