/*************************************************************************/ /* Copyright (c) 2011-2021 Ivan Fratric and contributors. */ /* */ /* Permission is hereby granted, free of charge, to any person obtaining */ /* a copy of this software and associated documentation files (the */ /* "Software"), to deal in the Software without restriction, including */ /* without limitation the rights to use, copy, modify, merge, publish, */ /* distribute, sublicense, and/or sell copies of the Software, and to */ /* permit persons to whom the Software is furnished to do so, subject to */ /* the following conditions: */ /* */ /* The above copyright notice and this permission notice shall be */ /* included in all copies or substantial portions of the Software. */ /* */ /* THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, */ /* EXPRESS OR IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF */ /* MERCHANTABILITY, FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT.*/ /* IN NO EVENT SHALL THE AUTHORS OR COPYRIGHT HOLDERS BE LIABLE FOR ANY */ /* CLAIM, DAMAGES OR OTHER LIABILITY, WHETHER IN AN ACTION OF CONTRACT, */ /* TORT OR OTHERWISE, ARISING FROM, OUT OF OR IN CONNECTION WITH THE */ /* SOFTWARE OR THE USE OR OTHER DEALINGS IN THE SOFTWARE. */ /*************************************************************************/ #ifndef POLYPARTITION_H #define POLYPARTITION_H #include "core/math/vector2.h" #include "core/templates/list.h" #include "core/templates/set.h" typedef double tppl_float; enum TPPLOrientation { TPPL_ORIENTATION_CW = -1, TPPL_ORIENTATION_NONE = 0, TPPL_ORIENTATION_CCW = 1, }; enum TPPLVertexType { TPPL_VERTEXTYPE_REGULAR = 0, TPPL_VERTEXTYPE_START = 1, TPPL_VERTEXTYPE_END = 2, TPPL_VERTEXTYPE_SPLIT = 3, TPPL_VERTEXTYPE_MERGE = 4, }; // 2D point structure. typedef Vector2 TPPLPoint; // Polygon implemented as an array of points with a "hole" flag. class TPPLPoly { protected: TPPLPoint *points; long numpoints; bool hole; public: // Constructors and destructors. TPPLPoly(); ~TPPLPoly(); TPPLPoly(const TPPLPoly &src); TPPLPoly &operator=(const TPPLPoly &src); // Getters and setters. long GetNumPoints() const { return numpoints; } bool IsHole() const { return hole; } void SetHole(bool hole) { this->hole = hole; } TPPLPoint &GetPoint(long i) { return points[i]; } const TPPLPoint &GetPoint(long i) const { return points[i]; } TPPLPoint *GetPoints() { return points; } TPPLPoint &operator[](int i) { return points[i]; } const TPPLPoint &operator[](int i) const { return points[i]; } // Clears the polygon points. void Clear(); // Inits the polygon with numpoints vertices. void Init(long numpoints); // Creates a triangle with points p1, p2, and p3. void Triangle(TPPLPoint &p1, TPPLPoint &p2, TPPLPoint &p3); // Inverts the orfer of vertices. void Invert(); // Returns the orientation of the polygon. // Possible values: // TPPL_ORIENTATION_CCW: Polygon vertices are in counter-clockwise order. // TPPL_ORIENTATION_CW: Polygon vertices are in clockwise order. // TPPL_ORIENTATION_NONE: The polygon has no (measurable) area. TPPLOrientation GetOrientation() const; // Sets the polygon orientation. // Possible values: // TPPL_ORIENTATION_CCW: Sets vertices in counter-clockwise order. // TPPL_ORIENTATION_CW: Sets vertices in clockwise order. // TPPL_ORIENTATION_NONE: Reverses the orientation of the vertices if there // is one, otherwise does nothing (if orientation is already NONE). void SetOrientation(TPPLOrientation orientation); // Checks whether a polygon is valid or not. inline bool Valid() const { return this->numpoints >= 3; } }; #ifdef TPPL_ALLOCATOR typedef List TPPLPolyList; #else typedef List TPPLPolyList; #endif class TPPLPartition { protected: struct PartitionVertex { bool isActive; bool isConvex; bool isEar; TPPLPoint p; tppl_float angle; PartitionVertex *previous; PartitionVertex *next; PartitionVertex(); }; struct MonotoneVertex { TPPLPoint p; long previous; long next; }; class VertexSorter { MonotoneVertex *vertices; public: VertexSorter(MonotoneVertex *v) : vertices(v) {} bool operator()(long index1, long index2); }; struct Diagonal { long index1; long index2; }; #ifdef TPPL_ALLOCATOR typedef List DiagonalList; #else typedef List DiagonalList; #endif // Dynamic programming state for minimum-weight triangulation. struct DPState { bool visible; tppl_float weight; long bestvertex; }; // Dynamic programming state for convex partitioning. struct DPState2 { bool visible; long weight; DiagonalList pairs; }; // Edge that intersects the scanline. struct ScanLineEdge { mutable long index; TPPLPoint p1; TPPLPoint p2; // Determines if the edge is to the left of another edge. bool operator<(const ScanLineEdge &other) const; bool IsConvex(const TPPLPoint &p1, const TPPLPoint &p2, const TPPLPoint &p3) const; }; // Standard helper functions. bool IsConvex(TPPLPoint &p1, TPPLPoint &p2, TPPLPoint &p3); bool IsReflex(TPPLPoint &p1, TPPLPoint &p2, TPPLPoint &p3); bool IsInside(TPPLPoint &p1, TPPLPoint &p2, TPPLPoint &p3, TPPLPoint &p); bool InCone(TPPLPoint &p1, TPPLPoint &p2, TPPLPoint &p3, TPPLPoint &p); bool InCone(PartitionVertex *v, TPPLPoint &p); int Intersects(TPPLPoint &p11, TPPLPoint &p12, TPPLPoint &p21, TPPLPoint &p22); TPPLPoint Normalize(const TPPLPoint &p); tppl_float Distance(const TPPLPoint &p1, const TPPLPoint &p2); // Helper functions for Triangulate_EC. void UpdateVertexReflexity(PartitionVertex *v); void UpdateVertex(PartitionVertex *v, PartitionVertex *vertices, long numvertices); // Helper functions for ConvexPartition_OPT. void UpdateState(long a, long b, long w, long i, long j, DPState2 **dpstates); void TypeA(long i, long j, long k, PartitionVertex *vertices, DPState2 **dpstates); void TypeB(long i, long j, long k, PartitionVertex *vertices, DPState2 **dpstates); // Helper functions for MonotonePartition. bool Below(TPPLPoint &p1, TPPLPoint &p2); void AddDiagonal(MonotoneVertex *vertices, long *numvertices, long index1, long index2, TPPLVertexType *vertextypes, Set::Element **edgeTreeIterators, Set *edgeTree, long *helpers); // Triangulates a monotone polygon, used in Triangulate_MONO. int TriangulateMonotone(TPPLPoly *inPoly, TPPLPolyList *triangles); public: // Simple heuristic procedure for removing holes from a list of polygons. // It works by creating a diagonal from the right-most hole vertex // to some other visible vertex. // Time complexity: O(h*(n^2)), h is the # of holes, n is the # of vertices. // Space complexity: O(n) // params: // inpolys: // A list of polygons that can contain holes. // Vertices of all non-hole polys have to be in counter-clockwise order. // Vertices of all hole polys have to be in clockwise order. // outpolys: // A list of polygons without holes. // Returns 1 on success, 0 on failure. int RemoveHoles(TPPLPolyList *inpolys, TPPLPolyList *outpolys); // Triangulates a polygon by ear clipping. // Time complexity: O(n^2), n is the number of vertices. // Space complexity: O(n) // params: // poly: // An input polygon to be triangulated. // Vertices have to be in counter-clockwise order. // triangles: // A list of triangles (result). // Returns 1 on success, 0 on failure. int Triangulate_EC(TPPLPoly *poly, TPPLPolyList *triangles); // Triangulates a list of polygons that may contain holes by ear clipping // algorithm. It first calls RemoveHoles to get rid of the holes, and then // calls Triangulate_EC for each resulting polygon. // Time complexity: O(h*(n^2)), h is the # of holes, n is the # of vertices. // Space complexity: O(n) // params: // inpolys: // A list of polygons to be triangulated (can contain holes). // Vertices of all non-hole polys have to be in counter-clockwise order. // Vertices of all hole polys have to be in clockwise order. // triangles: // A list of triangles (result). // Returns 1 on success, 0 on failure. int Triangulate_EC(TPPLPolyList *inpolys, TPPLPolyList *triangles); // Creates an optimal polygon triangulation in terms of minimal edge length. // Time complexity: O(n^3), n is the number of vertices // Space complexity: O(n^2) // params: // poly: // An input polygon to be triangulated. // Vertices have to be in counter-clockwise order. // triangles: // A list of triangles (result). // Returns 1 on success, 0 on failure. int Triangulate_OPT(TPPLPoly *poly, TPPLPolyList *triangles); // Triangulates a polygon by first partitioning it into monotone polygons. // Time complexity: O(n*log(n)), n is the number of vertices. // Space complexity: O(n) // params: // poly: // An input polygon to be triangulated. // Vertices have to be in counter-clockwise order. // triangles: // A list of triangles (result). // Returns 1 on success, 0 on failure. int Triangulate_MONO(TPPLPoly *poly, TPPLPolyList *triangles); // Triangulates a list of polygons by first // partitioning them into monotone polygons. // Time complexity: O(n*log(n)), n is the number of vertices. // Space complexity: O(n) // params: // inpolys: // A list of polygons to be triangulated (can contain holes). // Vertices of all non-hole polys have to be in counter-clockwise order. // Vertices of all hole polys have to be in clockwise order. // triangles: // A list of triangles (result). // Returns 1 on success, 0 on failure. int Triangulate_MONO(TPPLPolyList *inpolys, TPPLPolyList *triangles); // Creates a monotone partition of a list of polygons that // can contain holes. Triangulates a set of polygons by // first partitioning them into monotone polygons. // Time complexity: O(n*log(n)), n is the number of vertices. // Space complexity: O(n) // params: // inpolys: // A list of polygons to be triangulated (can contain holes). // Vertices of all non-hole polys have to be in counter-clockwise order. // Vertices of all hole polys have to be in clockwise order. // monotonePolys: // A list of monotone polygons (result). // Returns 1 on success, 0 on failure. int MonotonePartition(TPPLPolyList *inpolys, TPPLPolyList *monotonePolys); // Partitions a polygon into convex polygons by using the // Hertel-Mehlhorn algorithm. The algorithm gives at most four times // the number of parts as the optimal algorithm, however, in practice // it works much better than that and often gives optimal partition. // It uses triangulation obtained by ear clipping as intermediate result. // Time complexity O(n^2), n is the number of vertices. // Space complexity: O(n) // params: // poly: // An input polygon to be partitioned. // Vertices have to be in counter-clockwise order. // parts: // Resulting list of convex polygons. // Returns 1 on success, 0 on failure. int ConvexPartition_HM(TPPLPoly *poly, TPPLPolyList *parts); // Partitions a list of polygons into convex parts by using the // Hertel-Mehlhorn algorithm. The algorithm gives at most four times // the number of parts as the optimal algorithm, however, in practice // it works much better than that and often gives optimal partition. // It uses triangulation obtained by ear clipping as intermediate result. // Time complexity O(n^2), n is the number of vertices. // Space complexity: O(n) // params: // inpolys: // An input list of polygons to be partitioned. Vertices of // all non-hole polys have to be in counter-clockwise order. // Vertices of all hole polys have to be in clockwise order. // parts: // Resulting list of convex polygons. // Returns 1 on success, 0 on failure. int ConvexPartition_HM(TPPLPolyList *inpolys, TPPLPolyList *parts); // Optimal convex partitioning (in terms of number of resulting // convex polygons) using the Keil-Snoeyink algorithm. // For reference, see M. Keil, J. Snoeyink, "On the time bound for // convex decomposition of simple polygons", 1998. // Time complexity O(n^3), n is the number of vertices. // Space complexity: O(n^3) // params: // poly: // An input polygon to be partitioned. // Vertices have to be in counter-clockwise order. // parts: // Resulting list of convex polygons. // Returns 1 on success, 0 on failure. int ConvexPartition_OPT(TPPLPoly *poly, TPPLPolyList *parts); }; #endif