[a2dd9b2] | 1 | /*****************************************************************************\ |
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| 2 | * Computer Algebra System SINGULAR |
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| 3 | \*****************************************************************************/ |
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| 4 | /** @file cfNewtonPolygon.h |
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| 5 | * |
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| 6 | * This file provides functions to compute the Newton polygon of a bivariate |
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| 7 | * polynomial |
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| 8 | * |
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| 9 | * @author Martin Lee |
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| 10 | * |
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| 11 | **/ |
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| 12 | /*****************************************************************************/ |
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| 13 | |
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| 14 | #ifndef CF_NEWTON_POLYGON_H |
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| 15 | #define CF_NEWTON_POLYGON_H |
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| 16 | |
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[e4fe2b] | 17 | // #include "config.h" |
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[a2dd9b2] | 18 | |
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| 19 | #ifdef HAVE_NTL |
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| 20 | #include "NTLconvert.h" |
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| 21 | #endif |
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| 22 | |
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| 23 | /// compute a polygon |
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| 24 | /// |
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| 25 | /// @return an integer n such that the first n entries of @a points are the |
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| 26 | /// vertices of the convex hull of @a points |
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| 27 | int polygon (int** points, ///< [in,out] an array of points in the plane |
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| 28 | int sizePoints///< [in] number of elements in @a points |
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| 29 | ); |
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| 30 | |
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| 31 | /// compute the Newton polygon of a bivariate polynomial |
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| 32 | /// |
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| 33 | /// @return an array of points in the plane which are the vertices of the Newton |
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| 34 | /// polygon of F |
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| 35 | int ** newtonPolygon (const CanonicalForm& F,///< [in] a bivariate polynomial |
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| 36 | int& sizeOfNewtonPoly ///< [in, out] size of the result |
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| 37 | ); |
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| 38 | |
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[16a0df] | 39 | /// compute the convex hull of the support of two bivariate polynomials |
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| 40 | /// |
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| 41 | /// @return an array of points in the plane which are the vertices of the convex |
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| 42 | /// hull of the support of F and G |
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| 43 | int ** newtonPolygon (const CanonicalForm& F,///< [in] a bivariate polynomial |
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| 44 | const CanonicalForm& G,///< [in] a bivariate polynomial |
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| 45 | int& sizeOfNewtonPoly ///< [in, out] size of the result |
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| 46 | ); |
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| 47 | |
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[a2dd9b2] | 48 | /// check if @a point is inside a polygon described by points |
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| 49 | /// |
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| 50 | /// @return true if @a point is inside a polygon described by points |
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| 51 | bool isInPolygon (int ** points, ///< [in] an array of points in the |
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| 52 | ///< plane describing a polygon |
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| 53 | int sizePoints,///< [in] size of @a points |
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| 54 | int* point ///< [in] a point in the plane |
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| 55 | ); |
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| 56 | |
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[6fd83c4] | 57 | /// get the y-direction slopes of all edges with positive slope in y-direction |
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| 58 | /// of a convex polygon with at least one point of the polygon lying on the |
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| 59 | /// x-axis and one lying on the y-axis |
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| 60 | /// |
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| 61 | /// @return an array containing the slopes as described above |
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| 62 | int* getRightSide (int** polygon, ///<[in] vertices of a polygon |
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| 63 | int sizeOfPolygon, ///<[in] number of vertices |
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| 64 | int& sizeOfOutput ///<[in,out] size of the output |
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| 65 | ); |
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| 66 | |
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[9752db] | 67 | /// computes the Newton polygon of F and checks if it satisfies the |
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| 68 | /// irreducibility criterion from S.Gao "Absolute irreducibility of polynomials |
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| 69 | /// via polytopes", Example 1 |
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| 70 | /// |
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| 71 | /// @return true if it satisfies the above criterion, false otherwise |
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| 72 | bool |
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| 73 | irreducibilityTest (const CanonicalForm& F ///<[in] a bivariate polynomial |
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| 74 | ); |
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| 75 | |
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[a2dd9b2] | 76 | #ifdef HAVE_NTL |
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| 77 | /// Algorithm 5 as described in Convex-Dense Bivariate Polynomial Factorization |
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| 78 | /// by Berthomieu, Lecerf |
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| 79 | void convexDense (int** points, ///< [in, out] a set of points in Z^2, returns |
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| 80 | ///< M (points)+A |
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| 81 | int sizePoints,///< [in] size of points |
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| 82 | mat_ZZ& M, ///< [in,out] returns an invertible matrix |
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| 83 | vec_ZZ& A ///< [in,out] returns translation |
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| 84 | ); |
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| 85 | |
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| 86 | /// compress a bivariate poly |
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| 87 | /// |
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| 88 | /// @return @a compress returns a compressed bivariate poly |
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| 89 | /// @sa convexDense, decompress |
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| 90 | CanonicalForm |
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| 91 | compress (const CanonicalForm& F, ///< [in] compressed, i.e. F.level()==2, |
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| 92 | ///< bivariate poly |
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[e243418] | 93 | mat_ZZ& inverseM, ///< [in,out] returns the inverse of M, |
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| 94 | ///< if computeMA==true, M otherwise |
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| 95 | vec_ZZ& A, ///< [in,out] returns translation |
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| 96 | bool computeMA= true ///< [in] whether to compute M and A |
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[a2dd9b2] | 97 | ); |
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| 98 | |
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| 99 | /// decompress a bivariate poly |
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| 100 | /// |
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| 101 | /// @return @a decompress returns a decompressed bivariate poly |
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| 102 | /// @sa convexDense, decompress |
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| 103 | CanonicalForm |
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| 104 | decompress (const CanonicalForm& F,///< [in] compressed, i.e. F.level()<= 2, |
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| 105 | ///< uni- or bivariate poly |
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| 106 | const mat_ZZ& M, ///< [in] matrix M obtained from compress |
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| 107 | const vec_ZZ& A ///< [in] vector A obtained from compress |
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| 108 | ); |
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| 109 | #endif |
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| 110 | |
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| 111 | #endif |
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| 112 | |
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