201 lines
6.7 KiB
Plaintext
201 lines
6.7 KiB
Plaintext
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/// @ref gtx_intersect
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namespace glm
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{
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template<typename genType>
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GLM_FUNC_QUALIFIER bool intersectRayPlane
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(
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genType const& orig, genType const& dir,
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genType const& planeOrig, genType const& planeNormal,
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typename genType::value_type & intersectionDistance
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)
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{
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typename genType::value_type d = glm::dot(dir, planeNormal);
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typename genType::value_type Epsilon = std::numeric_limits<typename genType::value_type>::epsilon();
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if(glm::abs(d) > Epsilon) // if dir and planeNormal are not perpendicular
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{
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typename genType::value_type const tmp_intersectionDistance = glm::dot(planeOrig - orig, planeNormal) / d;
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if (tmp_intersectionDistance > static_cast<typename genType::value_type>(0)) { // allow only intersections
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intersectionDistance = tmp_intersectionDistance;
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return true;
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}
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}
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return false;
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}
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template<typename T, qualifier Q>
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GLM_FUNC_QUALIFIER bool intersectRayTriangle
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(
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vec<3, T, Q> const& orig, vec<3, T, Q> const& dir,
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vec<3, T, Q> const& vert0, vec<3, T, Q> const& vert1, vec<3, T, Q> const& vert2,
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vec<2, T, Q>& baryPosition, T& distance
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)
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{
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// find vectors for two edges sharing vert0
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vec<3, T, Q> const edge1 = vert1 - vert0;
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vec<3, T, Q> const edge2 = vert2 - vert0;
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// begin calculating determinant - also used to calculate U parameter
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vec<3, T, Q> const p = glm::cross(dir, edge2);
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// if determinant is near zero, ray lies in plane of triangle
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T const det = glm::dot(edge1, p);
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vec<3, T, Q> Perpendicular(0);
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if(det > std::numeric_limits<T>::epsilon())
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{
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// calculate distance from vert0 to ray origin
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vec<3, T, Q> const dist = orig - vert0;
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// calculate U parameter and test bounds
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baryPosition.x = glm::dot(dist, p);
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if(baryPosition.x < static_cast<T>(0) || baryPosition.x > det)
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return false;
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// prepare to test V parameter
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Perpendicular = glm::cross(dist, edge1);
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// calculate V parameter and test bounds
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baryPosition.y = glm::dot(dir, Perpendicular);
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if((baryPosition.y < static_cast<T>(0)) || ((baryPosition.x + baryPosition.y) > det))
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return false;
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}
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else if(det < -std::numeric_limits<T>::epsilon())
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{
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// calculate distance from vert0 to ray origin
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vec<3, T, Q> const dist = orig - vert0;
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// calculate U parameter and test bounds
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baryPosition.x = glm::dot(dist, p);
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if((baryPosition.x > static_cast<T>(0)) || (baryPosition.x < det))
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return false;
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// prepare to test V parameter
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Perpendicular = glm::cross(dist, edge1);
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// calculate V parameter and test bounds
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baryPosition.y = glm::dot(dir, Perpendicular);
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if((baryPosition.y > static_cast<T>(0)) || (baryPosition.x + baryPosition.y < det))
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return false;
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}
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else
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return false; // ray is parallel to the plane of the triangle
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T inv_det = static_cast<T>(1) / det;
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// calculate distance, ray intersects triangle
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distance = glm::dot(edge2, Perpendicular) * inv_det;
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baryPosition *= inv_det;
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return true;
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}
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template<typename genType>
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GLM_FUNC_QUALIFIER bool intersectLineTriangle
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(
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genType const& orig, genType const& dir,
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genType const& vert0, genType const& vert1, genType const& vert2,
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genType & position
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)
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{
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typename genType::value_type Epsilon = std::numeric_limits<typename genType::value_type>::epsilon();
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genType edge1 = vert1 - vert0;
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genType edge2 = vert2 - vert0;
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genType Perpendicular = cross(dir, edge2);
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float det = dot(edge1, Perpendicular);
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if (det > -Epsilon && det < Epsilon)
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return false;
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typename genType::value_type inv_det = typename genType::value_type(1) / det;
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genType Tengant = orig - vert0;
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position.y = dot(Tengant, Perpendicular) * inv_det;
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if (position.y < typename genType::value_type(0) || position.y > typename genType::value_type(1))
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return false;
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genType Cotengant = cross(Tengant, edge1);
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position.z = dot(dir, Cotengant) * inv_det;
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if (position.z < typename genType::value_type(0) || position.y + position.z > typename genType::value_type(1))
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return false;
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position.x = dot(edge2, Cotengant) * inv_det;
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return true;
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}
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template<typename genType>
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GLM_FUNC_QUALIFIER bool intersectRaySphere
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(
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genType const& rayStarting, genType const& rayNormalizedDirection,
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genType const& sphereCenter, const typename genType::value_type sphereRadiusSquered,
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typename genType::value_type & intersectionDistance
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)
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{
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typename genType::value_type Epsilon = std::numeric_limits<typename genType::value_type>::epsilon();
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genType diff = sphereCenter - rayStarting;
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typename genType::value_type t0 = dot(diff, rayNormalizedDirection);
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typename genType::value_type dSquared = dot(diff, diff) - t0 * t0;
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if( dSquared > sphereRadiusSquered )
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{
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return false;
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}
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typename genType::value_type t1 = sqrt( sphereRadiusSquered - dSquared );
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intersectionDistance = t0 > t1 + Epsilon ? t0 - t1 : t0 + t1;
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return intersectionDistance > Epsilon;
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}
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template<typename genType>
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GLM_FUNC_QUALIFIER bool intersectRaySphere
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(
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genType const& rayStarting, genType const& rayNormalizedDirection,
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genType const& sphereCenter, const typename genType::value_type sphereRadius,
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genType & intersectionPosition, genType & intersectionNormal
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)
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{
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typename genType::value_type distance;
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if( intersectRaySphere( rayStarting, rayNormalizedDirection, sphereCenter, sphereRadius * sphereRadius, distance ) )
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{
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intersectionPosition = rayStarting + rayNormalizedDirection * distance;
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intersectionNormal = (intersectionPosition - sphereCenter) / sphereRadius;
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return true;
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}
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return false;
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}
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template<typename genType>
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GLM_FUNC_QUALIFIER bool intersectLineSphere
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(
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genType const& point0, genType const& point1,
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genType const& sphereCenter, typename genType::value_type sphereRadius,
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genType & intersectionPoint1, genType & intersectionNormal1,
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genType & intersectionPoint2, genType & intersectionNormal2
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)
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{
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typename genType::value_type Epsilon = std::numeric_limits<typename genType::value_type>::epsilon();
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genType dir = normalize(point1 - point0);
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genType diff = sphereCenter - point0;
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typename genType::value_type t0 = dot(diff, dir);
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typename genType::value_type dSquared = dot(diff, diff) - t0 * t0;
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if( dSquared > sphereRadius * sphereRadius )
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{
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return false;
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}
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typename genType::value_type t1 = sqrt( sphereRadius * sphereRadius - dSquared );
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if( t0 < t1 + Epsilon )
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t1 = -t1;
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intersectionPoint1 = point0 + dir * (t0 - t1);
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intersectionNormal1 = (intersectionPoint1 - sphereCenter) / sphereRadius;
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intersectionPoint2 = point0 + dir * (t0 + t1);
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intersectionNormal2 = (intersectionPoint2 - sphereCenter) / sphereRadius;
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return true;
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}
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}//namespace glm
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