#ifndef SCA_H #define SCA_H #ifdef HAVE_PLURAL #include #include // we must always have this test! inline ideal SCAQuotient(const ring r) { assume(rIsSCA(r)); return r->GetNC()->SCAQuotient(); } static inline unsigned int scaFirstAltVar(ring r) { assume(rIsSCA(r)); return (r->GetNC()->FirstAltVar()); } static inline unsigned int scaLastAltVar(ring r) { assume(rIsSCA(r)); return (r->GetNC()->LastAltVar()); } // The following inlines are just helpers for setup functions. static inline void scaFirstAltVar(ring r, int n) { assume(rIsSCA(r)); r->GetNC()->FirstAltVar() = n; } static inline void scaLastAltVar(ring r, int n) { assume(rIsSCA(r)); r->GetNC()->LastAltVar() = n; } /////////////////////////////////////////////////////////////////////////////////////////// // fast procedures for for SuperCommutative Algebras: /////////////////////////////////////////////////////////////////////////////////////////// // this is not a basic operation... but it for efficiency we did it specially for SCA: // return x_i * pPoly; preserve pPoly. poly sca_pp_Mult_xi_pp(unsigned int i, const poly pPoly, const ring rRing); // set pProcs for r and the variable p_Procs // should be used by nc_p_ProcsSet in "gring.h" void sca_p_ProcsSet(ring rGR, p_Procs_s* p_Procs); ////////////////////////////////////////////////////////////////////////////////////// // TODO: correct the following descriptions... // tests whether p is bi-homogeneous with respect to the given variable'(component')-weights // ps: polynomial is bi-homogeneous iff all terms have the same bi-degree (x,y). bool p_IsBiHomogeneous(const poly p, const intvec *wx, const intvec *wy, const intvec *wCx, const intvec *wCy, int &dx, int &dy, const ring r); ////////////////////////////////////////////////////////////////////////////////////// // tests whether p is bi-homogeneous with respect to the given variable'(component')-weights // ps: ideal is bi-homogeneous iff all its generators are bi-homogeneous polynomials. bool id_IsBiHomogeneous(const ideal id, const intvec *wx, const intvec *wy, const intvec *wCx, const intvec *wCy, const ring r); ////////////////////////////////////////////////////////////////////////////////////// // Scecial for SCA: // returns an intvector with [nvars(r)] integers [1/0] // 1 - for commutative variables // 0 - for anticommutative variables intvec *ivGetSCAXVarWeights(const ring r); // returns an intvector with [nvars(r)] integers [1/0] // 0 - for commutative variables // 1 - for anticommutative variables intvec *ivGetSCAYVarWeights(const ring r); static inline bool p_IsSCAHomogeneous(const poly p, const intvec *wCx, const intvec *wCy, const ring r) { // inefficient! don't use it in time-critical code! intvec *wx = ivGetSCAXVarWeights(r); intvec *wy = ivGetSCAYVarWeights(r); int x,y; bool homog = p_IsBiHomogeneous( p, wx, wy, wCx, wCy, x, y, r ); delete wx; delete wy; return homog; } static inline bool id_IsSCAHomogeneous(const ideal id, const intvec *wCx, const intvec *wCy, const ring r) { // inefficient! don't use it in time-critical code! intvec *wx = ivGetSCAXVarWeights(r); intvec *wy = ivGetSCAYVarWeights(r); bool homog = id_IsBiHomogeneous( id, wx, wy, wCx, wCy, r ); delete wx; delete wy; return homog; } ////////////////////////////////////////////////////////////////////////////////////// // reduce polynomial p modulo , i = iFirstAltVar .. iLastAltVar poly p_KillSquares(const poly p, const unsigned int iFirstAltVar, const unsigned int iLastAltVar, const ring r); ////////////////////////////////////////////////////////////////////////////////////// // reduce ideal id modulo , i = iFirstAltVar .. iLastAltVar // optional argument bSkipZeroes allow skipping of zero entries, by // default - no skipping! ideal id_KillSquares(const ideal id, const unsigned int iFirstAltVar, const unsigned int iLastAltVar, const ring r, const bool bSkipZeroes = false); // for benchmarking bool sca_Force(ring rGR, int b, int e); #ifdef PLURAL_INTERNAL_DECLARATIONS // should be used only inside nc_SetupQuotient! // Check whether this our case: // 1. rG is a commutative polynomial ring \otimes anticommutative algebra // 2. factor ideal rGR->qideal contains squares of all alternating variables. // // if yes, make rGR a super-commutative algebra! // NOTE: Factors of SuperCommutative Algebras are supported this way! // // rG == NULL means that there is no separate base G-algebra in this // case take rGR == rG // special case: bCopy == true (default value: false) // meaning: rGR copies structure from rG // (maybe with some minor changes, which don't change the type!) bool sca_SetupQuotient(ring rGR, ring rG, bool bCopy); #endif // PLURAL_INTERNAL_DECLARATIONS #else // these must not be used at all. // #define scaFirstAltVar(R) 0 // #define scaLastAltVar(R) 0 #endif #endif // #ifndef SCA_H