#include "erfa.h" void eraAtioq(double ri, double di, eraASTROM *astrom, double *aob, double *zob, double *hob, double *dob, double *rob) /* ** - - - - - - - - - ** e r a A t i o q ** - - - - - - - - - ** ** Quick CIRS to observed place transformation. ** ** Use of this function is appropriate when efficiency is important and ** where many star positions are all to be transformed for one date. ** The star-independent astrometry parameters can be obtained by ** calling eraApio[13] or eraApco[13]. ** ** Given: ** ri double CIRS right ascension ** di double CIRS declination ** astrom eraASTROM* star-independent astrometry parameters: ** pmt double PM time interval (SSB, Julian years) ** eb double[3] SSB to observer (vector, au) ** eh double[3] Sun to observer (unit vector) ** em double distance from Sun to observer (au) ** v double[3] barycentric observer velocity (vector, c) ** bm1 double sqrt(1-|v|^2): reciprocal of Lorenz factor ** bpn double[3][3] bias-precession-nutation matrix ** along double longitude + s' (radians) ** xpl double polar motion xp wrt local meridian (radians) ** ypl double polar motion yp wrt local meridian (radians) ** sphi double sine of geodetic latitude ** cphi double cosine of geodetic latitude ** diurab double magnitude of diurnal aberration vector ** eral double "local" Earth rotation angle (radians) ** refa double refraction constant A (radians) ** refb double refraction constant B (radians) ** ** Returned: ** aob double* observed azimuth (radians: N=0,E=90) ** zob double* observed zenith distance (radians) ** hob double* observed hour angle (radians) ** dob double* observed declination (radians) ** rob double* observed right ascension (CIO-based, radians) ** ** Notes: ** ** 1) This function returns zenith distance rather than altitude in ** order to reflect the fact that no allowance is made for ** depression of the horizon. ** ** 2) The accuracy of the result is limited by the corrections for ** refraction, which use a simple A*tan(z) + B*tan^3(z) model. ** Providing the meteorological parameters are known accurately and ** there are no gross local effects, the predicted observed ** coordinates should be within 0.05 arcsec (optical) or 1 arcsec ** (radio) for a zenith distance of less than 70 degrees, better ** than 30 arcsec (optical or radio) at 85 degrees and better ** than 20 arcmin (optical) or 30 arcmin (radio) at the horizon. ** ** Without refraction, the complementary functions eraAtioq and ** eraAtoiq are self-consistent to better than 1 microarcsecond all ** over the celestial sphere. With refraction included, consistency ** falls off at high zenith distances, but is still better than ** 0.05 arcsec at 85 degrees. ** ** 3) It is advisable to take great care with units, as even unlikely ** values of the input parameters are accepted and processed in ** accordance with the models used. ** ** 4) The CIRS RA,Dec is obtained from a star catalog mean place by ** allowing for space motion, parallax, the Sun's gravitational lens ** effect, annual aberration and precession-nutation. For star ** positions in the ICRS, these effects can be applied by means of ** the eraAtci13 (etc.) functions. Starting from classical "mean ** place" systems, additional transformations will be needed first. ** ** 5) "Observed" Az,El means the position that would be seen by a ** perfect geodetically aligned theodolite. This is obtained from ** the CIRS RA,Dec by allowing for Earth orientation and diurnal ** aberration, rotating from equator to horizon coordinates, and ** then adjusting for refraction. The HA,Dec is obtained by ** rotating back into equatorial coordinates, and is the position ** that would be seen by a perfect equatorial with its polar axis ** aligned to the Earth's axis of rotation. Finally, the RA is ** obtained by subtracting the HA from the local ERA. ** ** 6) The star-independent CIRS-to-observed-place parameters in ASTROM ** may be computed with eraApio[13] or eraApco[13]. If nothing has ** changed significantly except the time, eraAper[13] may be used to ** perform the requisite adjustment to the astrom structure. ** ** Called: ** eraS2c spherical coordinates to unit vector ** eraC2s p-vector to spherical ** eraAnp normalize angle into range 0 to 2pi ** ** Copyright (C) 2013-2015, NumFOCUS Foundation. ** Derived, with permission, from the SOFA library. See notes at end of file. */ { /* Minimum cos(alt) and sin(alt) for refraction purposes */ const double CELMIN = 1e-6; const double SELMIN = 0.05; double v[3], x, y, z, xhd, yhd, zhd, f, xhdt, yhdt, zhdt, xaet, yaet, zaet, azobs, r, tz, w, del, cosdel, xaeo, yaeo, zaeo, zdobs, hmobs, dcobs, raobs; /*--------------------------------------------------------------------*/ /* CIRS RA,Dec to Cartesian -HA,Dec. */ eraS2c(ri-astrom->eral, di, v); x = v[0]; y = v[1]; z = v[2]; /* Polar motion. */ xhd = x + astrom->xpl*z; yhd = y - astrom->ypl*z; zhd = z - astrom->xpl*x + astrom->ypl*y; /* Diurnal aberration. */ f = ( 1.0 - astrom->diurab*yhd ); xhdt = f * xhd; yhdt = f * ( yhd + astrom->diurab ); zhdt = f * zhd; /* Cartesian -HA,Dec to Cartesian Az,El (S=0,E=90). */ xaet = astrom->sphi*xhdt - astrom->cphi*zhdt; yaet = yhdt; zaet = astrom->cphi*xhdt + astrom->sphi*zhdt; /* Azimuth (N=0,E=90). */ azobs = ( xaet != 0.0 || yaet != 0.0 ) ? atan2(yaet,-xaet) : 0.0; /* ---------- */ /* Refraction */ /* ---------- */ /* Cosine and sine of altitude, with precautions. */ r = sqrt(xaet*xaet + yaet*yaet); r = r > CELMIN ? r : CELMIN; z = zaet > SELMIN ? zaet : SELMIN; /* A*tan(z)+B*tan^3(z) model, with Newton-Raphson correction. */ tz = r/z; w = astrom->refb*tz*tz; del = ( astrom->refa + w ) * tz / ( 1.0 + ( astrom->refa + 3.0*w ) / ( z*z ) ); /* Apply the change, giving observed vector. */ cosdel = 1.0 - del*del/2.0; f = cosdel - del*z/r; xaeo = xaet*f; yaeo = yaet*f; zaeo = cosdel*zaet + del*r; /* Observed ZD. */ zdobs = atan2(sqrt(xaeo*xaeo+yaeo*yaeo), zaeo); /* Az/El vector to HA,Dec vector (both right-handed). */ v[0] = astrom->sphi*xaeo + astrom->cphi*zaeo; v[1] = yaeo; v[2] = - astrom->cphi*xaeo + astrom->sphi*zaeo; /* To spherical -HA,Dec. */ eraC2s ( v, &hmobs, &dcobs ); /* Right ascension (with respect to CIO). */ raobs = astrom->eral + hmobs; /* Return the results. */ *aob = eraAnp(azobs); *zob = zdobs; *hob = -hmobs; *dob = dcobs; *rob = eraAnp(raobs); /* Finished. */ } /*---------------------------------------------------------------------- ** ** ** Copyright (C) 2013-2015, NumFOCUS Foundation. ** All rights reserved. ** ** This library is derived, with permission, from the International ** Astronomical Union's "Standards of Fundamental Astronomy" library, ** available from http://www.iausofa.org. ** ** The ERFA version is intended to retain identical functionality to ** the SOFA library, but made distinct through different function and ** file names, as set out in the SOFA license conditions. The SOFA ** original has a role as a reference standard for the IAU and IERS, ** and consequently redistribution is permitted only in its unaltered ** state. The ERFA version is not subject to this restriction and ** therefore can be included in distributions which do not support the ** concept of "read only" software. ** ** Although the intent is to replicate the SOFA API (other than ** replacement of prefix names) and results (with the exception of ** bugs; any that are discovered will be fixed), SOFA is not ** responsible for any errors found in this version of the library. ** ** If you wish to acknowledge the SOFA heritage, please acknowledge ** that you are using a library derived from SOFA, rather than SOFA ** itself. ** ** ** TERMS AND CONDITIONS ** ** Redistribution and use in source and binary forms, with or without ** modification, are permitted provided that the following conditions ** are met: ** ** 1 Redistributions of source code must retain the above copyright ** notice, this list of conditions and the following disclaimer. ** ** 2 Redistributions in binary form must reproduce the above copyright ** notice, this list of conditions and the following disclaimer in ** the documentation and/or other materials provided with the ** distribution. ** ** 3 Neither the name of the Standards Of Fundamental Astronomy Board, ** the International Astronomical Union nor the names of its ** contributors may be used to endorse or promote products derived ** from this software without specific prior written permission. ** ** THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND CONTRIBUTORS ** "AS IS" AND ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT ** LIMITED TO, THE IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS ** FOR A PARTICULAR PURPOSE ARE DISCLAIMED. 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