/** * \file SphericalHarmonic1.hpp * \brief Header for GeographicLib::SphericalHarmonic1 class * * Copyright (c) Charles Karney (2011) and licensed under * the MIT/X11 License. For more information, see * https://geographiclib.sourceforge.io/ **********************************************************************/ #if !defined(GEOGRAPHICLIB_SPHERICALHARMONIC1_HPP) #define GEOGRAPHICLIB_SPHERICALHARMONIC1_HPP 1 #include #include #include #include namespace GeographicLib { /** * \brief Spherical harmonic series with a correction to the coefficients * * This classes is similar to SphericalHarmonic, except that the coefficients * Cnm are replaced by * Cnm + \e tau C'nm (and * similarly for Snm). * * Example of use: * \include example-SphericalHarmonic1.cpp **********************************************************************/ class GEOGRAPHICLIB_EXPORT SphericalHarmonic1 { public: /** * Supported normalizations for associate Legendre polynomials. **********************************************************************/ enum normalization { /** * Fully normalized associated Legendre polynomials. See * SphericalHarmonic::FULL for documentation. * * @hideinitializer **********************************************************************/ FULL = SphericalEngine::FULL, /** * Schmidt semi-normalized associated Legendre polynomials. See * SphericalHarmonic::SCHMIDT for documentation. * * @hideinitializer **********************************************************************/ SCHMIDT = SphericalEngine::SCHMIDT, }; private: typedef Math::real real; SphericalEngine::coeff _c[2]; real _a; unsigned _norm; public: /** * Constructor with a full set of coefficients specified. * * @param[in] C the coefficients Cnm. * @param[in] S the coefficients Snm. * @param[in] N the maximum degree and order of the sum * @param[in] C1 the coefficients C'nm. * @param[in] S1 the coefficients S'nm. * @param[in] N1 the maximum degree and order of the correction * coefficients C'nm and * S'nm. * @param[in] a the reference radius appearing in the definition of the * sum. * @param[in] norm the normalization for the associated Legendre * polynomials, either SphericalHarmonic1::FULL (the default) or * SphericalHarmonic1::SCHMIDT. * @exception GeographicErr if \e N and \e N1 do not satisfy \e N ≥ * \e N1 ≥ −1. * @exception GeographicErr if any of the vectors of coefficients is not * large enough. * * See SphericalHarmonic for the way the coefficients should be stored. * * The class stores pointers to the first elements of \e C, \e S, \e * C', and \e S'. These arrays should not be altered or destroyed during * the lifetime of a SphericalHarmonic object. **********************************************************************/ SphericalHarmonic1(const std::vector& C, const std::vector& S, int N, const std::vector& C1, const std::vector& S1, int N1, real a, unsigned norm = FULL) : _a(a) , _norm(norm) { if (!(N1 <= N)) throw GeographicErr("N1 cannot be larger that N"); _c[0] = SphericalEngine::coeff(C, S, N); _c[1] = SphericalEngine::coeff(C1, S1, N1); } /** * Constructor with a subset of coefficients specified. * * @param[in] C the coefficients Cnm. * @param[in] S the coefficients Snm. * @param[in] N the degree used to determine the layout of \e C and \e S. * @param[in] nmx the maximum degree used in the sum. The sum over \e n is * from 0 thru \e nmx. * @param[in] mmx the maximum order used in the sum. The sum over \e m is * from 0 thru min(\e n, \e mmx). * @param[in] C1 the coefficients C'nm. * @param[in] S1 the coefficients S'nm. * @param[in] N1 the degree used to determine the layout of \e C' and \e * S'. * @param[in] nmx1 the maximum degree used for \e C' and \e S'. * @param[in] mmx1 the maximum order used for \e C' and \e S'. * @param[in] a the reference radius appearing in the definition of the * sum. * @param[in] norm the normalization for the associated Legendre * polynomials, either SphericalHarmonic1::FULL (the default) or * SphericalHarmonic1::SCHMIDT. * @exception GeographicErr if the parameters do not satisfy \e N ≥ \e * nmx ≥ \e mmx ≥ −1; \e N1 ≥ \e nmx1 ≥ \e mmx1 ≥ * −1; \e N ≥ \e N1; \e nmx ≥ \e nmx1; \e mmx ≥ \e mmx1. * @exception GeographicErr if any of the vectors of coefficients is not * large enough. * * The class stores pointers to the first elements of \e C, \e S, \e * C', and \e S'. These arrays should not be altered or destroyed during * the lifetime of a SphericalHarmonic object. **********************************************************************/ SphericalHarmonic1(const std::vector& C, const std::vector& S, int N, int nmx, int mmx, const std::vector& C1, const std::vector& S1, int N1, int nmx1, int mmx1, real a, unsigned norm = FULL) : _a(a) , _norm(norm) { if (!(nmx1 <= nmx)) throw GeographicErr("nmx1 cannot be larger that nmx"); if (!(mmx1 <= mmx)) throw GeographicErr("mmx1 cannot be larger that mmx"); _c[0] = SphericalEngine::coeff(C, S, N, nmx, mmx); _c[1] = SphericalEngine::coeff(C1, S1, N1, nmx1, mmx1); } /** * A default constructor so that the object can be created when the * constructor for another object is initialized. This default object can * then be reset with the default copy assignment operator. **********************************************************************/ SphericalHarmonic1() {} /** * Compute a spherical harmonic sum with a correction term. * * @param[in] tau multiplier for correction coefficients \e C' and \e S'. * @param[in] x cartesian coordinate. * @param[in] y cartesian coordinate. * @param[in] z cartesian coordinate. * @return \e V the spherical harmonic sum. * * This routine requires constant memory and thus never throws * an exception. **********************************************************************/ Math::real operator()(real tau, real x, real y, real z) const { real f[] = {1, tau}; real v = 0; real dummy; switch (_norm) { case FULL: v = SphericalEngine::Value (_c, f, x, y, z, _a, dummy, dummy, dummy); break; case SCHMIDT: v = SphericalEngine::Value (_c, f, x, y, z, _a, dummy, dummy, dummy); break; } return v; } /** * Compute a spherical harmonic sum with a correction term and its * gradient. * * @param[in] tau multiplier for correction coefficients \e C' and \e S'. * @param[in] x cartesian coordinate. * @param[in] y cartesian coordinate. * @param[in] z cartesian coordinate. * @param[out] gradx \e x component of the gradient * @param[out] grady \e y component of the gradient * @param[out] gradz \e z component of the gradient * @return \e V the spherical harmonic sum. * * This is the same as the previous function, except that the components of * the gradients of the sum in the \e x, \e y, and \e z directions are * computed. This routine requires constant memory and thus never throws * an exception. **********************************************************************/ Math::real operator()(real tau, real x, real y, real z, real& gradx, real& grady, real& gradz) const { real f[] = {1, tau}; real v = 0; switch (_norm) { case FULL: v = SphericalEngine::Value (_c, f, x, y, z, _a, gradx, grady, gradz); break; case SCHMIDT: v = SphericalEngine::Value (_c, f, x, y, z, _a, gradx, grady, gradz); break; } return v; } /** * Create a CircularEngine to allow the efficient evaluation of several * points on a circle of latitude at a fixed value of \e tau. * * @param[in] tau the multiplier for the correction coefficients. * @param[in] p the radius of the circle. * @param[in] z the height of the circle above the equatorial plane. * @param[in] gradp if true the returned object will be able to compute the * gradient of the sum. * @exception std::bad_alloc if the memory for the CircularEngine can't be * allocated. * @return the CircularEngine object. * * SphericalHarmonic1::operator()() exchanges the order of the sums in the * definition, i.e., ∑n = 0..N * ∑m = 0..n becomes ∑m = * 0..Nn = m..N. * SphericalHarmonic1::Circle performs the inner sum over degree \e n * (which entails about N2 operations). Calling * CircularEngine::operator()() on the returned object performs the outer * sum over the order \e m (about \e N operations). * * See SphericalHarmonic::Circle for an example of its use. **********************************************************************/ CircularEngine Circle(real tau, real p, real z, bool gradp) const { real f[] = {1, tau}; switch (_norm) { case FULL: return gradp ? SphericalEngine::Circle (_c, f, p, z, _a) : SphericalEngine::Circle (_c, f, p, z, _a); break; case SCHMIDT: default: // To avoid compiler warnings return gradp ? SphericalEngine::Circle (_c, f, p, z, _a) : SphericalEngine::Circle (_c, f, p, z, _a); break; } } /** * @return the zeroth SphericalEngine::coeff object. **********************************************************************/ const SphericalEngine::coeff& Coefficients() const { return _c[0]; } /** * @return the first SphericalEngine::coeff object. **********************************************************************/ const SphericalEngine::coeff& Coefficients1() const { return _c[1]; } }; } // namespace GeographicLib #endif // GEOGRAPHICLIB_SPHERICALHARMONIC1_HPP