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Diff for /JSOC/proj/sharp/apps/sw_functions.c between version 1.13 and 1.26

version 1.13, 2013/05/31 22:47:15 version 1.26, 2014/02/19 14:59:25
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    The indices are calculated on the pixels in which the conf_disambig segment is greater than 70 and    The indices are calculated on the pixels in which the conf_disambig segment is greater than 70 and
    pixels in which the bitmap segment is greater than 30. These ranges are selected because the CCD    pixels in which the bitmap segment is greater than 30. These ranges are selected because the CCD
    coordinate bitmaps are interpolated.     coordinate bitmaps are interpolated for certain data (at the time of this CVS submit, all data
      prior to 2013.08.21_17:24:00_TAI contain interpolated bitmaps; data post-2013.08.21_17:24:00_TAI
      contain nearest-neighbor bitmaps).
  
    In the CCD coordinates, this means that we are selecting the pixels that equal 90 in conf_disambig    In the CCD coordinates, this means that we are selecting the pixels that equal 90 in conf_disambig
    and the pixels that equal 33 or 44 in bitmap. Here are the definitions of the pixel values:     and the pixels that equal 33 or 34 in bitmap. Here are the definitions of the pixel values:
  
    For conf_disambig:    For conf_disambig:
    50 : not all solutions agree (weak field method applied)    50 : not all solutions agree (weak field method applied)
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    Written by Monica Bobra 15 August 2012    Written by Monica Bobra 15 August 2012
    Potential Field code (appended) written by Keiji Hayashi    Potential Field code (appended) written by Keiji Hayashi
      Error analysis modification 21 October 2013
  
 ===========================================*/ ===========================================*/
 #include <math.h> #include <math.h>
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 //  To convert G to G*cm^2, simply multiply by the number of square centimeters per pixel. //  To convert G to G*cm^2, simply multiply by the number of square centimeters per pixel.
 //  As an order of magnitude estimate, we can assign 0.5 to CDELT1 and 722500m/arcsec to (RSUN_REF/RSUN_OBS). //  As an order of magnitude estimate, we can assign 0.5 to CDELT1 and 722500m/arcsec to (RSUN_REF/RSUN_OBS).
 //  (Gauss/pix^2)(CDELT1)^2(RSUN_REF/RSUN_OBS)^2(100.cm/m)^2 //  (Gauss/pix^2)(CDELT1)^2(RSUN_REF/RSUN_OBS)^2(100.cm/m)^2
 //  =(Gauss/pix^2)(0.5 arcsec/pix)^2(722500m/arcsec)^2(100cm/m)^2  //  =Gauss*cm^2
 //  =(1.30501e15)Gauss*cm^2  
   
 //  The disambig mask value selects only the pixels with values of 5 or 7 -- that is,  
 //  5: pixels for which the radial acute disambiguation solution was chosen  
 //  7: pixels for which the radial acute and NRWA disambiguation agree  
  
 int computeAbsFlux(float *bz_err, float *bz, int *dims, float *absFlux, int computeAbsFlux(float *bz_err, float *bz, int *dims, float *absFlux,
                    float *mean_vf_ptr, float *mean_vf_err_ptr, float *count_mask_ptr, int *mask,                    float *mean_vf_ptr, float *mean_vf_err_ptr, float *count_mask_ptr, int *mask,
Line 73  int computeAbsFlux(float *bz_err, float
Line 71  int computeAbsFlux(float *bz_err, float
  
 { {
  
     int nx = dims[0], ny = dims[1];      int nx = dims[0];
     int i, j, count_mask=0;      int ny = dims[1];
     double sum,err=0.0;      int i = 0;
       int j = 0;
     if (nx <= 0 || ny <= 0) return 1;      int count_mask = 0;
       double sum = 0.0;
       double err = 0.0;
     *absFlux = 0.0;     *absFlux = 0.0;
     *mean_vf_ptr =0.0;     *mean_vf_ptr =0.0;
  
   
       if (nx <= 0 || ny <= 0) return 1;
   
         for (i = 0; i < nx; i++)         for (i = 0; i < nx; i++)
         {         {
                 for (j = 0; j < ny; j++)                 for (j = 0; j < ny; j++)
Line 97  int computeAbsFlux(float *bz_err, float
Line 99  int computeAbsFlux(float *bz_err, float
      *mean_vf_ptr     = sum*cdelt1*cdelt1*(rsun_ref/rsun_obs)*(rsun_ref/rsun_obs)*100.0*100.0;      *mean_vf_ptr     = sum*cdelt1*cdelt1*(rsun_ref/rsun_obs)*(rsun_ref/rsun_obs)*100.0*100.0;
      *mean_vf_err_ptr = (sqrt(err))*fabs(cdelt1*cdelt1*(rsun_ref/rsun_obs)*(rsun_ref/rsun_obs)*100.0*100.0); // error in the unsigned flux      *mean_vf_err_ptr = (sqrt(err))*fabs(cdelt1*cdelt1*(rsun_ref/rsun_obs)*(rsun_ref/rsun_obs)*100.0*100.0); // error in the unsigned flux
      *count_mask_ptr  = count_mask;      *count_mask_ptr  = count_mask;
      printf("CMASK=%g\n",*count_mask_ptr);  
      printf("USFLUX=%g\n",*mean_vf_ptr);  
      printf("sum=%f\n",sum);  
      printf("USFLUX_err=%g\n",*mean_vf_err_ptr);  
      return 0;      return 0;
 } }
  
Line 113  int computeBh(float *bx_err, float *by_e
Line 111  int computeBh(float *bx_err, float *by_e
  
 { {
  
     int nx = dims[0], ny = dims[1];      int nx = dims[0];
     int i, j, count_mask=0;      int ny = dims[1];
     float sum=0.0;      int i = 0;
       int j = 0;
       int count_mask = 0;
       double sum = 0.0;
     *mean_hf_ptr = 0.0;     *mean_hf_ptr = 0.0;
  
     if (nx <= 0 || ny <= 0) return 1;     if (nx <= 0 || ny <= 0) return 1;
Line 124  int computeBh(float *bx_err, float *by_e
Line 125  int computeBh(float *bx_err, float *by_e
           {           {
             for (j = 0; j < ny; j++)             for (j = 0; j < ny; j++)
               {               {
                 if isnan(bx[j * nx + i]) continue;                   if isnan(bx[j * nx + i])
                 if isnan(by[j * nx + i]) continue;                   {
                       bh[j * nx + i] = NAN;
                       bh_err[j * nx + i] = NAN;
                       continue;
                    }
                    if isnan(by[j * nx + i])
                    {
                       bh[j * nx + i] = NAN;
                       bh_err[j * nx + i] = NAN;
                       continue;
                    }
                 bh[j * nx + i] = sqrt( bx[j * nx + i]*bx[j * nx + i] + by[j * nx + i]*by[j * nx + i] );                 bh[j * nx + i] = sqrt( bx[j * nx + i]*bx[j * nx + i] + by[j * nx + i]*by[j * nx + i] );
                 sum += bh[j * nx + i];                 sum += bh[j * nx + i];
                 bh_err[j * nx + i]=sqrt( bx[j * nx + i]*bx[j * nx + i]*bx_err[j * nx + i]*bx_err[j * nx + i] + by[j * nx + i]*by[j * nx + i]*by_err[j * nx + i]*by_err[j * nx + i])/ bh[j * nx + i];                 bh_err[j * nx + i]=sqrt( bx[j * nx + i]*bx[j * nx + i]*bx_err[j * nx + i]*bx_err[j * nx + i] + by[j * nx + i]*by[j * nx + i]*by_err[j * nx + i]*by_err[j * nx + i])/ bh[j * nx + i];
Line 141  int computeBh(float *bx_err, float *by_e
Line 152  int computeBh(float *bx_err, float *by_e
 /*===========================================*/ /*===========================================*/
 /* Example function 3: Calculate Gamma in units of degrees */ /* Example function 3: Calculate Gamma in units of degrees */
 // Native units of atan(x) are in radians; to convert from radians to degrees, multiply by (180./PI) // Native units of atan(x) are in radians; to convert from radians to degrees, multiply by (180./PI)
 // Redo calculation in radians for error analysis (since derivatives are only true in units of radians).  //
   // Error analysis calculations are done in radians (since derivatives are only true in units of radians),
   // and multiplied by (180./PI) at the end for consistency in units.
  
 int computeGamma(float *bz_err, float *bh_err, float *bx, float *by, float *bz, float *bh, int *dims, int computeGamma(float *bz_err, float *bh_err, float *bx, float *by, float *bz, float *bh, int *dims,
                  float *mean_gamma_ptr, float *mean_gamma_err_ptr, int *mask, int *bitmask)                  float *mean_gamma_ptr, float *mean_gamma_err_ptr, int *mask, int *bitmask)
 { {
     int nx = dims[0], ny = dims[1];      int nx = dims[0];
     int i, j, count_mask=0;      int ny = dims[1];
       int i = 0;
     if (nx <= 0 || ny <= 0) return 1;      int j = 0;
       int count_mask = 0;
       double sum = 0.0;
       double err = 0.0;
     *mean_gamma_ptr=0.0;     *mean_gamma_ptr=0.0;
     float sum,err,err_value=0.0;  
  
       if (nx <= 0 || ny <= 0) return 1;
  
         for (i = 0; i < nx; i++)         for (i = 0; i < nx; i++)
           {           {
Line 165  int computeGamma(float *bz_err, float *b
Line 180  int computeGamma(float *bz_err, float *b
                     if isnan(bz[j * nx + i]) continue;                     if isnan(bz[j * nx + i]) continue;
                     if isnan(bz_err[j * nx + i]) continue;                     if isnan(bz_err[j * nx + i]) continue;
                     if isnan(bh_err[j * nx + i]) continue;                     if isnan(bh_err[j * nx + i]) continue;
                       if isnan(bh[j * nx + i]) continue;
                     if (bz[j * nx + i] == 0) continue;                     if (bz[j * nx + i] == 0) continue;
                     sum += (atan(fabs(bz[j * nx + i]/bh[j * nx + i] )))*(180./PI);                      sum += fabs(atan(bh[j * nx + i]/fabs(bz[j * nx + i])))*(180./PI);
                     err += (( sqrt ( ((bz_err[j * nx + i]*bz_err[j * nx + i])/(bz[j * nx + i]*bz[j * nx + i])) + ((bh_err[j * nx + i]*bh_err[j * nx + i])/(bh[j * nx + i]*bh[j * nx + i])))  * fabs(bz[j * nx + i]/bh[j * nx + i]) ) / (1 + (bz[j * nx + i]/bh[j * nx + i])*(bz[j * nx + i]/bh[j * nx + i]))) *(180./PI);                      err += (1/(1+((bh[j * nx + i]*bh[j * nx + i])/(bz[j * nx + i]*bz[j * nx + i]))))*(1/(1+((bh[j * nx + i]*bh[j * nx + i])/(bz[j * nx + i]*bz[j * nx + i])))) *
                              ( ((bh_err[j * nx + i]*bh_err[j * nx + i])/(bz[j * nx + i]*bz[j * nx + i])) +
                                ((bh[j * nx + i]*bh[j * nx + i]*bz_err[j * nx + i]*bz_err[j * nx + i])/(bz[j * nx + i]*bz[j * nx + i]*bz[j * nx + i]*bz[j * nx + i])) );
                     count_mask++;                     count_mask++;
                   }                   }
               }               }
           }           }
  
      *mean_gamma_ptr = sum/count_mask;      *mean_gamma_ptr = sum/count_mask;
      *mean_gamma_err_ptr = (sqrt(err*err))/(count_mask*100.); // error in the quantity (sum)/(count_mask)       *mean_gamma_err_ptr = (sqrt(err)/(count_mask))*(180./PI);
      printf("MEANGAM=%f\n",*mean_gamma_ptr);       //printf("MEANGAM=%f\n",*mean_gamma_ptr);
      printf("MEANGAM_err=%f\n",*mean_gamma_err_ptr);       //printf("MEANGAM_err=%f\n",*mean_gamma_err_ptr);
      return 0;      return 0;
 } }
  
Line 187  int computeGamma(float *bz_err, float *b
Line 205  int computeGamma(float *bz_err, float *b
 int computeB_total(float *bx_err, float *by_err, float *bz_err, float *bt_err, float *bx, float *by, float *bz, float *bt, int *dims, int *mask, int *bitmask) int computeB_total(float *bx_err, float *by_err, float *bz_err, float *bt_err, float *bx, float *by, float *bz, float *bt, int *dims, int *mask, int *bitmask)
 { {
  
     int nx = dims[0], ny = dims[1];      int nx = dims[0];
     int i, j, count_mask=0;      int ny = dims[1];
       int i = 0;
       int j = 0;
       int count_mask = 0;
  
     if (nx <= 0 || ny <= 0) return 1;     if (nx <= 0 || ny <= 0) return 1;
  
Line 196  int computeB_total(float *bx_err, float
Line 217  int computeB_total(float *bx_err, float
           {           {
             for (j = 0; j < ny; j++)             for (j = 0; j < ny; j++)
               {               {
                 if isnan(bx[j * nx + i]) continue;                   if isnan(bx[j * nx + i])
                 if isnan(by[j * nx + i]) continue;                   {
                 if isnan(bz[j * nx + i]) continue;                      bt[j * nx + i] = NAN;
                       bt_err[j * nx + i] = NAN;
                       continue;
                    }
                    if isnan(by[j * nx + i])
                    {
                       bt[j * nx + i] = NAN;
                       bt_err[j * nx + i] = NAN;
                       continue;
                    }
                    if isnan(bz[j * nx + i])
                    {
                       bt[j * nx + i] = NAN;
                       bt_err[j * nx + i] = NAN;
                       continue;
                    }
                 bt[j * nx + i] = sqrt( bx[j * nx + i]*bx[j * nx + i] + by[j * nx + i]*by[j * nx + i] + bz[j * nx + i]*bz[j * nx + i]);                 bt[j * nx + i] = sqrt( bx[j * nx + i]*bx[j * nx + i] + by[j * nx + i]*by[j * nx + i] + bz[j * nx + i]*bz[j * nx + i]);
                 bt_err[j * nx + i]=sqrt(bx[j * nx + i]*bx[j * nx + i]*bx_err[j * nx + i]*bx_err[j * nx + i] + by[j * nx + i]*by[j * nx + i]*by_err[j * nx + i]*by_err[j * nx + i] + bz[j * nx + i]*bz[j * nx + i]*bz_err[j * nx + i]*bz_err[j * nx + i] )/bt[j * nx + i];                 bt_err[j * nx + i]=sqrt(bx[j * nx + i]*bx[j * nx + i]*bx_err[j * nx + i]*bx_err[j * nx + i] + by[j * nx + i]*by[j * nx + i]*by_err[j * nx + i]*by_err[j * nx + i] + bz[j * nx + i]*bz[j * nx + i]*bz_err[j * nx + i]*bz_err[j * nx + i] )/bt[j * nx + i];
               }               }
Line 212  int computeB_total(float *bx_err, float
Line 248  int computeB_total(float *bx_err, float
 int computeBtotalderivative(float *bt, int *dims, float *mean_derivative_btotal_ptr, int *mask, int *bitmask, float *derx_bt, float *dery_bt, float *bt_err, float *mean_derivative_btotal_err_ptr) int computeBtotalderivative(float *bt, int *dims, float *mean_derivative_btotal_ptr, int *mask, int *bitmask, float *derx_bt, float *dery_bt, float *bt_err, float *mean_derivative_btotal_err_ptr)
 { {
  
     int nx = dims[0], ny = dims[1];      int nx = dims[0];
     int i, j, count_mask=0;      int ny = dims[1];
       int i = 0;
     if (nx <= 0 || ny <= 0) return 1;      int j = 0;
       int count_mask = 0;
       double sum = 0.0;
       double err = 0.0;
     *mean_derivative_btotal_ptr = 0.0;     *mean_derivative_btotal_ptr = 0.0;
     float sum, err = 0.0;  
  
       if (nx <= 0 || ny <= 0) return 1;
  
         /* brute force method of calculating the derivative (no consideration for edges) */         /* brute force method of calculating the derivative (no consideration for edges) */
         for (i = 1; i <= nx-2; i++)         for (i = 1; i <= nx-2; i++)
Line 266  int computeBtotalderivative(float *bt, i
Line 304  int computeBtotalderivative(float *bt, i
           }           }
  
  
         for (i = 0; i <= nx-1; i++)          for (i = 1; i <= nx-2; i++)
           {           {
             for (j = 0; j <= ny-1; j++)              for (j = 1; j <= ny-2; j++)
             {             {
                if ( mask[j * nx + i] < 70 || bitmask[j * nx + i] < 30 ) continue;                if ( mask[j * nx + i] < 70 || bitmask[j * nx + i] < 30 ) continue;
                  if ( (derx_bt[j * nx + i] + dery_bt[j * nx + i]) == 0) continue;
                  if isnan(bt[j * nx + i])      continue;
                  if isnan(bt[(j+1) * nx + i])  continue;
                  if isnan(bt[(j-1) * nx + i])  continue;
                  if isnan(bt[j * nx + i-1])    continue;
                  if isnan(bt[j * nx + i+1])    continue;
                  if isnan(bt_err[j * nx + i])  continue;
                if isnan(derx_bt[j * nx + i]) continue;                if isnan(derx_bt[j * nx + i]) continue;
                if isnan(dery_bt[j * nx + i]) continue;                if isnan(dery_bt[j * nx + i]) continue;
                sum += sqrt( derx_bt[j * nx + i]*derx_bt[j * nx + i]  + dery_bt[j * nx + i]*dery_bt[j * nx + i]  ); /* Units of Gauss */                sum += sqrt( derx_bt[j * nx + i]*derx_bt[j * nx + i]  + dery_bt[j * nx + i]*dery_bt[j * nx + i]  ); /* Units of Gauss */
                err += (2.0)*bt_err[j * nx + i]*bt_err[j * nx + i];                 err += (((bt[(j+1) * nx + i]-bt[(j-1) * nx + i])*(bt[(j+1) * nx + i]-bt[(j-1) * nx + i])) * (bt_err[(j+1) * nx + i]*bt_err[(j+1) * nx + i] + bt_err[(j-1) * nx + i]*bt_err[(j-1) * nx + i])) / (16.0*( derx_bt[j * nx + i]*derx_bt[j * nx + i]  + dery_bt[j * nx + i]*dery_bt[j * nx + i]  ))+
                         (((bt[j * nx + (i+1)]-bt[j * nx + (i-1)])*(bt[j * nx + (i+1)]-bt[j * nx + (i-1)])) * (bt_err[j * nx + (i+1)]*bt_err[j * nx + (i+1)] + bt_err[j * nx + (i-1)]*bt_err[j * nx + (i-1)])) / (16.0*( derx_bt[j * nx + i]*derx_bt[j * nx + i]  + dery_bt[j * nx + i]*dery_bt[j * nx + i]  )) ;
                count_mask++;                count_mask++;
             }             }
           }           }
  
         *mean_derivative_btotal_ptr     = (sum)/(count_mask); // would be divided by ((nx-2)*(ny-2)) if shape of count_mask = shape of magnetogram          *mean_derivative_btotal_ptr     = (sum)/(count_mask);
         *mean_derivative_btotal_err_ptr = (sqrt(err))/(count_mask); // error in the quantity (sum)/(count_mask)          *mean_derivative_btotal_err_ptr = (sqrt(err))/(count_mask);
         printf("MEANGBT=%f\n",*mean_derivative_btotal_ptr);          //printf("MEANGBT=%f\n",*mean_derivative_btotal_ptr);
         printf("MEANGBT_err=%f\n",*mean_derivative_btotal_err_ptr);          //printf("MEANGBT_err=%f\n",*mean_derivative_btotal_err_ptr);
   
         return 0;         return 0;
 } }
  
Line 293  int computeBtotalderivative(float *bt, i
Line 340  int computeBtotalderivative(float *bt, i
 int computeBhderivative(float *bh, float *bh_err, int *dims, float *mean_derivative_bh_ptr, float *mean_derivative_bh_err_ptr, int *mask, int *bitmask, float *derx_bh, float *dery_bh) int computeBhderivative(float *bh, float *bh_err, int *dims, float *mean_derivative_bh_ptr, float *mean_derivative_bh_err_ptr, int *mask, int *bitmask, float *derx_bh, float *dery_bh)
 { {
  
         int nx = dims[0], ny = dims[1];       int nx = dims[0];
         int i, j, count_mask=0;       int ny = dims[1];
        int i = 0;
        int j = 0;
        int count_mask = 0;
        double sum= 0.0;
        double err =0.0;
        *mean_derivative_bh_ptr = 0.0;
  
         if (nx <= 0 || ny <= 0) return 1;         if (nx <= 0 || ny <= 0) return 1;
  
         *mean_derivative_bh_ptr = 0.0;  
         float sum,err = 0.0;  
   
         /* brute force method of calculating the derivative (no consideration for edges) */         /* brute force method of calculating the derivative (no consideration for edges) */
         for (i = 1; i <= nx-2; i++)         for (i = 1; i <= nx-2; i++)
           {           {
Line 351  int computeBhderivative(float *bh, float
Line 401  int computeBhderivative(float *bh, float
             for (j = 0; j <= ny-1; j++)             for (j = 0; j <= ny-1; j++)
             {             {
                if ( mask[j * nx + i] < 70 || bitmask[j * nx + i] < 30 ) continue;                if ( mask[j * nx + i] < 70 || bitmask[j * nx + i] < 30 ) continue;
                  if ( (derx_bh[j * nx + i] + dery_bh[j * nx + i]) == 0) continue;
                  if isnan(bh[j * nx + i])      continue;
                  if isnan(bh[(j+1) * nx + i])  continue;
                  if isnan(bh[(j-1) * nx + i])  continue;
                  if isnan(bh[j * nx + i-1])    continue;
                  if isnan(bh[j * nx + i+1])    continue;
                  if isnan(bh_err[j * nx + i])  continue;
                if isnan(derx_bh[j * nx + i]) continue;                if isnan(derx_bh[j * nx + i]) continue;
                if isnan(dery_bh[j * nx + i]) continue;                if isnan(dery_bh[j * nx + i]) continue;
                sum += sqrt( derx_bh[j * nx + i]*derx_bh[j * nx + i]  + dery_bh[j * nx + i]*dery_bh[j * nx + i]  ); /* Units of Gauss */                sum += sqrt( derx_bh[j * nx + i]*derx_bh[j * nx + i]  + dery_bh[j * nx + i]*dery_bh[j * nx + i]  ); /* Units of Gauss */
                err += (2.0)*bh_err[j * nx + i]*bh_err[j * nx + i];                 err += (((bh[(j+1) * nx + i]-bh[(j-1) * nx + i])*(bh[(j+1) * nx + i]-bh[(j-1) * nx + i])) * (bh_err[(j+1) * nx + i]*bh_err[(j+1) * nx + i] + bh_err[(j-1) * nx + i]*bh_err[(j-1) * nx + i])) / (16.0*( derx_bh[j * nx + i]*derx_bh[j * nx + i]  + dery_bh[j * nx + i]*dery_bh[j * nx + i]  ))+
                         (((bh[j * nx + (i+1)]-bh[j * nx + (i-1)])*(bh[j * nx + (i+1)]-bh[j * nx + (i-1)])) * (bh_err[j * nx + (i+1)]*bh_err[j * nx + (i+1)] + bh_err[j * nx + (i-1)]*bh_err[j * nx + (i-1)])) / (16.0*( derx_bh[j * nx + i]*derx_bh[j * nx + i]  + dery_bh[j * nx + i]*dery_bh[j * nx + i]  )) ;
                count_mask++;                count_mask++;
             }             }
           }           }
  
         *mean_derivative_bh_ptr     = (sum)/(count_mask); // would be divided by ((nx-2)*(ny-2)) if shape of count_mask = shape of magnetogram         *mean_derivative_bh_ptr     = (sum)/(count_mask); // would be divided by ((nx-2)*(ny-2)) if shape of count_mask = shape of magnetogram
         *mean_derivative_bh_err_ptr = (sqrt(err))/(count_mask); // error in the quantity (sum)/(count_mask)         *mean_derivative_bh_err_ptr = (sqrt(err))/(count_mask); // error in the quantity (sum)/(count_mask)
         printf("MEANGBH=%f\n",*mean_derivative_bh_ptr);          //printf("MEANGBH=%f\n",*mean_derivative_bh_ptr);
         printf("MEANGBH_err=%f\n",*mean_derivative_bh_err_ptr);          //printf("MEANGBH_err=%f\n",*mean_derivative_bh_err_ptr);
  
         return 0;         return 0;
 } }
Line 373  int computeBhderivative(float *bh, float
Line 431  int computeBhderivative(float *bh, float
 int computeBzderivative(float *bz, float *bz_err, int *dims, float *mean_derivative_bz_ptr, float *mean_derivative_bz_err_ptr, int *mask, int *bitmask, float *derx_bz, float *dery_bz) int computeBzderivative(float *bz, float *bz_err, int *dims, float *mean_derivative_bz_ptr, float *mean_derivative_bz_err_ptr, int *mask, int *bitmask, float *derx_bz, float *dery_bz)
 { {
  
         int nx = dims[0], ny = dims[1];          int nx = dims[0];
         int i, j, count_mask=0;          int ny = dims[1];
           int i = 0;
           int j = 0;
           int count_mask = 0;
           double sum = 0.0;
           double err = 0.0;
           *mean_derivative_bz_ptr = 0.0;
  
         if (nx <= 0 || ny <= 0) return 1;         if (nx <= 0 || ny <= 0) return 1;
  
         *mean_derivative_bz_ptr = 0.0;  
         float sum,err = 0.0;  
   
         /* brute force method of calculating the derivative (no consideration for edges) */         /* brute force method of calculating the derivative (no consideration for edges) */
         for (i = 1; i <= nx-2; i++)         for (i = 1; i <= nx-2; i++)
           {           {
Line 436  int computeBzderivative(float *bz, float
Line 497  int computeBzderivative(float *bz, float
           {           {
             for (j = 0; j <= ny-1; j++)             for (j = 0; j <= ny-1; j++)
             {             {
                // if ( (derx_bz[j * nx + i]-dery_bz[j * nx + i]) == 0) continue;  
                if ( mask[j * nx + i] < 70 || bitmask[j * nx + i] < 30 ) continue;                if ( mask[j * nx + i] < 70 || bitmask[j * nx + i] < 30 ) continue;
                  if ( (derx_bz[j * nx + i] + dery_bz[j * nx + i]) == 0) continue;
                if isnan(bz[j * nx + i]) continue;                if isnan(bz[j * nx + i]) continue;
                //if isnan(bz_err[j * nx + i]) continue;                 if isnan(bz[(j+1) * nx + i])  continue;
                  if isnan(bz[(j-1) * nx + i])  continue;
                  if isnan(bz[j * nx + i-1])    continue;
                  if isnan(bz[j * nx + i+1])    continue;
                  if isnan(bz_err[j * nx + i])  continue;
                if isnan(derx_bz[j * nx + i]) continue;                if isnan(derx_bz[j * nx + i]) continue;
                if isnan(dery_bz[j * nx + i]) continue;                if isnan(dery_bz[j * nx + i]) continue;
                sum += sqrt( derx_bz[j * nx + i]*derx_bz[j * nx + i]  + dery_bz[j * nx + i]*dery_bz[j * nx + i]  ); /* Units of Gauss */                sum += sqrt( derx_bz[j * nx + i]*derx_bz[j * nx + i]  + dery_bz[j * nx + i]*dery_bz[j * nx + i]  ); /* Units of Gauss */
                err += 2.0*bz_err[j * nx + i]*bz_err[j * nx + i];                 err += (((bz[(j+1) * nx + i]-bz[(j-1) * nx + i])*(bz[(j+1) * nx + i]-bz[(j-1) * nx + i])) * (bz_err[(j+1) * nx + i]*bz_err[(j+1) * nx + i] + bz_err[(j-1) * nx + i]*bz_err[(j-1) * nx + i])) /
                           (16.0*( derx_bz[j * nx + i]*derx_bz[j * nx + i]  + dery_bz[j * nx + i]*dery_bz[j * nx + i]  )) +
                         (((bz[j * nx + (i+1)]-bz[j * nx + (i-1)])*(bz[j * nx + (i+1)]-bz[j * nx + (i-1)])) * (bz_err[j * nx + (i+1)]*bz_err[j * nx + (i+1)] + bz_err[j * nx + (i-1)]*bz_err[j * nx + (i-1)])) /
                           (16.0*( derx_bz[j * nx + i]*derx_bz[j * nx + i]  + dery_bz[j * nx + i]*dery_bz[j * nx + i]  )) ;
                count_mask++;                count_mask++;
             }             }
           }           }
  
         *mean_derivative_bz_ptr = (sum)/(count_mask); // would be divided by ((nx-2)*(ny-2)) if shape of count_mask = shape of magnetogram         *mean_derivative_bz_ptr = (sum)/(count_mask); // would be divided by ((nx-2)*(ny-2)) if shape of count_mask = shape of magnetogram
         *mean_derivative_bz_err_ptr = (sqrt(err))/(count_mask); // error in the quantity (sum)/(count_mask)         *mean_derivative_bz_err_ptr = (sqrt(err))/(count_mask); // error in the quantity (sum)/(count_mask)
         printf("MEANGBZ=%f\n",*mean_derivative_bz_ptr);          //printf("MEANGBZ=%f\n",*mean_derivative_bz_ptr);
         printf("MEANGBZ_err=%f\n",*mean_derivative_bz_err_ptr);          //printf("MEANGBZ_err=%f\n",*mean_derivative_bz_err_ptr);
  
         return 0;         return 0;
 } }
Line 498  int computeJz(float *bx_err, float *by_e
Line 566  int computeJz(float *bx_err, float *by_e
  
  
 { {
         int nx = dims[0], ny = dims[1];          int nx = dims[0];
         int i, j, count_mask=0;          int ny = dims[1];
           int i = 0;
           int j = 0;
           int count_mask = 0;
  
         if (nx <= 0 || ny <= 0) return 1;         if (nx <= 0 || ny <= 0) return 1;
         float curl=0.0, us_i=0.0,test_perimeter=0.0,mean_curl=0.0;  
   
  
         /* Calculate the derivative*/         /* Calculate the derivative*/
         /* brute force method of calculating the derivative (no consideration for edges) */         /* brute force method of calculating the derivative (no consideration for edges) */
  
   
         for (i = 1; i <= nx-2; i++)         for (i = 1; i <= nx-2; i++)
           {           {
             for (j = 0; j <= ny-1; j++)             for (j = 0; j <= ny-1; j++)
Line 556  int computeJz(float *bx_err, float *by_e
Line 624  int computeJz(float *bx_err, float *by_e
              dery[j * nx + i] = ( (3*bx[j * nx + i]) + (-4*bx[(j-1) * nx + i]) - (-bx[(j-2) * nx + i]) )*0.5;              dery[j * nx + i] = ( (3*bx[j * nx + i]) + (-4*bx[(j-1) * nx + i]) - (-bx[(j-2) * nx + i]) )*0.5;
           }           }
  
           for (i = 1; i <= nx-2; i++)
         for (i = 0; i <= nx-1; i++)  
           {           {
             for (j = 0; j <= ny-1; j++)              for (j = 1; j <= ny-2; j++)
             {             {
                // calculate jz at all points                // calculate jz at all points
   
                jz[j * nx + i] = (derx[j * nx + i]-dery[j * nx + i]);       // jz is in units of Gauss/pix                jz[j * nx + i] = (derx[j * nx + i]-dery[j * nx + i]);       // jz is in units of Gauss/pix
                jz_err[j * nx + i]=0.5*sqrt( (bx_err[(j+1) * nx + i]*bx_err[(j+1) * nx + i]) + (bx_err[(j-1) * nx + i]*bx_err[(j-1) * nx + i]) +                jz_err[j * nx + i]=0.5*sqrt( (bx_err[(j+1) * nx + i]*bx_err[(j+1) * nx + i]) + (bx_err[(j-1) * nx + i]*bx_err[(j-1) * nx + i]) +
                                             (by_err[j * nx + (i+1)]*by_err[j * nx + (i+1)]) + (by_err[j * nx + (i-1)]*by_err[j * nx + (i-1)]) ) ;                                             (by_err[j * nx + (i+1)]*by_err[j * nx + (i+1)]) + (by_err[j * nx + (i-1)]*by_err[j * nx + (i-1)]) ) ;
                jz_err_squared[j * nx + i]=(jz_err[j * nx + i]*jz_err[j * nx + i]);                jz_err_squared[j * nx + i]=(jz_err[j * nx + i]*jz_err[j * nx + i]);
                count_mask++;                count_mask++;
   
             }             }
           }           }
   
         return 0;         return 0;
 } }
  
 /*===========================================*/ /*===========================================*/
  
   
 /* Example function 9:  Compute quantities on Jz array */ /* Example function 9:  Compute quantities on Jz array */
 // Compute mean and total current on Jz array. // Compute mean and total current on Jz array.
  
Line 585  int computeJzsmooth(float *bx, float *by
Line 652  int computeJzsmooth(float *bx, float *by
  
 { {
  
         int nx = dims[0], ny = dims[1];          int nx = dims[0];
         int i, j, count_mask=0;          int ny = dims[1];
           int i = 0;
           int j = 0;
           int count_mask = 0;
           double curl = 0.0;
           double us_i = 0.0;
           double err = 0.0;
  
         if (nx <= 0 || ny <= 0) return 1;         if (nx <= 0 || ny <= 0) return 1;
  
         float curl,us_i,test_perimeter,mean_curl,err=0.0;  
   
   
         /* At this point, use the smoothed Jz array with a Gaussian (FWHM of 4 pix and truncation width of 12 pixels) but keep the original array dimensions*/         /* At this point, use the smoothed Jz array with a Gaussian (FWHM of 4 pix and truncation width of 12 pixels) but keep the original array dimensions*/
         for (i = 0; i <= nx-1; i++)         for (i = 0; i <= nx-1; i++)
           {           {
Line 609  int computeJzsmooth(float *bx, float *by
Line 679  int computeJzsmooth(float *bx, float *by
             }             }
           }           }
  
         /* Calculate mean vertical current density (mean_curl) and total unsigned vertical current (us_i) using smoothed Jz array and continue conditions above */          /* Calculate mean vertical current density (mean_jz) and total unsigned vertical current (us_i) using smoothed Jz array and continue conditions above */
         *mean_jz_ptr     = curl/(count_mask);        /* mean_jz gets populated as MEANJZD */         *mean_jz_ptr     = curl/(count_mask);        /* mean_jz gets populated as MEANJZD */
         *mean_jz_err_ptr = (sqrt(err))*fabs(((rsun_obs/rsun_ref)*(0.00010)*(1/MUNAUGHT)*(1000.))/(count_mask)); // error in the quantity MEANJZD          *mean_jz_err_ptr = (sqrt(err)/count_mask)*((1/cdelt1)*(rsun_obs/rsun_ref)*(0.00010)*(1/MUNAUGHT)*(1000.)); // error in the quantity MEANJZD
  
         *us_i_ptr        = (us_i);                   /* us_i gets populated as TOTUSJZ */         *us_i_ptr        = (us_i);                   /* us_i gets populated as TOTUSJZ */
         *us_i_err_ptr    = (sqrt(err))*fabs((cdelt1/1)*(rsun_ref/rsun_obs)*(0.00010)*(1/MUNAUGHT)); // error in the quantity TOTUSJZ          *us_i_err_ptr    = (sqrt(err))*((cdelt1/1)*(rsun_ref/rsun_obs)*(0.00010)*(1/MUNAUGHT)); // error in the quantity TOTUSJZ
  
         printf("MEANJZD=%f\n",*mean_jz_ptr);          //printf("MEANJZD=%f\n",*mean_jz_ptr);
         printf("MEANJZD_err=%f\n",*mean_jz_err_ptr);          //printf("MEANJZD_err=%f\n",*mean_jz_err_ptr);
  
         printf("TOTUSJZ=%g\n",*us_i_ptr);          //printf("TOTUSJZ=%g\n",*us_i_ptr);
         printf("TOTUSJZ_err=%g\n",*us_i_err_ptr);          //printf("TOTUSJZ_err=%g\n",*us_i_err_ptr);
  
         return 0;         return 0;
  
Line 631  int computeJzsmooth(float *bx, float *by
Line 701  int computeJzsmooth(float *bx, float *by
 /* Example function 10:  Twist Parameter, alpha */ /* Example function 10:  Twist Parameter, alpha */
  
 // The twist parameter, alpha, is defined as alpha = Jz/Bz. In this case, the calculation // The twist parameter, alpha, is defined as alpha = Jz/Bz. In this case, the calculation
 // for alpha is calculated in the following way (different from Leka and Barnes' approach):  // for alpha is weighted by Bz (following Hagino et al., http://adsabs.harvard.edu/abs/2004PASJ...56..831H):
  
        // (sum of all positive Bz + abs(sum of all negative Bz)) = avg Bz         // numerator   = sum of all Jz*Bz
        // (abs(sum of all Jz at positive Bz) + abs(sum of all Jz at negative Bz)) = avg Jz         // denominator = sum of Bz*Bz
        // avg alpha = avg Jz / avg Bz         // alpha       = numerator/denominator
   
 // The sign is assigned as follows:  
 // If the sum of all Bz is greater than 0, then evaluate the sum of Jz at the positive Bz pixels.  
 // If this value is > 0, then alpha is > 0.  
 // If this value is < 0, then alpha is <0.  
 //  
 // If the sum of all Bz is less than 0, then evaluate the sum of Jz at the negative Bz pixels.  
 // If this value is > 0, then alpha is < 0.  
 // If this value is < 0, then alpha is > 0.  
  
 // The units of alpha are in 1/Mm // The units of alpha are in 1/Mm
 // The units of Jz are in Gauss/pix; the units of Bz are in Gauss. // The units of Jz are in Gauss/pix; the units of Bz are in Gauss.
Line 656  int computeJzsmooth(float *bx, float *by
Line 717  int computeJzsmooth(float *bx, float *by
 int computeAlpha(float *jz_err, float *bz_err, float *bz, int *dims, float *jz, float *jz_smooth, float *mean_alpha_ptr, float *mean_alpha_err_ptr, int *mask, int *bitmask, float cdelt1, double rsun_ref, double rsun_obs) int computeAlpha(float *jz_err, float *bz_err, float *bz, int *dims, float *jz, float *jz_smooth, float *mean_alpha_ptr, float *mean_alpha_err_ptr, int *mask, int *bitmask, float cdelt1, double rsun_ref, double rsun_obs)
  
 { {
         int nx = dims[0], ny = dims[1];          int nx                     = dims[0];
         int i, j, count_mask, a,b,c,d=0;          int ny                     = dims[1];
           int i                      = 0;
           int j                      = 0;
           double alpha_total         = 0.0;
           double C                   = ((1/cdelt1)*(rsun_obs/rsun_ref)*(1000000.));
           double total               = 0.0;
           double A                   = 0.0;
           double B                   = 0.0;
  
         if (nx <= 0 || ny <= 0) return 1;         if (nx <= 0 || ny <= 0) return 1;
   
         float aa, bb, cc, bznew, alpha2, sum1, sum2, sum3, sum4, sum, sum5, sum6, sum_err=0.0;  
   
         for (i = 1; i < nx-1; i++)         for (i = 1; i < nx-1; i++)
           {           {
             for (j = 1; j < ny-1; j++)             for (j = 1; j < ny-1; j++)
               {               {
                 if ( mask[j * nx + i] < 70 || bitmask[j * nx + i] < 30 ) continue;                 if ( mask[j * nx + i] < 70 || bitmask[j * nx + i] < 30 ) continue;
                 //if isnan(jz_smooth[j * nx + i]) continue;  
                 if isnan(jz[j * nx + i]) continue;                 if isnan(jz[j * nx + i]) continue;
                 if isnan(bz[j * nx + i]) continue;                 if isnan(bz[j * nx + i]) continue;
                 //if (jz_smooth[j * nx + i] == 0) continue;  
                 if (jz[j * nx + i]     == 0.0) continue;                 if (jz[j * nx + i]     == 0.0) continue;
                 if (bz_err[j * nx + i] == 0.0) continue;  
                 if (bz[j * nx + i]     == 0.0) continue;                 if (bz[j * nx + i]     == 0.0) continue;
                 if (bz[j * nx + i] >  0) sum1 += ( bz[j * nx + i] ); a++;                  A += jz[j*nx+i]*bz[j*nx+i];
                 if (bz[j * nx + i] <= 0) sum2 += ( bz[j * nx + i] ); b++;                  B += bz[j*nx+i]*bz[j*nx+i];
                 //if (bz[j * nx + i] >  0) sum3 += ( jz_smooth[j * nx + i]);  
                 //if (bz[j * nx + i] <= 0) sum4 += ( jz_smooth[j * nx + i]);  
                 if (bz[j * nx + i] >  0) sum3 += ( jz[j * nx + i] ); c++;  
                 if (bz[j * nx + i] <= 0) sum4 += ( jz[j * nx + i] ); d++;  
                 sum5    += bz[j * nx + i];  
                 /* sum_err is a fractional uncertainty */  
                 sum_err += sqrt(((jz_err[j * nx + i]*jz_err[j * nx + i])/(jz[j * nx + i]*jz[j * nx + i])) + ((bz_err[j * nx + i]*bz_err[j * nx + i])/(bz[j * nx + i]*bz[j * nx + i]))) * fabs( ( (jz[j * nx + i]) / (bz[j * nx + i]) ) *(1/cdelt1)*(rsun_obs/rsun_ref)*(1000000.));  
                 count_mask++;  
               }               }
           }           }
  
         sum     = (((fabs(sum3))+(fabs(sum4)))/((fabs(sum2))+sum1))*((1/cdelt1)*(rsun_obs/rsun_ref)*(1000000.)); /* the units for (jz/bz) are 1/Mm */          for (i = 1; i < nx-1; i++)
             {
         /* Determine the sign of alpha */              for (j = 1; j < ny-1; j++)
         if ((sum5 > 0) && (sum3 >  0)) sum=sum;                {
         if ((sum5 > 0) && (sum3 <= 0)) sum=-sum;                  if ( mask[j * nx + i] < 70 || bitmask[j * nx + i] < 30 ) continue;
         if ((sum5 < 0) && (sum4 <= 0)) sum=sum;                  if isnan(jz[j * nx + i])   continue;
         if ((sum5 < 0) && (sum4 >  0)) sum=-sum;                  if isnan(bz[j * nx + i])   continue;
                   if (jz[j * nx + i] == 0.0) continue;
         *mean_alpha_ptr = sum; /* Units are 1/Mm */                  if (bz[j * nx + i] == 0.0) continue;
         *mean_alpha_err_ptr    = (sqrt(sum_err*sum_err)) / ((a+b+c+d)*100.); // error in the quantity (sum)/(count_mask); factor of 100 comes from converting percent                  total += bz[j*nx+i]*bz[j*nx+i]*jz_err[j*nx+i]*jz_err[j*nx+i] + (jz[j*nx+i]-2*bz[j*nx+i]*A/B)*(jz[j*nx+i]-2*bz[j*nx+i]*A/B)*bz_err[j*nx+i]*bz_err[j*nx+i];
                 }
         printf("a=%d\n",a);            }
         printf("b=%d\n",b);  
         printf("d=%d\n",d);  
         printf("c=%d\n",c);  
  
         printf("MEANALP=%f\n",*mean_alpha_ptr);          /* Determine the absolute value of alpha. The units for alpha are 1/Mm */
         printf("MEANALP_err=%f\n",*mean_alpha_err_ptr);          alpha_total              = ((A/B)*C);
           *mean_alpha_ptr          = alpha_total;
           *mean_alpha_err_ptr      = (C/B)*(sqrt(total));
  
         return 0;         return 0;
 } }
Line 725  int computeHelicity(float *jz_err, float
Line 778  int computeHelicity(float *jz_err, float
  
 { {
  
         int nx = dims[0], ny = dims[1];          int nx         = dims[0];
         int i, j, count_mask=0;          int ny         = dims[1];
           int i          = 0;
           int j          = 0;
           int count_mask = 0;
           double sum     = 0.0;
           double sum2    = 0.0;
           double err     = 0.0;
  
         if (nx <= 0 || ny <= 0) return 1;         if (nx <= 0 || ny <= 0) return 1;
  
         float sum,sum2,sum_err=0.0;  
   
         for (i = 0; i < nx; i++)         for (i = 0; i < nx; i++)
         {         {
                 for (j = 0; j < ny; j++)                 for (j = 0; j < ny; j++)
Line 739  int computeHelicity(float *jz_err, float
Line 796  int computeHelicity(float *jz_err, float
                   if ( mask[j * nx + i] < 70 || bitmask[j * nx + i] < 30 ) continue;                   if ( mask[j * nx + i] < 70 || bitmask[j * nx + i] < 30 ) continue;
                   if isnan(jz[j * nx + i]) continue;                   if isnan(jz[j * nx + i]) continue;
                   if isnan(bz[j * nx + i]) continue;                   if isnan(bz[j * nx + i]) continue;
                     if isnan(jz_err[j * nx + i]) continue;
                     if isnan(bz_err[j * nx + i]) continue;
                   if (bz[j * nx + i] == 0.0) continue;                   if (bz[j * nx + i] == 0.0) continue;
                   if (jz[j * nx + i] == 0.0) continue;                   if (jz[j * nx + i] == 0.0) continue;
                   sum     +=     (jz[j * nx + i]*bz[j * nx + i])*(1/cdelt1)*(rsun_obs/rsun_ref); // contributes to MEANJZH and ABSNJZH                   sum     +=     (jz[j * nx + i]*bz[j * nx + i])*(1/cdelt1)*(rsun_obs/rsun_ref); // contributes to MEANJZH and ABSNJZH
                   sum2    += fabs(jz[j * nx + i]*bz[j * nx + i])*(1/cdelt1)*(rsun_obs/rsun_ref); // contributes to TOTUSJH                   sum2    += fabs(jz[j * nx + i]*bz[j * nx + i])*(1/cdelt1)*(rsun_obs/rsun_ref); // contributes to TOTUSJH
                   sum_err += sqrt(((jz_err[j * nx + i]*jz_err[j * nx + i])/(jz[j * nx + i]*jz[j * nx + i])) + ((bz_err[j * nx + i]*bz_err[j * nx + i])/(bz[j * nx + i]*bz[j * nx + i]))) * fabs(jz[j * nx + i]*bz[j * nx + i]*(1/cdelt1)*(rsun_obs/rsun_ref));                    err     += (jz_err[j * nx + i]*jz_err[j * nx + i]*bz[j * nx + i]*bz[j * nx + i]) + (bz_err[j * nx + i]*bz_err[j * nx + i]*jz[j * nx + i]*jz[j * nx + i]);
                   count_mask++;                   count_mask++;
                 }                 }
          }          }
Line 752  int computeHelicity(float *jz_err, float
Line 811  int computeHelicity(float *jz_err, float
         *total_us_ih_ptr      = sum2           ; /* Units are G^2 / m ; keyword is TOTUSJH */         *total_us_ih_ptr      = sum2           ; /* Units are G^2 / m ; keyword is TOTUSJH */
         *total_abs_ih_ptr     = fabs(sum)      ; /* Units are G^2 / m ; keyword is ABSNJZH */         *total_abs_ih_ptr     = fabs(sum)      ; /* Units are G^2 / m ; keyword is ABSNJZH */
  
         *mean_ih_err_ptr      = (sqrt(sum_err*sum_err)) / (count_mask*100.)    ;  // error in the quantity MEANJZH          *mean_ih_err_ptr      = (sqrt(err)/count_mask)*(1/cdelt1)*(rsun_obs/rsun_ref) ; // error in the quantity MEANJZH
         *total_us_ih_err_ptr  = (sqrt(sum_err*sum_err)) / (100.)               ;  // error in the quantity TOTUSJH          *total_us_ih_err_ptr  = (sqrt(err))*(1/cdelt1)*(rsun_obs/rsun_ref) ;            // error in the quantity TOTUSJH
         *total_abs_ih_err_ptr = (sqrt(sum_err*sum_err)) / (100.)               ;  // error in the quantity ABSNJZH          *total_abs_ih_err_ptr = (sqrt(err))*(1/cdelt1)*(rsun_obs/rsun_ref) ;            // error in the quantity ABSNJZH
  
         printf("MEANJZH=%f\n",*mean_ih_ptr);          //printf("MEANJZH=%f\n",*mean_ih_ptr);
         printf("MEANJZH_err=%f\n",*mean_ih_err_ptr);          //printf("MEANJZH_err=%f\n",*mean_ih_err_ptr);
  
         printf("TOTUSJH=%f\n",*total_us_ih_ptr);          //printf("TOTUSJH=%f\n",*total_us_ih_ptr);
         printf("TOTUSJH_err=%f\n",*total_us_ih_err_ptr);          //printf("TOTUSJH_err=%f\n",*total_us_ih_err_ptr);
  
         printf("ABSNJZH=%f\n",*total_abs_ih_ptr);          //printf("ABSNJZH=%f\n",*total_abs_ih_ptr);
         printf("ABSNJZH_err=%f\n",*total_abs_ih_err_ptr);          //printf("ABSNJZH_err=%f\n",*total_abs_ih_err_ptr);
  
         return 0;         return 0;
 } }
Line 783  int computeSumAbsPerPolarity(float *jz_e
Line 842  int computeSumAbsPerPolarity(float *jz_e
                                                          int *mask, int *bitmask, float cdelt1, double rsun_ref, double rsun_obs)                                                          int *mask, int *bitmask, float cdelt1, double rsun_ref, double rsun_obs)
  
 { {
         int nx = dims[0], ny = dims[1];          int nx = dims[0];
         int i, j, count_mask=0;          int ny = dims[1];
           int i=0;
           int j=0;
           int count_mask=0;
           double sum1=0.0;
           double sum2=0.0;
           double err=0.0;
           *totaljzptr=0.0;
  
         if (nx <= 0 || ny <= 0) return 1;         if (nx <= 0 || ny <= 0) return 1;
  
         *totaljzptr=0.0;  
         float sum1,sum2,err=0.0;  
   
         for (i = 0; i < nx; i++)         for (i = 0; i < nx; i++)
           {           {
             for (j = 0; j < ny; j++)             for (j = 0; j < ny; j++)
               {               {
                 if ( mask[j * nx + i] < 70 || bitmask[j * nx + i] < 30 ) continue;                 if ( mask[j * nx + i] < 70 || bitmask[j * nx + i] < 30 ) continue;
                 if isnan(bz[j * nx + i]) continue;                 if isnan(bz[j * nx + i]) continue;
                   if isnan(jz[j * nx + i]) continue;
                 if (bz[j * nx + i] >  0) sum1 += ( jz[j * nx + i])*(1/cdelt1)*(0.00010)*(1/MUNAUGHT)*(rsun_ref/rsun_obs);                 if (bz[j * nx + i] >  0) sum1 += ( jz[j * nx + i])*(1/cdelt1)*(0.00010)*(1/MUNAUGHT)*(rsun_ref/rsun_obs);
                 if (bz[j * nx + i] <= 0) sum2 += ( jz[j * nx + i])*(1/cdelt1)*(0.00010)*(1/MUNAUGHT)*(rsun_ref/rsun_obs);                 if (bz[j * nx + i] <= 0) sum2 += ( jz[j * nx + i])*(1/cdelt1)*(0.00010)*(1/MUNAUGHT)*(rsun_ref/rsun_obs);
                 err += (jz_err[j * nx + i]*jz_err[j * nx + i]);                 err += (jz_err[j * nx + i]*jz_err[j * nx + i]);
Line 806  int computeSumAbsPerPolarity(float *jz_e
Line 870  int computeSumAbsPerPolarity(float *jz_e
  
         *totaljzptr    = fabs(sum1) + fabs(sum2);  /* Units are A */         *totaljzptr    = fabs(sum1) + fabs(sum2);  /* Units are A */
         *totaljz_err_ptr = sqrt(err)*(1/cdelt1)*fabs((0.00010)*(1/MUNAUGHT)*(rsun_ref/rsun_obs));         *totaljz_err_ptr = sqrt(err)*(1/cdelt1)*fabs((0.00010)*(1/MUNAUGHT)*(rsun_ref/rsun_obs));
         printf("SAVNCPP=%g\n",*totaljzptr);          //printf("SAVNCPP=%g\n",*totaljzptr);
         printf("SAVNCPP_err=%g\n",*totaljz_err_ptr);          //printf("SAVNCPP_err=%g\n",*totaljz_err_ptr);
  
         return 0;         return 0;
 } }
Line 830  int computeFreeEnergy(float *bx_err, flo
Line 894  int computeFreeEnergy(float *bx_err, flo
                                           float cdelt1, double rsun_ref, double rsun_obs)                                           float cdelt1, double rsun_ref, double rsun_obs)
  
 { {
         int nx = dims[0], ny = dims[1];          int nx = dims[0];
         int i, j, count_mask=0;          int ny = dims[1];
           int i = 0;
         if (nx <= 0 || ny <= 0) return 1;          int j = 0;
           int count_mask = 0;
           double sum = 0.0;
           double sum1 = 0.0;
           double err = 0.0;
         *totpotptr=0.0;         *totpotptr=0.0;
         *meanpotptr=0.0;         *meanpotptr=0.0;
         float sum,sum1,err=0.0;  
           if (nx <= 0 || ny <= 0) return 1;
  
         for (i = 0; i < nx; i++)         for (i = 0; i < nx; i++)
           {           {
Line 846  int computeFreeEnergy(float *bx_err, flo
Line 914  int computeFreeEnergy(float *bx_err, flo
                  if ( mask[j * nx + i] < 70 || bitmask[j * nx + i] < 30 ) continue;                  if ( mask[j * nx + i] < 70 || bitmask[j * nx + i] < 30 ) continue;
                  if isnan(bx[j * nx + i]) continue;                  if isnan(bx[j * nx + i]) continue;
                  if isnan(by[j * nx + i]) continue;                  if isnan(by[j * nx + i]) continue;
                  sum  += ( ((bpx[j * nx + i] - bx[j * nx + i])*(bpx[j * nx + i] - bx[j * nx + i])) + ((bpy[j * nx + i] - by[j * nx + i])*(bpy[j * nx + i] - by[j * nx + i])) )*(cdelt1*cdelt1*(rsun_ref/rsun_obs)*(rsun_ref/rsun_obs)*100.0*100.0);                   sum  += ( ((bx[j * nx + i] - bpx[j * nx + i])*(bx[j * nx + i] - bpx[j * nx + i])) + ((by[j * nx + i] - bpy[j * nx + i])*(by[j * nx + i] - bpy[j * nx + i])) )*(cdelt1*cdelt1*(rsun_ref/rsun_obs)*(rsun_ref/rsun_obs)*100.0*100.0);
                  sum1 += ( ((bpx[j * nx + i] - bx[j * nx + i])*(bpx[j * nx + i] - bx[j * nx + i])) + ((bpy[j * nx + i] - by[j * nx + i])*(bpy[j * nx + i] - by[j * nx + i])) );                   sum1 += (  ((bx[j * nx + i] - bpx[j * nx + i])*(bx[j * nx + i] - bpx[j * nx + i])) + ((by[j * nx + i] - bpy[j * nx + i])*(by[j * nx + i] - bpy[j * nx + i])) );
                  err  += (4.0*bx[j * nx + i]*bx[j * nx + i]*bx_err[j * nx + i]*bx_err[j * nx + i]) + (4.0*by[j * nx + i]*by[j * nx + i]*by_err[j * nx + i]*by_err[j * nx + i]);                   err  += 4.0*(bx[j * nx + i] - bpx[j * nx + i])*(bx[j * nx + i] - bpx[j * nx + i])*(bx_err[j * nx + i]*bx_err[j * nx + i]) +
                            4.0*(by[j * nx + i] - bpy[j * nx + i])*(by[j * nx + i] - bpy[j * nx + i])*(by_err[j * nx + i]*by_err[j * nx + i]);
                  count_mask++;                  count_mask++;
               }               }
           }           }
  
         *meanpotptr      = (sum1/(8.*PI)) / (count_mask);     /* Units are ergs per cubic centimeter */          /* Units of meanpotptr are ergs per centimeter */
         *meanpot_err_ptr = (sqrt(err))*fabs(cdelt1*cdelt1*(rsun_ref/rsun_obs)*(rsun_ref/rsun_obs)*100.0*100.0) / (count_mask*8.*PI); // error in the quantity (sum)/(count_mask)          *meanpotptr      = (sum1) / (count_mask*8.*PI) ;     /* Units are ergs per cubic centimeter */
           *meanpot_err_ptr = (sqrt(err)) / (count_mask*8.*PI); // error in the quantity (sum)/(count_mask)
  
         /* Units of sum are ergs/cm^3, units of factor are cm^2/pix^2; therefore, units of totpotptr are ergs per centimeter */         /* Units of sum are ergs/cm^3, units of factor are cm^2/pix^2; therefore, units of totpotptr are ergs per centimeter */
         *totpotptr       = (sum)/(8.*PI);         *totpotptr       = (sum)/(8.*PI);
         *totpot_err_ptr  = (sqrt(err))*fabs(cdelt1*cdelt1*(rsun_ref/rsun_obs)*(rsun_ref/rsun_obs)*100.0*100.0*(1/(8.*PI)));         *totpot_err_ptr  = (sqrt(err))*fabs(cdelt1*cdelt1*(rsun_ref/rsun_obs)*(rsun_ref/rsun_obs)*100.0*100.0*(1/(8.*PI)));
  
         printf("MEANPOT=%g\n",*meanpotptr);          //printf("MEANPOT=%g\n",*meanpotptr);
         printf("MEANPOT_err=%g\n",*meanpot_err_ptr);          //printf("MEANPOT_err=%g\n",*meanpot_err_ptr);
  
         printf("TOTPOT=%g\n",*totpotptr);          //printf("TOTPOT=%g\n",*totpotptr);
         printf("TOTPOT_err=%g\n",*totpot_err_ptr);          //printf("TOTPOT_err=%g\n",*totpot_err_ptr);
  
         return 0;         return 0;
 } }
Line 872  int computeFreeEnergy(float *bx_err, flo
Line 942  int computeFreeEnergy(float *bx_err, flo
 /*===========================================*/ /*===========================================*/
 /* Example function 14:  Mean 3D shear angle, area with shear greater than 45, mean horizontal shear angle, area with horizontal shear angle greater than 45 */ /* Example function 14:  Mean 3D shear angle, area with shear greater than 45, mean horizontal shear angle, area with horizontal shear angle greater than 45 */
  
 int computeShearAngle(float *bx_err, float *by_err, float *bh_err, float *bx, float *by, float *bz, float *bpx, float *bpy, float *bpz, int *dims,  int computeShearAngle(float *bx_err, float *by_err, float *bz_err, float *bx, float *by, float *bz, float *bpx, float *bpy, float *bpz, int *dims,
                       float *meanshear_angleptr, float *meanshear_angle_err_ptr, float *area_w_shear_gt_45ptr, int *mask, int *bitmask)                       float *meanshear_angleptr, float *meanshear_angle_err_ptr, float *area_w_shear_gt_45ptr, int *mask, int *bitmask)
   
   
 { {
         int nx = dims[0], ny = dims[1];          int nx = dims[0];
         int i, j;          int ny = dims[1];
           int i = 0;
           int j = 0;
           float count_mask = 0;
           float count = 0;
           double dotproduct = 0.0;
           double magnitude_potential = 0.0;
           double magnitude_vector = 0.0;
           double shear_angle = 0.0;
           double denominator = 0.0;
           double term1 = 0.0;
           double term2 = 0.0;
           double term3 = 0.0;
           double sumsum = 0.0;
           double err = 0.0;
           double part1 = 0.0;
           double part2 = 0.0;
           double part3 = 0.0;
           *area_w_shear_gt_45ptr = 0.0;
           *meanshear_angleptr = 0.0;
  
         if (nx <= 0 || ny <= 0) return 1;         if (nx <= 0 || ny <= 0) return 1;
  
         //*area_w_shear_gt_45ptr=0.0;  
         //*meanshear_angleptr=0.0;  
         float dotproduct, magnitude_potential, magnitude_vector, shear_angle,err=0.0, sum = 0.0, count=0.0, count_mask=0.0;  
   
         for (i = 0; i < nx; i++)         for (i = 0; i < nx; i++)
           {           {
             for (j = 0; j < ny; j++)             for (j = 0; j < ny; j++)
Line 895  int computeShearAngle(float *bx_err, flo
Line 982  int computeShearAngle(float *bx_err, flo
                  if isnan(bz[j * nx + i]) continue;                  if isnan(bz[j * nx + i]) continue;
                  if isnan(bx[j * nx + i]) continue;                  if isnan(bx[j * nx + i]) continue;
                  if isnan(by[j * nx + i]) continue;                  if isnan(by[j * nx + i]) continue;
                  /* For mean 3D shear angle, area with shear greater than 45*/                   if isnan(bx_err[j * nx + i]) continue;
                    if isnan(by_err[j * nx + i]) continue;
                    if isnan(bz_err[j * nx + i]) continue;
   
                    /* For mean 3D shear angle, percentage with shear greater than 45*/
                  dotproduct            = (bpx[j * nx + i])*(bx[j * nx + i]) + (bpy[j * nx + i])*(by[j * nx + i]) + (bpz[j * nx + i])*(bz[j * nx + i]);                  dotproduct            = (bpx[j * nx + i])*(bx[j * nx + i]) + (bpy[j * nx + i])*(by[j * nx + i]) + (bpz[j * nx + i])*(bz[j * nx + i]);
                  magnitude_potential   = sqrt( (bpx[j * nx + i]*bpx[j * nx + i]) + (bpy[j * nx + i]*bpy[j * nx + i]) + (bpz[j * nx + i]*bpz[j * nx + i]));                  magnitude_potential   = sqrt( (bpx[j * nx + i]*bpx[j * nx + i]) + (bpy[j * nx + i]*bpy[j * nx + i]) + (bpz[j * nx + i]*bpz[j * nx + i]));
                  magnitude_vector      = sqrt( (bx[j * nx + i]*bx[j * nx + i])   + (by[j * nx + i]*by[j * nx + i])   + (bz[j * nx + i]*bz[j * nx + i]) );                  magnitude_vector      = sqrt( (bx[j * nx + i]*bx[j * nx + i])   + (by[j * nx + i]*by[j * nx + i])   + (bz[j * nx + i]*bz[j * nx + i]) );
                    //printf("dotproduct=%f\n",dotproduct);
                    //printf("magnitude_potential=%f\n",magnitude_potential);
                    //printf("magnitude_vector=%f\n",magnitude_vector);
   
                  shear_angle           = acos(dotproduct/(magnitude_potential*magnitude_vector))*(180./PI);                  shear_angle           = acos(dotproduct/(magnitude_potential*magnitude_vector))*(180./PI);
                    sumsum                  += shear_angle;
                    //printf("shear_angle=%f\n",shear_angle);
                  count ++;                  count ++;
                  sum += shear_angle ;  
                  err += -(1./(1.- sqrt(bx_err[j * nx + i]*bx_err[j * nx + i]+by_err[j * nx + i]*by_err[j * nx + i]+bh_err[j * nx + i]*bh_err[j * nx + i])));  
                  if (shear_angle > 45) count_mask ++;                  if (shear_angle > 45) count_mask ++;
   
                    // For the error analysis
   
                    term1 = bx[j * nx + i]*by[j * nx + i]*bpy[j * nx + i] - by[j * nx + i]*by[j * nx + i]*bpx[j * nx + i] + bz[j * nx + i]*bx[j * nx + i]*bpz[j * nx + i] - bz[j * nx + i]*bz[j * nx + i]*bpx[j * nx + i];
                    term2 = bx[j * nx + i]*bx[j * nx + i]*bpy[j * nx + i] - bx[j * nx + i]*by[j * nx + i]*bpx[j * nx + i] + bx[j * nx + i]*bz[j * nx + i]*bpy[j * nx + i] - bz[j * nx + i]*by[j * nx + i]*bpz[j * nx + i];
                    term3 = bx[j * nx + i]*bx[j * nx + i]*bpz[j * nx + i] - bx[j * nx + i]*bz[j * nx + i]*bpx[j * nx + i] + by[j * nx + i]*by[j * nx + i]*bpz[j * nx + i] - by[j * nx + i]*bz[j * nx + i]*bpy[j * nx + i];
   
                    part1 = bx[j * nx + i]*bx[j * nx + i] + by[j * nx + i]*by[j * nx + i] + bz[j * nx + i]*bz[j * nx + i];
                    part2 = bpx[j * nx + i]*bpx[j * nx + i] + bpy[j * nx + i]*bpy[j * nx + i] + bpz[j * nx + i]*bpz[j * nx + i];
                    part3 = bx[j * nx + i]*bpx[j * nx + i] + by[j * nx + i]*bpy[j * nx + i] + bz[j * nx + i]*bpz[j * nx + i];
   
                    // denominator is squared
                    denominator = part1*part1*part1*part2*(1.0-((part3*part3)/(part1*part2)));
   
                    err = (term1*term1*bx_err[j * nx + i]*bx_err[j * nx + i])/(denominator) +
                          (term1*term1*bx_err[j * nx + i]*bx_err[j * nx + i])/(denominator) +
                          (term1*term1*bx_err[j * nx + i]*bx_err[j * nx + i])/(denominator) ;
   
               }               }
           }           }
   
         /* For mean 3D shear angle, area with shear greater than 45*/         /* For mean 3D shear angle, area with shear greater than 45*/
         *meanshear_angleptr = (sum)/(count);                 /* Units are degrees */              *meanshear_angleptr = (sumsum)/(count);                 /* Units are degrees */
         *meanshear_angle_err_ptr = (sqrt(err*err))/(count);  // error in the quantity (sum)/(count_mask)          *meanshear_angle_err_ptr = (sqrt(err)/count_mask)*(180./PI);
         *area_w_shear_gt_45ptr   = (count_mask/(count))*(100.);/* The area here is a fractional area -- the % of the total area */  
           /* The area here is a fractional area -- the % of the total area. This has no error associated with it. */
           *area_w_shear_gt_45ptr   = (count_mask/(count))*(100.0);
  
         printf("MEANSHR=%f\n",*meanshear_angleptr);          //printf("MEANSHR=%f\n",*meanshear_angleptr);
         printf("MEANSHR_err=%f\n",*meanshear_angle_err_ptr);          //printf("MEANSHR_err=%f\n",*meanshear_angle_err_ptr);
           //printf("SHRGT45=%f\n",*area_w_shear_gt_45ptr);
  
         return 0;         return 0;
 } }
Line 1034  void greenpot(float *bx, float *by, floa
Line 1150  void greenpot(float *bx, float *by, floa
  
  
 /*===========END OF KEIJI'S CODE =========================*/ /*===========END OF KEIJI'S CODE =========================*/
   
   char *sw_functions_version() // Returns CVS version of sw_functions.c
   {
     return strdup("$Id$");
   }
   
 /* ---------------- end of this file ----------------*/ /* ---------------- end of this file ----------------*/


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Karen Tian
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