137045ce4SJed Brown /* 237045ce4SJed Brown Common tools for constructing discretizations 337045ce4SJed Brown */ 426bd1501SBarry Smith #if !defined(PETSCDT_H) 526bd1501SBarry Smith #define PETSCDT_H 637045ce4SJed Brown 737045ce4SJed Brown #include <petscsys.h> 837045ce4SJed Brown 92cd22861SMatthew G. Knepley PETSC_EXTERN PetscClassId PETSCQUADRATURE_CLASSID; 102cd22861SMatthew G. Knepley 1121454ff5SMatthew G. Knepley /*S 1221454ff5SMatthew G. Knepley PetscQuadrature - Quadrature rule for integration. 1321454ff5SMatthew G. Knepley 14329bbf4eSMatthew G. Knepley Level: beginner 1521454ff5SMatthew G. Knepley 1621454ff5SMatthew G. Knepley .seealso: PetscQuadratureCreate(), PetscQuadratureDestroy() 1721454ff5SMatthew G. Knepley S*/ 1821454ff5SMatthew G. Knepley typedef struct _p_PetscQuadrature *PetscQuadrature; 1921454ff5SMatthew G. Knepley 208272889dSSatish Balay /*E 21916e780bShannah_mairs PetscGaussLobattoLegendreCreateType - algorithm used to compute the Gauss-Lobatto-Legendre nodes and weights 228272889dSSatish Balay 238272889dSSatish Balay Level: intermediate 248272889dSSatish Balay 25f2e8fe4dShannah_mairs $ PETSCGAUSSLOBATTOLEGENDRE_VIA_LINEAR_ALGEBRA - compute the nodes via linear algebra 26d410ae54Shannah_mairs $ PETSCGAUSSLOBATTOLEGENDRE_VIA_NEWTON - compute the nodes by solving a nonlinear equation with Newton's method 278272889dSSatish Balay 288272889dSSatish Balay E*/ 29f2e8fe4dShannah_mairs typedef enum {PETSCGAUSSLOBATTOLEGENDRE_VIA_LINEAR_ALGEBRA,PETSCGAUSSLOBATTOLEGENDRE_VIA_NEWTON} PetscGaussLobattoLegendreCreateType; 308272889dSSatish Balay 3121454ff5SMatthew G. Knepley PETSC_EXTERN PetscErrorCode PetscQuadratureCreate(MPI_Comm, PetscQuadrature *); 32c9638911SMatthew G. Knepley PETSC_EXTERN PetscErrorCode PetscQuadratureDuplicate(PetscQuadrature, PetscQuadrature *); 33bcede257SMatthew G. Knepley PETSC_EXTERN PetscErrorCode PetscQuadratureGetOrder(PetscQuadrature, PetscInt*); 34bcede257SMatthew G. Knepley PETSC_EXTERN PetscErrorCode PetscQuadratureSetOrder(PetscQuadrature, PetscInt); 35a6b92713SMatthew G. Knepley PETSC_EXTERN PetscErrorCode PetscQuadratureGetNumComponents(PetscQuadrature, PetscInt*); 36a6b92713SMatthew G. Knepley PETSC_EXTERN PetscErrorCode PetscQuadratureSetNumComponents(PetscQuadrature, PetscInt); 37a6b92713SMatthew G. Knepley PETSC_EXTERN PetscErrorCode PetscQuadratureGetData(PetscQuadrature, PetscInt*, PetscInt*, PetscInt*, const PetscReal *[], const PetscReal *[]); 38a6b92713SMatthew G. Knepley PETSC_EXTERN PetscErrorCode PetscQuadratureSetData(PetscQuadrature, PetscInt, PetscInt, PetscInt, const PetscReal [], const PetscReal []); 3921454ff5SMatthew G. Knepley PETSC_EXTERN PetscErrorCode PetscQuadratureView(PetscQuadrature, PetscViewer); 4021454ff5SMatthew G. Knepley PETSC_EXTERN PetscErrorCode PetscQuadratureDestroy(PetscQuadrature *); 41a0845e3aSMatthew G. Knepley 4289710940SMatthew G. Knepley PETSC_EXTERN PetscErrorCode PetscQuadratureExpandComposite(PetscQuadrature, PetscInt, const PetscReal[], const PetscReal[], PetscQuadrature *); 4389710940SMatthew G. Knepley 44907761f8SToby Isaac PETSC_EXTERN PetscErrorCode PetscQuadraturePushForward(PetscQuadrature, PetscInt, const PetscReal[], const PetscReal[], const PetscReal[], PetscInt, PetscQuadrature *); 45907761f8SToby Isaac 4637045ce4SJed Brown PETSC_EXTERN PetscErrorCode PetscDTLegendreEval(PetscInt,const PetscReal*,PetscInt,const PetscInt*,PetscReal*,PetscReal*,PetscReal*); 4737045ce4SJed Brown PETSC_EXTERN PetscErrorCode PetscDTGaussQuadrature(PetscInt,PetscReal,PetscReal,PetscReal*,PetscReal*); 48916e780bShannah_mairs PETSC_EXTERN PetscErrorCode PetscDTGaussLobattoLegendreQuadrature(PetscInt,PetscGaussLobattoLegendreCreateType,PetscReal*,PetscReal*); 49194825f6SJed Brown PETSC_EXTERN PetscErrorCode PetscDTReconstructPoly(PetscInt,PetscInt,const PetscReal*,PetscInt,const PetscReal*,PetscReal*); 50a6b92713SMatthew G. Knepley PETSC_EXTERN PetscErrorCode PetscDTGaussTensorQuadrature(PetscInt,PetscInt,PetscInt,PetscReal,PetscReal,PetscQuadrature*); 51a6b92713SMatthew G. Knepley PETSC_EXTERN PetscErrorCode PetscDTGaussJacobiQuadrature(PetscInt,PetscInt,PetscInt,PetscReal,PetscReal,PetscQuadrature*); 5237045ce4SJed Brown 53b3c0f97bSTom Klotz PETSC_EXTERN PetscErrorCode PetscDTTanhSinhTensorQuadrature(PetscInt, PetscInt, PetscReal, PetscReal, PetscQuadrature *); 54b3c0f97bSTom Klotz PETSC_EXTERN PetscErrorCode PetscDTTanhSinhIntegrate(void (*)(PetscReal, PetscReal *), PetscReal, PetscReal, PetscInt, PetscReal *); 55d525116cSMatthew G. Knepley PETSC_EXTERN PetscErrorCode PetscDTTanhSinhIntegrateMPFR(void (*)(PetscReal, PetscReal *), PetscReal, PetscReal, PetscInt, PetscReal *); 56b3c0f97bSTom Klotz 57916e780bShannah_mairs PETSC_EXTERN PetscErrorCode PetscGaussLobattoLegendreIntegrate(PetscInt, PetscReal *, PetscReal *, const PetscReal *, PetscReal *); 58916e780bShannah_mairs PETSC_EXTERN PetscErrorCode PetscGaussLobattoLegendreElementLaplacianCreate(PetscInt, PetscReal *, PetscReal *, PetscReal ***); 59916e780bShannah_mairs PETSC_EXTERN PetscErrorCode PetscGaussLobattoLegendreElementLaplacianDestroy(PetscInt, PetscReal *, PetscReal *, PetscReal ***); 60916e780bShannah_mairs PETSC_EXTERN PetscErrorCode PetscGaussLobattoLegendreElementGradientCreate(PetscInt, PetscReal *, PetscReal *, PetscReal ***, PetscReal ***); 61916e780bShannah_mairs PETSC_EXTERN PetscErrorCode PetscGaussLobattoLegendreElementGradientDestroy(PetscInt, PetscReal *, PetscReal *, PetscReal ***, PetscReal ***); 62916e780bShannah_mairs PETSC_EXTERN PetscErrorCode PetscGaussLobattoLegendreElementAdvectionCreate(PetscInt, PetscReal *, PetscReal *, PetscReal ***); 63916e780bShannah_mairs PETSC_EXTERN PetscErrorCode PetscGaussLobattoLegendreElementAdvectionDestroy(PetscInt, PetscReal *, PetscReal *, PetscReal ***); 64916e780bShannah_mairs PETSC_EXTERN PetscErrorCode PetscGaussLobattoLegendreElementMassCreate(PetscInt, PetscReal *, PetscReal *, PetscReal ***); 65916e780bShannah_mairs PETSC_EXTERN PetscErrorCode PetscGaussLobattoLegendreElementMassDestroy(PetscInt, PetscReal *, PetscReal *, PetscReal ***); 66916e780bShannah_mairs 671a989b97SToby Isaac PETSC_EXTERN PetscErrorCode PetscDTAltVApply(PetscInt, PetscInt, const PetscReal *, const PetscReal *, PetscReal *); 681a989b97SToby Isaac PETSC_EXTERN PetscErrorCode PetscDTAltVWedge(PetscInt, PetscInt, PetscInt, const PetscReal *, const PetscReal *, PetscReal *); 691a989b97SToby Isaac PETSC_EXTERN PetscErrorCode PetscDTAltVWedgeMatrix(PetscInt, PetscInt, PetscInt, const PetscReal *, PetscReal *); 701a989b97SToby Isaac PETSC_EXTERN PetscErrorCode PetscDTAltVPullback(PetscInt, PetscInt, const PetscReal *, PetscInt, const PetscReal *, PetscReal *); 711a989b97SToby Isaac PETSC_EXTERN PetscErrorCode PetscDTAltVPullbackMatrix(PetscInt, PetscInt, const PetscReal *, PetscInt, PetscReal *); 721a989b97SToby Isaac PETSC_EXTERN PetscErrorCode PetscDTAltVInterior(PetscInt, PetscInt, const PetscReal *, const PetscReal *, PetscReal *); 731a989b97SToby Isaac PETSC_EXTERN PetscErrorCode PetscDTAltVInteriorMatrix(PetscInt, PetscInt, const PetscReal *, PetscReal *); 74dda711d0SToby Isaac PETSC_EXTERN PetscErrorCode PetscDTAltVInteriorPattern(PetscInt, PetscInt, PetscInt (*)[3]); 751a989b97SToby Isaac PETSC_EXTERN PetscErrorCode PetscDTAltVStar(PetscInt, PetscInt, PetscInt, const PetscReal *, PetscReal *); 761a989b97SToby Isaac 77fad4db65SToby Isaac #if defined(PETSC_USE_64BIT_INDICES) 78fad4db65SToby Isaac #define PETSC_FACTORIAL_MAX 20 79fad4db65SToby Isaac #define PETSC_BINOMIAL_MAX 61 80fad4db65SToby Isaac #else 81fad4db65SToby Isaac #define PETSC_FACTORIAL_MAX 12 82fad4db65SToby Isaac #define PETSC_BINOMIAL_MAX 29 83fad4db65SToby Isaac #endif 84fad4db65SToby Isaac 85fad4db65SToby Isaac /*MC 86fad4db65SToby Isaac PetscDTFactorial - Approximate n! as a real number 87fad4db65SToby Isaac 88fad4db65SToby Isaac Input Arguments: 89fad4db65SToby Isaac . n - a non-negative integer 90fad4db65SToby Isaac 9128222859SToby Isaac Output Arguments: 92fad4db65SToby Isaac . factorial - n! 93fad4db65SToby Isaac 94fad4db65SToby Isaac Level: beginner 95fad4db65SToby Isaac M*/ 96fad4db65SToby Isaac PETSC_STATIC_INLINE PetscErrorCode PetscDTFactorial(PetscInt n, PetscReal *factorial) 97fad4db65SToby Isaac { 98fad4db65SToby Isaac PetscReal f = 1.0; 99fad4db65SToby Isaac PetscInt i; 100fad4db65SToby Isaac 101fad4db65SToby Isaac PetscFunctionBegin; 10228222859SToby Isaac *factorial = -1.; 10328222859SToby Isaac if (n < 0) SETERRQ1(PETSC_COMM_SELF, PETSC_ERR_ARG_OUTOFRANGE, "Factorial called with negative number %D\n", n); 104fad4db65SToby Isaac for (i = 1; i < n+1; ++i) f *= i; 105fad4db65SToby Isaac *factorial = f; 106fad4db65SToby Isaac PetscFunctionReturn(0); 107fad4db65SToby Isaac } 108fad4db65SToby Isaac 109fad4db65SToby Isaac /*MC 110fad4db65SToby Isaac PetscDTFactorialInt - Compute n! as an integer 111fad4db65SToby Isaac 112fad4db65SToby Isaac Input Arguments: 113fad4db65SToby Isaac . n - a non-negative integer 114fad4db65SToby Isaac 11528222859SToby Isaac Output Arguments: 116fad4db65SToby Isaac . factorial - n! 117fad4db65SToby Isaac 118fad4db65SToby Isaac Level: beginner 119fad4db65SToby Isaac 120fad4db65SToby Isaac Note: this is limited to n such that n! can be represented by PetscInt, which is 12 if PetscInt is a signed 32-bit integer and 20 if PetscInt is a signed 64-bit integer. 121fad4db65SToby Isaac M*/ 122fad4db65SToby Isaac PETSC_STATIC_INLINE PetscErrorCode PetscDTFactorialInt(PetscInt n, PetscInt *factorial) 123fad4db65SToby Isaac { 124fad4db65SToby Isaac PetscInt facLookup[13] = {1, 1, 2, 6, 24, 120, 720, 5040, 40320, 362880, 3628800, 39916800, 479001600}; 125fad4db65SToby Isaac 12628222859SToby Isaac PetscFunctionBegin; 12728222859SToby Isaac *factorial = -1; 128fad4db65SToby Isaac if (n < 0 || n > PETSC_FACTORIAL_MAX) SETERRQ2(PETSC_COMM_SELF,PETSC_ERR_ARG_OUTOFRANGE,"Number of elements %D is not in supported range [0,%D]\n",n,PETSC_FACTORIAL_MAX); 129fad4db65SToby Isaac if (n <= 12) { 130fad4db65SToby Isaac *factorial = facLookup[n]; 131fad4db65SToby Isaac } else { 132fad4db65SToby Isaac PetscInt f = facLookup[12]; 133fad4db65SToby Isaac PetscInt i; 134fad4db65SToby Isaac 135fad4db65SToby Isaac for (i = 13; i < n+1; ++i) f *= i; 136fad4db65SToby Isaac *factorial = f; 137fad4db65SToby Isaac } 138fad4db65SToby Isaac PetscFunctionReturn(0); 139fad4db65SToby Isaac } 140fad4db65SToby Isaac 141fad4db65SToby Isaac /*MC 142fad4db65SToby Isaac PetscDTBinomial - Approximate the binomial coefficient "n choose k" 143fad4db65SToby Isaac 144fad4db65SToby Isaac Input Arguments: 145fad4db65SToby Isaac + n - a non-negative integer 146fad4db65SToby Isaac - k - an integer between 0 and n, inclusive 147fad4db65SToby Isaac 14828222859SToby Isaac Output Arguments: 149fad4db65SToby Isaac . binomial - approximation of the binomial coefficient n choose k 150fad4db65SToby Isaac 151fad4db65SToby Isaac Level: beginner 152fad4db65SToby Isaac M*/ 153fad4db65SToby Isaac PETSC_STATIC_INLINE PetscErrorCode PetscDTBinomial(PetscInt n, PetscInt k, PetscReal *binomial) 1541a989b97SToby Isaac { 1551a989b97SToby Isaac PetscFunctionBeginHot; 156fad4db65SToby Isaac if (n < 0 || k < 0 || k > n) SETERRQ2(PETSC_COMM_SELF, PETSC_ERR_ARG_OUTOFRANGE, "Binomial arguments (%D %D) must be non-negative, k <= n\n", n, k); 1571a989b97SToby Isaac if (n <= 3) { 1581a989b97SToby Isaac PetscInt binomLookup[4][4] = {{1, 0, 0, 0}, {1, 1, 0, 0}, {1, 2, 1, 0}, {1, 3, 3, 1}}; 1591a989b97SToby Isaac 1601a989b97SToby Isaac *binomial = binomLookup[n][k]; 1611a989b97SToby Isaac } else { 162fad4db65SToby Isaac PetscReal binom = 1.; 1631a989b97SToby Isaac PetscInt i; 1641a989b97SToby Isaac 1651a989b97SToby Isaac k = PetscMin(k, n - k); 1661a989b97SToby Isaac for (i = 0; i < k; i++) binom = (binom * (n - i)) / (i + 1); 1671a989b97SToby Isaac *binomial = binom; 1681a989b97SToby Isaac } 1691a989b97SToby Isaac PetscFunctionReturn(0); 1701a989b97SToby Isaac } 1711a989b97SToby Isaac 172fad4db65SToby Isaac /*MC 173fad4db65SToby Isaac PetscDTBinomialInt - Compute the binomial coefficient "n choose k" 174fad4db65SToby Isaac 175fad4db65SToby Isaac Input Arguments: 176fad4db65SToby Isaac + n - a non-negative integer 177fad4db65SToby Isaac - k - an integer between 0 and n, inclusive 178fad4db65SToby Isaac 17928222859SToby Isaac Output Arguments: 180fad4db65SToby Isaac . binomial - the binomial coefficient n choose k 181fad4db65SToby Isaac 182fad4db65SToby Isaac Note: this is limited by integers that can be represented by PetscInt 183fad4db65SToby Isaac 184fad4db65SToby Isaac Level: beginner 185fad4db65SToby Isaac M*/ 186fad4db65SToby Isaac PETSC_STATIC_INLINE PetscErrorCode PetscDTBinomialInt(PetscInt n, PetscInt k, PetscInt *binomial) 187fad4db65SToby Isaac { 18828222859SToby Isaac PetscInt bin; 18928222859SToby Isaac 19028222859SToby Isaac PetscFunctionBegin; 19128222859SToby Isaac *binomial = -1; 192fad4db65SToby Isaac if (n < 0 || k < 0 || k > n) SETERRQ2(PETSC_COMM_SELF, PETSC_ERR_ARG_OUTOFRANGE, "Binomial arguments (%D %D) must be non-negative, k <= n\n", n, k); 193fad4db65SToby Isaac if (n > PETSC_BINOMIAL_MAX) SETERRQ2(PETSC_COMM_SELF, PETSC_ERR_ARG_OUTOFRANGE, "Binomial elements %D is larger than max for PetscInt, %D\n", n, PETSC_BINOMIAL_MAX); 194fad4db65SToby Isaac if (n <= 3) { 195fad4db65SToby Isaac PetscInt binomLookup[4][4] = {{1, 0, 0, 0}, {1, 1, 0, 0}, {1, 2, 1, 0}, {1, 3, 3, 1}}; 196fad4db65SToby Isaac 19728222859SToby Isaac bin = binomLookup[n][k]; 198fad4db65SToby Isaac } else { 199fad4db65SToby Isaac PetscInt binom = 1; 200fad4db65SToby Isaac PetscInt i; 201fad4db65SToby Isaac 202fad4db65SToby Isaac k = PetscMin(k, n - k); 203fad4db65SToby Isaac for (i = 0; i < k; i++) binom = (binom * (n - i)) / (i + 1); 20428222859SToby Isaac bin = binom; 205fad4db65SToby Isaac } 20628222859SToby Isaac *binomial = bin; 207fad4db65SToby Isaac PetscFunctionReturn(0); 208fad4db65SToby Isaac } 209fad4db65SToby Isaac 210fad4db65SToby Isaac /*MC 211fad4db65SToby Isaac PetscDTEnumPerm - Get a permutation of n integers from its encoding into the integers [0, n!) as a sequence of swaps. 212fad4db65SToby Isaac 213fad4db65SToby Isaac A permutation can be described by the operations that convert the lists [0, 1, ..., n-1] into the permutation, 214fad4db65SToby Isaac by a sequence of swaps, where the ith step swaps whatever number is in ith position with a number that is in 21528222859SToby Isaac some position j >= i. This swap is encoded as the difference (j - i). The difference d_i at step i is less than 21628222859SToby Isaac (n - i). This sequence of n-1 differences [d_0, ..., d_{n-2}] is encoded as the number 217fad4db65SToby Isaac (n-1)! * d_0 + (n-2)! * d_1 + ... + 1! * d_{n-2}. 218fad4db65SToby Isaac 219fad4db65SToby Isaac Input Arguments: 220fad4db65SToby Isaac + n - a non-negative integer (see note about limits below) 2218cd1e013SToby Isaac - k - an integer in [0, n!) 222fad4db65SToby Isaac 223fad4db65SToby Isaac Output Arguments: 224fad4db65SToby Isaac + perm - the permuted list of the integers [0, ..., n-1] 2258cd1e013SToby Isaac - isOdd - if not NULL, returns wether the permutation used an even or odd number of swaps. 226fad4db65SToby Isaac 227fad4db65SToby Isaac Note: this is limited to n such that n! can be represented by PetscInt, which is 12 if PetscInt is a signed 32-bit integer and 20 if PetscInt is a signed 64-bit integer. 228fad4db65SToby Isaac 229fad4db65SToby Isaac Level: beginner 230fad4db65SToby Isaac M*/ 231fad4db65SToby Isaac PETSC_STATIC_INLINE PetscErrorCode PetscDTEnumPerm(PetscInt n, PetscInt k, PetscInt *perm, PetscBool *isOdd) 2321a989b97SToby Isaac { 2331a989b97SToby Isaac PetscInt odd = 0; 2341a989b97SToby Isaac PetscInt i; 235fad4db65SToby Isaac PetscInt work[PETSC_FACTORIAL_MAX]; 236fad4db65SToby Isaac PetscInt *w; 2371a989b97SToby Isaac 23828222859SToby Isaac PetscFunctionBegin; 23928222859SToby Isaac if (isOdd) *isOdd = PETSC_FALSE; 240fad4db65SToby Isaac if (n < 0 || n > PETSC_FACTORIAL_MAX) SETERRQ2(PETSC_COMM_SELF,PETSC_ERR_ARG_OUTOFRANGE,"Number of elements %D is not in supported range [0,%D]\n",n,PETSC_FACTORIAL_MAX); 241fad4db65SToby Isaac w = &work[n - 2]; 2421a989b97SToby Isaac for (i = 2; i <= n; i++) { 2431a989b97SToby Isaac *(w--) = k % i; 2441a989b97SToby Isaac k /= i; 2451a989b97SToby Isaac } 2461a989b97SToby Isaac for (i = 0; i < n; i++) perm[i] = i; 2471a989b97SToby Isaac for (i = 0; i < n - 1; i++) { 2481a989b97SToby Isaac PetscInt s = work[i]; 2491a989b97SToby Isaac PetscInt swap = perm[i]; 2501a989b97SToby Isaac 2511a989b97SToby Isaac perm[i] = perm[i + s]; 2521a989b97SToby Isaac perm[i + s] = swap; 2531a989b97SToby Isaac odd ^= (!!s); 2541a989b97SToby Isaac } 2551a989b97SToby Isaac if (isOdd) *isOdd = odd ? PETSC_TRUE : PETSC_FALSE; 2561a989b97SToby Isaac PetscFunctionReturn(0); 2571a989b97SToby Isaac } 2581a989b97SToby Isaac 259fad4db65SToby Isaac /*MC 2608cd1e013SToby Isaac PetscDTPermIndex - Encode a permutation of n into an integer in [0, n!). This inverts PetscDTEnumPerm. 2618cd1e013SToby Isaac 2628cd1e013SToby Isaac Input Arguments: 2638cd1e013SToby Isaac + n - a non-negative integer (see note about limits below) 2648cd1e013SToby Isaac - perm - the permuted list of the integers [0, ..., n-1] 2658cd1e013SToby Isaac 2668cd1e013SToby Isaac Output Arguments: 2678cd1e013SToby Isaac + k - an integer in [0, n!) 2688cd1e013SToby Isaac . isOdd - if not NULL, returns wether the permutation used an even or odd number of swaps. 2698cd1e013SToby Isaac 2708cd1e013SToby Isaac Note: this is limited to n such that n! can be represented by PetscInt, which is 12 if PetscInt is a signed 32-bit integer and 20 if PetscInt is a signed 64-bit integer. 2718cd1e013SToby Isaac 2728cd1e013SToby Isaac Level: beginner 2738cd1e013SToby Isaac M*/ 2748cd1e013SToby Isaac PETSC_STATIC_INLINE PetscErrorCode PetscDTPermIndex(PetscInt n, const PetscInt *perm, PetscInt *k, PetscBool *isOdd) 2758cd1e013SToby Isaac { 2768cd1e013SToby Isaac PetscInt odd = 0; 2778cd1e013SToby Isaac PetscInt i, idx; 2788cd1e013SToby Isaac PetscInt work[PETSC_FACTORIAL_MAX]; 2798cd1e013SToby Isaac PetscInt iwork[PETSC_FACTORIAL_MAX]; 2808cd1e013SToby Isaac 2818cd1e013SToby Isaac PetscFunctionBeginHot; 28228222859SToby Isaac *k = -1; 28328222859SToby Isaac if (isOdd) *isOdd = PETSC_FALSE; 2848cd1e013SToby Isaac if (n < 0 || n > PETSC_FACTORIAL_MAX) SETERRQ2(PETSC_COMM_SELF,PETSC_ERR_ARG_OUTOFRANGE,"Number of elements %D is not in supported range [0,%D]\n",n,PETSC_FACTORIAL_MAX); 2858cd1e013SToby Isaac for (i = 0; i < n; i++) work[i] = i; /* partial permutation */ 2868cd1e013SToby Isaac for (i = 0; i < n; i++) iwork[i] = i; /* partial permutation inverse */ 2878cd1e013SToby Isaac for (idx = 0, i = 0; i < n - 1; i++) { 2888cd1e013SToby Isaac PetscInt j = perm[i]; 2898cd1e013SToby Isaac PetscInt icur = work[i]; 2908cd1e013SToby Isaac PetscInt jloc = iwork[j]; 2918cd1e013SToby Isaac PetscInt diff = jloc - i; 2928cd1e013SToby Isaac 2938cd1e013SToby Isaac idx = idx * (n - i) + diff; 2948cd1e013SToby Isaac /* swap (i, jloc) */ 2958cd1e013SToby Isaac work[i] = j; 2968cd1e013SToby Isaac work[jloc] = icur; 2978cd1e013SToby Isaac iwork[j] = i; 2988cd1e013SToby Isaac iwork[icur] = jloc; 2998cd1e013SToby Isaac odd ^= (!!diff); 3008cd1e013SToby Isaac } 3018cd1e013SToby Isaac *k = idx; 3028cd1e013SToby Isaac if (isOdd) *isOdd = odd ? PETSC_TRUE : PETSC_FALSE; 3038cd1e013SToby Isaac PetscFunctionReturn(0); 3048cd1e013SToby Isaac } 3058cd1e013SToby Isaac 3068cd1e013SToby Isaac /*MC 307fad4db65SToby Isaac PetscDTEnumSubset - Get an ordered subset of the integers [0, ..., n - 1] from its encoding as an integers in [0, n choose k). 308fad4db65SToby Isaac The encoding is in lexicographic order. 309fad4db65SToby Isaac 310fad4db65SToby Isaac Input Arguments: 311fad4db65SToby Isaac + n - a non-negative integer (see note about limits below) 312fad4db65SToby Isaac . k - an integer in [0, n] 313fad4db65SToby Isaac - j - an index in [0, n choose k) 314fad4db65SToby Isaac 315fad4db65SToby Isaac Output Arguments: 316fad4db65SToby Isaac . subset - the jth subset of size k of the integers [0, ..., n - 1] 317fad4db65SToby Isaac 318fad4db65SToby Isaac Note: this is limited by arguments such that n choose k can be represented by PetscInt 319fad4db65SToby Isaac 320fad4db65SToby Isaac Level: beginner 321fad4db65SToby Isaac 322fad4db65SToby Isaac .seealso: PetscDTSubsetIndex() 323fad4db65SToby Isaac M*/ 3241a989b97SToby Isaac PETSC_STATIC_INLINE PetscErrorCode PetscDTEnumSubset(PetscInt n, PetscInt k, PetscInt j, PetscInt *subset) 3251a989b97SToby Isaac { 3261a989b97SToby Isaac PetscInt Nk, i, l; 3271a989b97SToby Isaac PetscErrorCode ierr; 3281a989b97SToby Isaac 3291a989b97SToby Isaac PetscFunctionBeginHot; 330fad4db65SToby Isaac ierr = PetscDTBinomialInt(n, k, &Nk);CHKERRQ(ierr); 3311a989b97SToby Isaac for (i = 0, l = 0; i < n && l < k; i++) { 3321a989b97SToby Isaac PetscInt Nminuskminus = (Nk * (k - l)) / (n - i); 3331a989b97SToby Isaac PetscInt Nminusk = Nk - Nminuskminus; 3341a989b97SToby Isaac 3351a989b97SToby Isaac if (j < Nminuskminus) { 3361a989b97SToby Isaac subset[l++] = i; 3371a989b97SToby Isaac Nk = Nminuskminus; 3381a989b97SToby Isaac } else { 3391a989b97SToby Isaac j -= Nminuskminus; 3401a989b97SToby Isaac Nk = Nminusk; 3411a989b97SToby Isaac } 3421a989b97SToby Isaac } 3431a989b97SToby Isaac PetscFunctionReturn(0); 3441a989b97SToby Isaac } 3451a989b97SToby Isaac 346fad4db65SToby Isaac /*MC 347fad4db65SToby Isaac PetscDTSubsetIndex - Convert an ordered subset of k integers from the set [0, ..., n - 1] to its encoding as an integers in [0, n choose k) in lexicographic order. This is the inverse of PetscDTEnumSubset. 348fad4db65SToby Isaac 349fad4db65SToby Isaac Input Arguments: 350fad4db65SToby Isaac + n - a non-negative integer (see note about limits below) 351fad4db65SToby Isaac . k - an integer in [0, n] 352fad4db65SToby Isaac - subset - an ordered subset of the integers [0, ..., n - 1] 353fad4db65SToby Isaac 354fad4db65SToby Isaac Output Arguments: 355fad4db65SToby Isaac . index - the rank of the subset in lexicographic order 356fad4db65SToby Isaac 357fad4db65SToby Isaac Note: this is limited by arguments such that n choose k can be represented by PetscInt 358fad4db65SToby Isaac 359fad4db65SToby Isaac Level: beginner 360fad4db65SToby Isaac 361fad4db65SToby Isaac .seealso: PetscDTEnumSubset() 362fad4db65SToby Isaac M*/ 3631a989b97SToby Isaac PETSC_STATIC_INLINE PetscErrorCode PetscDTSubsetIndex(PetscInt n, PetscInt k, const PetscInt *subset, PetscInt *index) 3641a989b97SToby Isaac { 3651a989b97SToby Isaac PetscInt i, j = 0, l, Nk; 3661a989b97SToby Isaac PetscErrorCode ierr; 3671a989b97SToby Isaac 36828222859SToby Isaac PetscFunctionBegin; 36928222859SToby Isaac *index = -1; 370fad4db65SToby Isaac ierr = PetscDTBinomialInt(n, k, &Nk);CHKERRQ(ierr); 3711a989b97SToby Isaac for (i = 0, l = 0; i < n && l < k; i++) { 3721a989b97SToby Isaac PetscInt Nminuskminus = (Nk * (k - l)) / (n - i); 3731a989b97SToby Isaac PetscInt Nminusk = Nk - Nminuskminus; 3741a989b97SToby Isaac 3751a989b97SToby Isaac if (subset[l] == i) { 3761a989b97SToby Isaac l++; 3771a989b97SToby Isaac Nk = Nminuskminus; 3781a989b97SToby Isaac } else { 3791a989b97SToby Isaac j += Nminuskminus; 3801a989b97SToby Isaac Nk = Nminusk; 3811a989b97SToby Isaac } 3821a989b97SToby Isaac } 3831a989b97SToby Isaac *index = j; 3841a989b97SToby Isaac PetscFunctionReturn(0); 3851a989b97SToby Isaac } 3861a989b97SToby Isaac 387fad4db65SToby Isaac /*MC 38828222859SToby Isaac PetscDTEnumSubset - Split the integers [0, ..., n - 1] into two complementary ordered subsets, the first subset of size k and being the jth subset of that size in lexicographic order. 389fad4db65SToby Isaac 390fad4db65SToby Isaac Input Arguments: 391fad4db65SToby Isaac + n - a non-negative integer (see note about limits below) 392fad4db65SToby Isaac . k - an integer in [0, n] 393fad4db65SToby Isaac - j - an index in [0, n choose k) 394fad4db65SToby Isaac 395fad4db65SToby Isaac Output Arguments: 396fad4db65SToby Isaac + perm - the jth subset of size k of the integers [0, ..., n - 1], followed by its complementary set. 39728222859SToby Isaac - isOdd - if not NULL, return whether perm is an even or odd permutation. 398fad4db65SToby Isaac 399fad4db65SToby Isaac Note: this is limited by arguments such that n choose k can be represented by PetscInt 400fad4db65SToby Isaac 401fad4db65SToby Isaac Level: beginner 402fad4db65SToby Isaac 403fad4db65SToby Isaac .seealso: PetscDTEnumSubset(), PetscDTSubsetIndex() 404fad4db65SToby Isaac M*/ 405fad4db65SToby Isaac PETSC_STATIC_INLINE PetscErrorCode PetscDTEnumSplit(PetscInt n, PetscInt k, PetscInt j, PetscInt *perm, PetscBool *isOdd) 4061a989b97SToby Isaac { 4071a989b97SToby Isaac PetscInt i, l, m, *subcomp, Nk; 4081a989b97SToby Isaac PetscInt odd; 4091a989b97SToby Isaac PetscErrorCode ierr; 4101a989b97SToby Isaac 41128222859SToby Isaac PetscFunctionBegin; 41228222859SToby Isaac if (isOdd) *isOdd = PETSC_FALSE; 413fad4db65SToby Isaac ierr = PetscDTBinomialInt(n, k, &Nk);CHKERRQ(ierr); 4141a989b97SToby Isaac odd = 0; 415fad4db65SToby Isaac subcomp = &perm[k]; 4161a989b97SToby Isaac for (i = 0, l = 0, m = 0; i < n && l < k; i++) { 4171a989b97SToby Isaac PetscInt Nminuskminus = (Nk * (k - l)) / (n - i); 4181a989b97SToby Isaac PetscInt Nminusk = Nk - Nminuskminus; 4191a989b97SToby Isaac 4201a989b97SToby Isaac if (j < Nminuskminus) { 421fad4db65SToby Isaac perm[l++] = i; 4221a989b97SToby Isaac Nk = Nminuskminus; 4231a989b97SToby Isaac } else { 4241a989b97SToby Isaac subcomp[m++] = i; 4251a989b97SToby Isaac j -= Nminuskminus; 4261a989b97SToby Isaac odd ^= ((k - l) & 1); 4271a989b97SToby Isaac Nk = Nminusk; 4281a989b97SToby Isaac } 4291a989b97SToby Isaac } 4301a989b97SToby Isaac for (; i < n; i++) { 4311a989b97SToby Isaac subcomp[m++] = i; 4321a989b97SToby Isaac } 4331a989b97SToby Isaac if (isOdd) *isOdd = odd ? PETSC_TRUE : PETSC_FALSE; 4341a989b97SToby Isaac PetscFunctionReturn(0); 4351a989b97SToby Isaac } 4361a989b97SToby Isaac 437*ef0bb6c7SMatthew G. Knepley struct _p_PetscTabulation { 438*ef0bb6c7SMatthew G. Knepley PetscInt K; /* Indicates a k-jet, namely tabulated derviatives up to order k */ 439*ef0bb6c7SMatthew G. Knepley PetscInt Nr; /* THe number of tabulation replicas (often 1) */ 440*ef0bb6c7SMatthew G. Knepley PetscInt Np; /* The number of tabulation points in a replica */ 441*ef0bb6c7SMatthew G. Knepley PetscInt Nb; /* The number of functions tabulated */ 442*ef0bb6c7SMatthew G. Knepley PetscInt Nc; /* The number of function components */ 443*ef0bb6c7SMatthew G. Knepley PetscInt cdim; /* The coordinate dimension */ 444*ef0bb6c7SMatthew G. Knepley PetscReal **T; /* The tabulation T[K] of functions and their derivatives 445*ef0bb6c7SMatthew G. Knepley T[0] = B[Nr*Np][Nb][Nc]: The basis function values at quadrature points 446*ef0bb6c7SMatthew G. Knepley T[1] = D[Nr*Np][Nb][Nc][cdim]: The basis function derivatives at quadrature points 447*ef0bb6c7SMatthew G. Knepley T[2] = H[Nr*Np][Nb][Nc][cdim][cdim]: The basis function second derivatives at quadrature points */ 448*ef0bb6c7SMatthew G. Knepley }; 449*ef0bb6c7SMatthew G. Knepley typedef struct _p_PetscTabulation *PetscTabulation; 450*ef0bb6c7SMatthew G. Knepley 45137045ce4SJed Brown #endif 452