// Boost.Geometry // Copyright (c) 2016-2018 Oracle and/or its affiliates. // Contributed and/or modified by Vissarion Fysikopoulos, on behalf of Oracle // Contributed and/or modified by Adam Wulkiewicz, on behalf of Oracle // Use, modification and distribution is subject to the Boost Software License, // Version 1.0. (See accompanying file LICENSE_1_0.txt or copy at // http://www.boost.org/LICENSE_1_0.txt) #ifndef BOOST_GEOMETRY_FORMULAS_MAXIMUM_LONGITUDE_HPP #define BOOST_GEOMETRY_FORMULAS_MAXIMUM_LONGITUDE_HPP #include #include #include #include namespace boost { namespace geometry { namespace formula { /*! \brief Algorithm to compute the vertex longitude of a geodesic segment. Vertex is a point on the geodesic that maximizes (or minimizes) the latitude. The algorithm is given the vertex latitude. */ //Classes for spesific CS template class vertex_longitude_on_sphere { public: template static inline CT apply(T const& lat1, //segment point 1 T const& lat2, //segment point 2 T const& lat3, //vertex latitude T const& sin_l12, T const& cos_l12) //lon1 -lon2 { //https://en.wikipedia.org/wiki/Great-circle_navigation#Finding_way-points CT const A = sin(lat1) * cos(lat2) * cos(lat3) * sin_l12; CT const B = sin(lat1) * cos(lat2) * cos(lat3) * cos_l12 - cos(lat1) * sin(lat2) * cos(lat3); CT lon = atan2(B, A); return lon + math::pi(); } }; template class vertex_longitude_on_spheroid { template static inline void normalize(T& x, T& y) { T h = boost::math::hypot(x, y); x /= h; y /= h; } public: template static inline CT apply(T const& lat1, //segment point 1 T const& lat2, //segment point 2 T const& lat3, //vertex latitude T& alp1, Spheroid const& spheroid) { // We assume that segment points lay on different side w.r.t. // the vertex // Constants CT const c0 = 0; CT const c2 = 2; CT const half_pi = math::pi() / c2; if (math::equals(lat1, half_pi) || math::equals(lat2, half_pi) || math::equals(lat1, -half_pi) || math::equals(lat2, -half_pi)) { // one segment point is the pole return c0; } // More constants CT const f = flattening(spheroid); CT const pi = math::pi(); CT const c1 = 1; CT const cminus1 = -1; // First, compute longitude on auxiliary sphere CT const one_minus_f = c1 - f; CT const bet1 = atan(one_minus_f * tan(lat1)); CT const bet2 = atan(one_minus_f * tan(lat2)); CT const bet3 = atan(one_minus_f * tan(lat3)); CT cos_bet1 = cos(bet1); CT cos_bet2 = cos(bet2); CT const sin_bet1 = sin(bet1); CT const sin_bet2 = sin(bet2); CT const sin_bet3 = sin(bet3); CT omg12 = 0; if (bet1 < c0) { cos_bet1 *= cminus1; omg12 += pi; } if (bet2 < c0) { cos_bet2 *= cminus1; omg12 += pi; } CT const sin_alp1 = sin(alp1); CT const cos_alp1 = math::sqrt(c1 - math::sqr(sin_alp1)); CT const norm = math::sqrt(math::sqr(cos_alp1) + math::sqr(sin_alp1 * sin_bet1)); CT const sin_alp0 = sin(atan2(sin_alp1 * cos_bet1, norm)); BOOST_ASSERT(cos_bet2 != c0); CT const sin_alp2 = sin_alp1 * cos_bet1 / cos_bet2; CT const cos_alp0 = math::sqrt(c1 - math::sqr(sin_alp0)); CT const cos_alp2 = math::sqrt(c1 - math::sqr(sin_alp2)); CT const sig1 = atan2(sin_bet1, cos_alp1 * cos_bet1); CT const sig2 = atan2(sin_bet2, -cos_alp2 * cos_bet2); //lat3 is a vertex CT const cos_sig1 = cos(sig1); CT const sin_sig1 = math::sqrt(c1 - math::sqr(cos_sig1)); CT const cos_sig2 = cos(sig2); CT const sin_sig2 = math::sqrt(c1 - math::sqr(cos_sig2)); CT const omg1 = atan2(sin_alp0 * sin_sig1, cos_sig1); CT const omg2 = atan2(sin_alp0 * sin_sig2, cos_sig2); omg12 += omg1 - omg2; CT const sin_omg12 = sin(omg12); CT const cos_omg12 = cos(omg12); CT omg13 = geometry::formula::vertex_longitude_on_sphere ::apply(bet1, bet2, bet3, sin_omg12, cos_omg12); if (lat1 * lat2 < c0)//different hemispheres { if ((lat2 - lat1) * lat3 > c0)// ascending segment { omg13 = pi - omg13; } } // Second, compute the ellipsoidal longitude CT const e2 = f * (c2 - f); CT const ep = math::sqrt(e2 / (c1 - e2)); CT const k2 = math::sqr(ep * cos_alp0); CT const sqrt_k2_plus_one = math::sqrt(c1 + k2); CT const eps = (sqrt_k2_plus_one - c1) / (sqrt_k2_plus_one + c1); CT const eps2 = eps * eps; CT const n = f / (c2 - f); // sig3 is the length from equator to the vertex CT sig3; if(sin_bet3 > c0) { sig3 = half_pi; } else { sig3 = -half_pi; } CT const cos_sig3 = 0; CT const sin_sig3 = 1; CT sig13 = sig3 - sig1; if (sig13 > pi) { sig13 -= 2 * pi; } // Order 2 approximation CT const c1over2 = 0.5; CT const c1over4 = 0.25; CT const c1over8 = 0.125; CT const c1over16 = 0.0625; CT const c4 = 4; CT const c8 = 8; CT const A3 = 1 - (c1over2 - c1over2 * n) * eps - c1over4 * eps2; CT const C31 = (c1over4 - c1over4 * n) * eps + c1over8 * eps2; CT const C32 = c1over16 * eps2; CT const sin2_sig3 = c2 * cos_sig3 * sin_sig3; CT const sin4_sig3 = sin_sig3 * (-c4 * cos_sig3 + c8 * cos_sig3 * cos_sig3 * cos_sig3); CT const sin2_sig1 = c2 * cos_sig1 * sin_sig1; CT const sin4_sig1 = sin_sig1 * (-c4 * cos_sig1 + c8 * cos_sig1 * cos_sig1 * cos_sig1); CT const I3 = A3 * (sig13 + C31 * (sin2_sig3 - sin2_sig1) + C32 * (sin4_sig3 - sin4_sig1)); CT const sign = bet3 >= c0 ? c1 : cminus1; CT const dlon_max = omg13 - sign * f * sin_alp0 * I3; return dlon_max; } }; //CS_tag dispatching template struct compute_vertex_lon { BOOST_MPL_ASSERT_MSG ( false, NOT_IMPLEMENTED_FOR_THIS_COORDINATE_SYSTEM, (types) ); }; template struct compute_vertex_lon { template static inline CT apply(CT const& lat1, CT const& lat2, CT const& vertex_lat, CT const& sin_l12, CT const& cos_l12, CT, Strategy) { return vertex_longitude_on_sphere ::apply(lat1, lat2, vertex_lat, sin_l12, cos_l12); } }; template struct compute_vertex_lon { template static inline CT apply(CT const& lat1, CT const& lat2, CT const& vertex_lat, CT, CT, CT& alp1, Strategy const& azimuth_strategy) { return vertex_longitude_on_spheroid ::apply(lat1, lat2, vertex_lat, alp1, azimuth_strategy.model()); } }; // Vertex longitude interface // Assume that lon1 < lon2 and vertex_lat is the latitude of the vertex template class vertex_longitude { public : template static inline CT apply(CT& lon1, CT& lat1, CT& lon2, CT& lat2, CT const& vertex_lat, CT& alp1, Strategy const& azimuth_strategy) { CT const c0 = 0; CT pi = math::pi(); //Vertex is a segment's point if (math::equals(vertex_lat, lat1)) { return lon1; } if (math::equals(vertex_lat, lat2)) { return lon2; } //Segment lay on meridian if (math::equals(lon1, lon2)) { return (std::max)(lat1, lat2); } BOOST_ASSERT(lon1 < lon2); CT dlon = compute_vertex_lon::apply(lat1, lat2, vertex_lat, sin(lon1 - lon2), cos(lon1 - lon2), alp1, azimuth_strategy); CT vertex_lon = std::fmod(lon1 + dlon, 2 * pi); if (vertex_lat < c0) { vertex_lon -= pi; } if (std::abs(lon1 - lon2) > pi) { vertex_lon -= pi; } return vertex_lon; } }; template class vertex_longitude { public : template static inline CT apply(CT& /*lon1*/, CT& /*lat1*/, CT& lon2, CT& /*lat2*/, CT const& /*vertex_lat*/, CT& /*alp1*/, Strategy const& /*azimuth_strategy*/) { return lon2; } }; }}} // namespace boost::geometry::formula #endif // BOOST_GEOMETRY_FORMULAS_MAXIMUM_LONGITUDE_HPP