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Diffstat (limited to 'extern/recastnavigation/Detour/Source/DetourCommon.cpp')
-rw-r--r-- | extern/recastnavigation/Detour/Source/DetourCommon.cpp | 244 |
1 files changed, 244 insertions, 0 deletions
diff --git a/extern/recastnavigation/Detour/Source/DetourCommon.cpp b/extern/recastnavigation/Detour/Source/DetourCommon.cpp new file mode 100644 index 00000000000..e55ce5e6351 --- /dev/null +++ b/extern/recastnavigation/Detour/Source/DetourCommon.cpp @@ -0,0 +1,244 @@ +// +// Copyright (c) 2009 Mikko Mononen memon@inside.org +// +// This software is provided 'as-is', without any express or implied +// warranty. In no event will the authors be held liable for any damages +// arising from the use of this software. +// Permission is granted to anyone to use this software for any purpose, +// including commercial applications, and to alter it and redistribute it +// freely, subject to the following restrictions: +// 1. The origin of this software must not be misrepresented; you must not +// claim that you wrote the original software. If you use this software +// in a product, an acknowledgment in the product documentation would be +// appreciated but is not required. +// 2. Altered source versions must be plainly marked as such, and must not be +// misrepresented as being the original software. +// 3. This notice may not be removed or altered from any source distribution. +// + +#include <math.h> +#include "DetourCommon.h" + +void closestPtPointTriangle(float* closest, const float* p, + const float* a, const float* b, const float* c) +{ + // Check if P in vertex region outside A + float ab[3], ac[3], ap[3]; + vsub(ab, b, a); + vsub(ac, c, a); + vsub(ap, p, a); + float d1 = vdot(ab, ap); + float d2 = vdot(ac, ap); + if (d1 <= 0.0f && d2 <= 0.0f) + { + // barycentric coordinates (1,0,0) + vcopy(closest, a); + return; + } + + // Check if P in vertex region outside B + float bp[3]; + vsub(bp, p, b); + float d3 = vdot(ab, bp); + float d4 = vdot(ac, bp); + if (d3 >= 0.0f && d4 <= d3) + { + // barycentric coordinates (0,1,0) + vcopy(closest, b); + return; + } + + // Check if P in edge region of AB, if so return projection of P onto AB + float vc = d1*d4 - d3*d2; + if (vc <= 0.0f && d1 >= 0.0f && d3 <= 0.0f) + { + // barycentric coordinates (1-v,v,0) + float v = d1 / (d1 - d3); + closest[0] = a[0] + v * ab[0]; + closest[1] = a[1] + v * ab[1]; + closest[2] = a[2] + v * ab[2]; + return; + } + + // Check if P in vertex region outside C + float cp[3]; + vsub(cp, p, c); + float d5 = vdot(ab, cp); + float d6 = vdot(ac, cp); + if (d6 >= 0.0f && d5 <= d6) + { + // barycentric coordinates (0,0,1) + vcopy(closest, c); + return; + } + + // Check if P in edge region of AC, if so return projection of P onto AC + float vb = d5*d2 - d1*d6; + if (vb <= 0.0f && d2 >= 0.0f && d6 <= 0.0f) + { + // barycentric coordinates (1-w,0,w) + float w = d2 / (d2 - d6); + closest[0] = a[0] + w * ac[0]; + closest[1] = a[1] + w * ac[1]; + closest[2] = a[2] + w * ac[2]; + return; + } + + // Check if P in edge region of BC, if so return projection of P onto BC + float va = d3*d6 - d5*d4; + if (va <= 0.0f && (d4 - d3) >= 0.0f && (d5 - d6) >= 0.0f) + { + // barycentric coordinates (0,1-w,w) + float w = (d4 - d3) / ((d4 - d3) + (d5 - d6)); + closest[0] = b[0] + w * (c[0] - b[0]); + closest[1] = b[1] + w * (c[1] - b[1]); + closest[2] = b[2] + w * (c[2] - b[2]); + return; + } + + // P inside face region. Compute Q through its barycentric coordinates (u,v,w) + float denom = 1.0f / (va + vb + vc); + float v = vb * denom; + float w = vc * denom; + closest[0] = a[0] + ab[0] * v + ac[0] * w; + closest[1] = a[1] + ab[1] * v + ac[1] * w; + closest[2] = a[2] + ab[2] * v + ac[2] * w; +} + +bool intersectSegmentPoly2D(const float* p0, const float* p1, + const float* verts, int nverts, + float& tmin, float& tmax, + int& segMin, int& segMax) +{ + static const float EPS = 0.00000001f; + + tmin = 0; + tmax = 1; + segMin = -1; + segMax = -1; + + float dir[3]; + vsub(dir, p1, p0); + + for (int i = 0, j = nverts-1; i < nverts; j=i++) + { + float edge[3], diff[3]; + vsub(edge, &verts[i*3], &verts[j*3]); + vsub(diff, p0, &verts[j*3]); + float n = vperp2D(edge, diff); + float d = -vperp2D(edge, dir); + if (fabs(d) < EPS) + { + // S is nearly parallel to this edge + if (n < 0) + return false; + else + continue; + } + float t = n / d; + if (d < 0) + { + // segment S is entering across this edge + if (t > tmin) + { + tmin = t; + segMin = j; + // S enters after leaving polygon + if (tmin > tmax) + return false; + } + } + else + { + // segment S is leaving across this edge + if (t < tmax) + { + tmax = t; + segMax = j; + // S leaves before entering polygon + if (tmax < tmin) + return false; + } + } + } + + return true; +} + +float distancePtSegSqr2D(const float* pt, const float* p, const float* q, float& t) +{ + float pqx = q[0] - p[0]; + float pqz = q[2] - p[2]; + float dx = pt[0] - p[0]; + float dz = pt[2] - p[2]; + float d = pqx*pqx + pqz*pqz; + t = pqx*dx + pqz*dz; + if (d > 0) + t /= d; + if (t < 0) + t = 0; + else if (t > 1) + t = 1; + + dx = p[0] + t*pqx - pt[0]; + dz = p[2] + t*pqz - pt[2]; + + return dx*dx + dz*dz; +} + +void calcPolyCenter(float* tc, const unsigned short* idx, int nidx, const float* verts) +{ + tc[0] = 0.0f; + tc[1] = 0.0f; + tc[2] = 0.0f; + for (int j = 0; j < nidx; ++j) + { + const float* v = &verts[idx[j]*3]; + tc[0] += v[0]; + tc[1] += v[1]; + tc[2] += v[2]; + } + const float s = 1.0f / nidx; + tc[0] *= s; + tc[1] *= s; + tc[2] *= s; +} + +inline float vdot2(const float* a, const float* b) +{ + return a[0]*b[0] + a[2]*b[2]; +} + +#include <stdio.h> + +bool closestHeightPointTriangle(const float* p, const float* a, const float* b, const float* c, float& h) +{ + float v0[3], v1[3], v2[3]; + vsub(v0, c,a); + vsub(v1, b,a); + vsub(v2, p,a); + + const float dot00 = vdot2(v0, v0); + const float dot01 = vdot2(v0, v1); + const float dot02 = vdot2(v0, v2); + const float dot11 = vdot2(v1, v1); + const float dot12 = vdot2(v1, v2); + + // Compute barycentric coordinates + float invDenom = 1.0f / (dot00 * dot11 - dot01 * dot01); + float u = (dot11 * dot02 - dot01 * dot12) * invDenom; + float v = (dot00 * dot12 - dot01 * dot02) * invDenom; + + // The (sloppy) epsilon is needed to allow to get height of points which + // are interpolated along the edges of the triangles. + static const float EPS = 1e-4f; + + // If point lies inside the triangle, return interpolated ycoord. + if (u >= -EPS && v >= -EPS && (u+v) <= 1+EPS) + { + h = a[1] + v0[1]*u + v1[1]*v; + return true; + } + + return false; +} |