1 // Copyright (c) 2017, Lawrence Livermore National Security, LLC. Produced at 2 // the Lawrence Livermore National Laboratory. LLNL-CODE-734707. All Rights 3 // reserved. See files LICENSE and NOTICE for details. 4 // 5 // This file is part of CEED, a collection of benchmarks, miniapps, software 6 // libraries and APIs for efficient high-order finite element and spectral 7 // element discretizations for exascale applications. For more information and 8 // source code availability see http://github.com/ceed. 9 // 10 // The CEED research is supported by the Exascale Computing Project 17-SC-20-SC, 11 // a collaborative effort of two U.S. Department of Energy organizations (Office 12 // of Science and the National Nuclear Security Administration) responsible for 13 // the planning and preparation of a capable exascale ecosystem, including 14 // software, applications, hardware, advanced system engineering and early 15 // testbed platforms, in support of the nation's exascale computing imperative. 16 17 #include <ceed-impl.h> 18 #include <ceed-backend.h> 19 #include <math.h> 20 #include <stdio.h> 21 #include <stdlib.h> 22 #include <string.h> 23 24 /// @cond DOXYGEN_SKIP 25 static struct CeedBasis_private ceed_basis_collocated; 26 /// @endcond 27 28 /// @file 29 /// Implementation of public CeedBasis interfaces 30 /// 31 /// @addtogroup CeedBasis 32 /// @{ 33 34 /** 35 @brief Create a tensor product basis for H^1 discretizations 36 37 @param ceed A Ceed object where the CeedBasis will be created 38 @param dim Topological dimension 39 @param ncomp Number of field components (1 for scalar fields) 40 @param P1d Number of nodes in one dimension 41 @param Q1d Number of quadrature points in one dimension 42 @param interp1d Row-major Q1d × P1d matrix expressing the values of nodal 43 basis functions at quadrature points 44 @param grad1d Row-major Q1d × P1d matrix expressing derivatives of nodal 45 basis functions at quadrature points 46 @param qref1d Array of length Q1d holding the locations of quadrature points 47 on the 1D reference element [-1, 1] 48 @param qweight1d Array of length Q1d holding the quadrature weights on the 49 reference element 50 @param[out] basis Address of the variable where the newly created 51 CeedBasis will be stored. 52 53 @return An error code: 0 - success, otherwise - failure 54 55 @ref Basic 56 **/ 57 int CeedBasisCreateTensorH1(Ceed ceed, CeedInt dim, CeedInt ncomp, CeedInt P1d, 58 CeedInt Q1d, const CeedScalar *interp1d, 59 const CeedScalar *grad1d, const CeedScalar *qref1d, 60 const CeedScalar *qweight1d, CeedBasis *basis) { 61 int ierr; 62 63 if (dim<1) 64 // LCOV_EXCL_START 65 return CeedError(ceed, 1, "Basis dimension must be a positive value"); 66 // LCOV_EXCL_STOP 67 68 if (!ceed->BasisCreateTensorH1) { 69 Ceed delegate; 70 ierr = CeedGetObjectDelegate(ceed, &delegate, "Basis"); CeedChk(ierr); 71 72 if (!delegate) 73 // LCOV_EXCL_START 74 return CeedError(ceed, 1, "Backend does not support BasisCreateTensorH1"); 75 // LCOV_EXCL_STOP 76 77 ierr = CeedBasisCreateTensorH1(delegate, dim, ncomp, P1d, 78 Q1d, interp1d, grad1d, qref1d, 79 qweight1d, basis); CeedChk(ierr); 80 return 0; 81 } 82 ierr = CeedCalloc(1,basis); CeedChk(ierr); 83 (*basis)->ceed = ceed; 84 ceed->refcount++; 85 (*basis)->refcount = 1; 86 (*basis)->tensorbasis = 1; 87 (*basis)->dim = dim; 88 (*basis)->ncomp = ncomp; 89 (*basis)->P1d = P1d; 90 (*basis)->Q1d = Q1d; 91 (*basis)->P = CeedIntPow(P1d, dim); 92 (*basis)->Q = CeedIntPow(Q1d, dim); 93 ierr = CeedMalloc(Q1d,&(*basis)->qref1d); CeedChk(ierr); 94 ierr = CeedMalloc(Q1d,&(*basis)->qweight1d); CeedChk(ierr); 95 memcpy((*basis)->qref1d, qref1d, Q1d*sizeof(qref1d[0])); 96 memcpy((*basis)->qweight1d, qweight1d, Q1d*sizeof(qweight1d[0])); 97 ierr = CeedMalloc(Q1d*P1d,&(*basis)->interp1d); CeedChk(ierr); 98 ierr = CeedMalloc(Q1d*P1d,&(*basis)->grad1d); CeedChk(ierr); 99 memcpy((*basis)->interp1d, interp1d, Q1d*P1d*sizeof(interp1d[0])); 100 memcpy((*basis)->grad1d, grad1d, Q1d*P1d*sizeof(grad1d[0])); 101 ierr = ceed->BasisCreateTensorH1(dim, P1d, Q1d, interp1d, grad1d, qref1d, 102 qweight1d, *basis); CeedChk(ierr); 103 return 0; 104 } 105 106 /** 107 @brief Create a tensor product Lagrange basis 108 109 @param ceed A Ceed object where the CeedBasis will be created 110 @param dim Topological dimension of element 111 @param ncomp Number of field components 112 @param P Number of Gauss-Lobatto nodes in one dimension. The 113 polynomial degree of the resulting Q_k element is k=P-1. 114 @param Q Number of quadrature points in one dimension. 115 @param qmode Distribution of the Q quadrature points (affects order of 116 accuracy for the quadrature) 117 @param[out] basis Address of the variable where the newly created 118 CeedBasis will be stored. 119 120 @return An error code: 0 - success, otherwise - failure 121 122 @ref Basic 123 **/ 124 int CeedBasisCreateTensorH1Lagrange(Ceed ceed, CeedInt dim, CeedInt ncomp, 125 CeedInt P, CeedInt Q, CeedQuadMode qmode, 126 CeedBasis *basis) { 127 // Allocate 128 int ierr, i, j, k; 129 CeedScalar c1, c2, c3, c4, dx, *nodes, *interp1d, *grad1d, *qref1d, *qweight1d; 130 131 if (dim<1) 132 // LCOV_EXCL_START 133 return CeedError(ceed, 1, "Basis dimension must be a positive value"); 134 // LCOV_EXCL_STOP 135 136 ierr = CeedCalloc(P*Q, &interp1d); CeedChk(ierr); 137 ierr = CeedCalloc(P*Q, &grad1d); CeedChk(ierr); 138 ierr = CeedCalloc(P, &nodes); CeedChk(ierr); 139 ierr = CeedCalloc(Q, &qref1d); CeedChk(ierr); 140 ierr = CeedCalloc(Q, &qweight1d); CeedChk(ierr); 141 // Get Nodes and Weights 142 ierr = CeedLobattoQuadrature(P, nodes, NULL); CeedChk(ierr); 143 switch (qmode) { 144 case CEED_GAUSS: 145 ierr = CeedGaussQuadrature(Q, qref1d, qweight1d); CeedChk(ierr); 146 break; 147 case CEED_GAUSS_LOBATTO: 148 ierr = CeedLobattoQuadrature(Q, qref1d, qweight1d); CeedChk(ierr); 149 break; 150 } 151 // Build B, D matrix 152 // Fornberg, 1998 153 for (i = 0; i < Q; i++) { 154 c1 = 1.0; 155 c3 = nodes[0] - qref1d[i]; 156 interp1d[i*P+0] = 1.0; 157 for (j = 1; j < P; j++) { 158 c2 = 1.0; 159 c4 = c3; 160 c3 = nodes[j] - qref1d[i]; 161 for (k = 0; k < j; k++) { 162 dx = nodes[j] - nodes[k]; 163 c2 *= dx; 164 if (k == j - 1) { 165 grad1d[i*P + j] = c1*(interp1d[i*P + k] - c4*grad1d[i*P + k]) / c2; 166 interp1d[i*P + j] = - c1*c4*interp1d[i*P + k] / c2; 167 } 168 grad1d[i*P + k] = (c3*grad1d[i*P + k] - interp1d[i*P + k]) / dx; 169 interp1d[i*P + k] = c3*interp1d[i*P + k] / dx; 170 } 171 c1 = c2; 172 } 173 } 174 // // Pass to CeedBasisCreateTensorH1 175 ierr = CeedBasisCreateTensorH1(ceed, dim, ncomp, P, Q, interp1d, grad1d, qref1d, 176 qweight1d, basis); CeedChk(ierr); 177 ierr = CeedFree(&interp1d); CeedChk(ierr); 178 ierr = CeedFree(&grad1d); CeedChk(ierr); 179 ierr = CeedFree(&nodes); CeedChk(ierr); 180 ierr = CeedFree(&qref1d); CeedChk(ierr); 181 ierr = CeedFree(&qweight1d); CeedChk(ierr); 182 return 0; 183 } 184 185 /** 186 @brief Create a non tensor product basis for H^1 discretizations 187 188 @param ceed A Ceed object where the CeedBasis will be created 189 @param topo Topology of element, e.g. hypercube, simplex, ect 190 @param ncomp Number of field components (1 for scalar fields) 191 @param nnodes Total number of nodes 192 @param nqpts Total number of quadrature points 193 @param interp Row-major nqpts × nnodes matrix expressing the values of 194 nodal basis functions at quadrature points 195 @param grad Row-major (nqpts x dim) × nnodes matrix expressing 196 derivatives of nodal basis functions at quadrature points 197 @param qref Array of length nqpts holding the locations of quadrature 198 points on the reference element [-1, 1] 199 @param qweight Array of length nqpts holding the quadrature weights on the 200 reference element 201 @param[out] basis Address of the variable where the newly created 202 CeedBasis will be stored. 203 204 @return An error code: 0 - success, otherwise - failure 205 206 @ref Basic 207 **/ 208 int CeedBasisCreateH1(Ceed ceed, CeedElemTopology topo, CeedInt ncomp, 209 CeedInt nnodes, CeedInt nqpts, const CeedScalar *interp, 210 const CeedScalar *grad, const CeedScalar *qref, 211 const CeedScalar *qweight, CeedBasis *basis) { 212 int ierr; 213 CeedInt P = nnodes, Q = nqpts, dim = 0; 214 215 if (!ceed->BasisCreateH1) { 216 Ceed delegate; 217 ierr = CeedGetObjectDelegate(ceed, &delegate, "Basis"); CeedChk(ierr); 218 219 if (!delegate) 220 // LCOV_EXCL_START 221 return CeedError(ceed, 1, "Backend does not support BasisCreateH1"); 222 // LCOV_EXCL_STOP 223 224 ierr = CeedBasisCreateH1(delegate, topo, ncomp, nnodes, 225 nqpts, interp, grad, qref, 226 qweight, basis); CeedChk(ierr); 227 return 0; 228 } 229 230 ierr = CeedCalloc(1,basis); CeedChk(ierr); 231 232 ierr = CeedBasisGetTopologyDimension(topo, &dim); CeedChk(ierr); 233 234 (*basis)->ceed = ceed; 235 ceed->refcount++; 236 (*basis)->refcount = 1; 237 (*basis)->tensorbasis = 0; 238 (*basis)->dim = dim; 239 (*basis)->ncomp = ncomp; 240 (*basis)->P = P; 241 (*basis)->Q = Q; 242 ierr = CeedMalloc(Q*dim,&(*basis)->qref1d); CeedChk(ierr); 243 ierr = CeedMalloc(Q,&(*basis)->qweight1d); CeedChk(ierr); 244 memcpy((*basis)->qref1d, qref, Q*dim*sizeof(qref[0])); 245 memcpy((*basis)->qweight1d, qweight, Q*sizeof(qweight[0])); 246 ierr = CeedMalloc(Q*P,&(*basis)->interp1d); CeedChk(ierr); 247 ierr = CeedMalloc(dim*Q*P,&(*basis)->grad1d); CeedChk(ierr); 248 memcpy((*basis)->interp1d, interp, Q*P*sizeof(interp[0])); 249 memcpy((*basis)->grad1d, grad, dim*Q*P*sizeof(grad[0])); 250 ierr = ceed->BasisCreateH1(topo, dim, P, Q, interp, grad, qref, 251 qweight, *basis); CeedChk(ierr); 252 return 0; 253 } 254 255 /** 256 @brief Construct a Gauss-Legendre quadrature 257 258 @param Q Number of quadrature points (integrates polynomials of 259 degree 2*Q-1 exactly) 260 @param[out] qref1d Array of length Q to hold the abscissa on [-1, 1] 261 @param[out] qweight1d Array of length Q to hold the weights 262 263 @return An error code: 0 - success, otherwise - failure 264 265 @ref Utility 266 **/ 267 int CeedGaussQuadrature(CeedInt Q, CeedScalar *qref1d, CeedScalar *qweight1d) { 268 // Allocate 269 CeedScalar P0, P1, P2, dP2, xi, wi, PI = 4.0*atan(1.0); 270 // Build qref1d, qweight1d 271 for (int i = 0; i <= Q/2; i++) { 272 // Guess 273 xi = cos(PI*(CeedScalar)(2*i+1)/((CeedScalar)(2*Q))); 274 // Pn(xi) 275 P0 = 1.0; 276 P1 = xi; 277 P2 = 0.0; 278 for (int j = 2; j <= Q; j++) { 279 P2 = (((CeedScalar)(2*j-1))*xi*P1-((CeedScalar)(j-1))*P0)/((CeedScalar)(j)); 280 P0 = P1; 281 P1 = P2; 282 } 283 // First Newton Step 284 dP2 = (xi*P2 - P0)*(CeedScalar)Q/(xi*xi-1.0); 285 xi = xi-P2/dP2; 286 // Newton to convergence 287 for (int k=0; k<100 && fabs(P2)>1e-15; k++) { 288 P0 = 1.0; 289 P1 = xi; 290 for (int j = 2; j <= Q; j++) { 291 P2 = (((CeedScalar)(2*j-1))*xi*P1-((CeedScalar)(j-1))*P0)/((CeedScalar)(j)); 292 P0 = P1; 293 P1 = P2; 294 } 295 dP2 = (xi*P2 - P0)*(CeedScalar)Q/(xi*xi-1.0); 296 xi = xi-P2/dP2; 297 } 298 // Save xi, wi 299 wi = 2.0/((1.0-xi*xi)*dP2*dP2); 300 qweight1d[i] = wi; 301 qweight1d[Q-1-i] = wi; 302 qref1d[i] = -xi; 303 qref1d[Q-1-i]= xi; 304 } 305 return 0; 306 } 307 308 /** 309 @brief Construct a Gauss-Legendre-Lobatto quadrature 310 311 @param Q Number of quadrature points (integrates polynomials of 312 degree 2*Q-3 exactly) 313 @param[out] qref1d Array of length Q to hold the abscissa on [-1, 1] 314 @param[out] qweight1d Array of length Q to hold the weights 315 316 @return An error code: 0 - success, otherwise - failure 317 318 @ref Utility 319 **/ 320 int CeedLobattoQuadrature(CeedInt Q, CeedScalar *qref1d, 321 CeedScalar *qweight1d) { 322 // Allocate 323 CeedScalar P0, P1, P2, dP2, d2P2, xi, wi, PI = 4.0*atan(1.0); 324 // Build qref1d, qweight1d 325 // Set endpoints 326 wi = 2.0/((CeedScalar)(Q*(Q-1))); 327 if (qweight1d) { 328 qweight1d[0] = wi; 329 qweight1d[Q-1] = wi; 330 } 331 qref1d[0] = -1.0; 332 qref1d[Q-1] = 1.0; 333 // Interior 334 for (int i = 1; i <= (Q-1)/2; i++) { 335 // Guess 336 xi = cos(PI*(CeedScalar)(i)/(CeedScalar)(Q-1)); 337 // Pn(xi) 338 P0 = 1.0; 339 P1 = xi; 340 P2 = 0.0; 341 for (int j = 2; j < Q; j++) { 342 P2 = (((CeedScalar)(2*j-1))*xi*P1-((CeedScalar)(j-1))*P0)/((CeedScalar)(j)); 343 P0 = P1; 344 P1 = P2; 345 } 346 // First Newton step 347 dP2 = (xi*P2 - P0)*(CeedScalar)Q/(xi*xi-1.0); 348 d2P2 = (2*xi*dP2 - (CeedScalar)(Q*(Q-1))*P2)/(1.0-xi*xi); 349 xi = xi-dP2/d2P2; 350 // Newton to convergence 351 for (int k=0; k<100 && fabs(dP2)>1e-15; k++) { 352 P0 = 1.0; 353 P1 = xi; 354 for (int j = 2; j < Q; j++) { 355 P2 = (((CeedScalar)(2*j-1))*xi*P1-((CeedScalar)(j-1))*P0)/((CeedScalar)(j)); 356 P0 = P1; 357 P1 = P2; 358 } 359 dP2 = (xi*P2 - P0)*(CeedScalar)Q/(xi*xi-1.0); 360 d2P2 = (2*xi*dP2 - (CeedScalar)(Q*(Q-1))*P2)/(1.0-xi*xi); 361 xi = xi-dP2/d2P2; 362 } 363 // Save xi, wi 364 wi = 2.0/(((CeedScalar)(Q*(Q-1)))*P2*P2); 365 if (qweight1d) { 366 qweight1d[i] = wi; 367 qweight1d[Q-1-i] = wi; 368 } 369 qref1d[i] = -xi; 370 qref1d[Q-1-i]= xi; 371 } 372 return 0; 373 } 374 375 /** 376 @brief View an array stored in a CeedBasis 377 378 @param name Name of array 379 @param fpformat Printing format 380 @param m Number of rows in array 381 @param n Number of columns in array 382 @param a Array to be viewed 383 @param stream Stream to view to, e.g., stdout 384 385 @return An error code: 0 - success, otherwise - failure 386 387 @ref Utility 388 **/ 389 static int CeedScalarView(const char *name, const char *fpformat, CeedInt m, 390 CeedInt n, const CeedScalar *a, FILE *stream) { 391 for (int i=0; i<m; i++) { 392 if (m > 1) 393 fprintf(stream, "%12s[%d]:", name, i); 394 else 395 fprintf(stream, "%12s:", name); 396 for (int j=0; j<n; j++) 397 fprintf(stream, fpformat, fabs(a[i*n+j]) > 1E-14 ? a[i*n+j] : 0); 398 fputs("\n", stream); 399 } 400 return 0; 401 } 402 403 /** 404 @brief View a CeedBasis 405 406 @param basis CeedBasis to view 407 @param stream Stream to view to, e.g., stdout 408 409 @return An error code: 0 - success, otherwise - failure 410 411 @ref Utility 412 **/ 413 int CeedBasisView(CeedBasis basis, FILE *stream) { 414 int ierr; 415 416 if (basis->tensorbasis) { 417 fprintf(stream, "CeedBasis: dim=%d P=%d Q=%d\n", basis->dim, basis->P1d, 418 basis->Q1d); 419 ierr = CeedScalarView("qref1d", "\t% 12.8f", 1, basis->Q1d, basis->qref1d, 420 stream); CeedChk(ierr); 421 ierr = CeedScalarView("qweight1d", "\t% 12.8f", 1, basis->Q1d, 422 basis->qweight1d, stream); CeedChk(ierr); 423 ierr = CeedScalarView("interp1d", "\t% 12.8f", basis->Q1d, basis->P1d, 424 basis->interp1d, stream); CeedChk(ierr); 425 ierr = CeedScalarView("grad1d", "\t% 12.8f", basis->Q1d, basis->P1d, 426 basis->grad1d, stream); CeedChk(ierr); 427 } else { 428 fprintf(stream, "CeedBasis: dim=%d P=%d Q=%d\n", basis->dim, basis->P, 429 basis->Q); 430 ierr = CeedScalarView("qref", "\t% 12.8f", 1, basis->Q*basis->dim, 431 basis->qref1d, 432 stream); CeedChk(ierr); 433 ierr = CeedScalarView("qweight", "\t% 12.8f", 1, basis->Q, basis->qweight1d, 434 stream); CeedChk(ierr); 435 ierr = CeedScalarView("interp", "\t% 12.8f", basis->Q, basis->P, 436 basis->interp1d, stream); CeedChk(ierr); 437 ierr = CeedScalarView("grad", "\t% 12.8f", basis->dim*basis->Q, basis->P, 438 basis->grad1d, stream); CeedChk(ierr); 439 } 440 return 0; 441 } 442 443 /** 444 @brief Compute Householder reflection 445 446 Computes A = (I - b v v^T) A 447 where A is an mxn matrix indexed as A[i*row + j*col] 448 449 @param[in,out] A Matrix to apply Householder reflection to, in place 450 @param v Householder vector 451 @param b Scaling factor 452 @param m Number of rows in A 453 @param n Number of columns in A 454 @param row Row stride 455 @param col Col stride 456 457 @return An error code: 0 - success, otherwise - failure 458 459 @ref Developer 460 **/ 461 static int CeedHouseholderReflect(CeedScalar *A, const CeedScalar *v, 462 CeedScalar b, CeedInt m, CeedInt n, 463 CeedInt row, CeedInt col) { 464 for (CeedInt j=0; j<n; j++) { 465 CeedScalar w = A[0*row + j*col]; 466 for (CeedInt i=1; i<m; i++) 467 w += v[i] * A[i*row + j*col]; 468 A[0*row + j*col] -= b * w; 469 for (CeedInt i=1; i<m; i++) 470 A[i*row + j*col] -= b * w * v[i]; 471 } 472 return 0; 473 } 474 475 /** 476 @brief Apply Householder Q matrix 477 478 Compute A = Q A where Q is mxm and A is mxn. 479 480 @param[in,out] A Matrix to apply Householder Q to, in place 481 @param Q Householder Q matrix 482 @param tau Householder scaling factors 483 @param tmode Transpose mode for application 484 @param m Number of rows in A 485 @param n Number of columns in A 486 @param k Number of elementary reflectors in Q, k<m 487 @param row Row stride in A 488 @param col Col stride in A 489 490 @return An error code: 0 - success, otherwise - failure 491 492 @ref Developer 493 **/ 494 static int CeedHouseholderApplyQ(CeedScalar *A, const CeedScalar *Q, 495 const CeedScalar *tau, CeedTransposeMode tmode, 496 CeedInt m, CeedInt n, CeedInt k, 497 CeedInt row, CeedInt col) { 498 CeedScalar v[m]; 499 for (CeedInt ii=0; ii<k; ii++) { 500 CeedInt i = tmode == CEED_TRANSPOSE ? ii : k-1-ii; 501 for (CeedInt j=i+1; j<m; j++) 502 v[j] = Q[j*k+i]; 503 // Apply Householder reflector (I - tau v v^T) colograd1d^T 504 CeedHouseholderReflect(&A[i*row], &v[i], tau[i], m-i, n, row, col); 505 } 506 return 0; 507 } 508 509 /** 510 @brief Compute Givens rotation 511 512 Computes A = G A (or G^T A in transpose mode) 513 where A is an mxn matrix indexed as A[i*n + j*m] 514 515 @param[in,out] A Row major matrix to apply Givens rotation to, in place 516 @param c Cosine factor 517 @param s Sine factor 518 @param i First row/column to apply rotation 519 @param k Second row/column to apply rotation 520 @param m Number of rows in A 521 @param n Number of columns in A 522 523 @return An error code: 0 - success, otherwise - failure 524 525 @ref Developer 526 **/ 527 static int CeedGivensRotation(CeedScalar *A, CeedScalar c, CeedScalar s, 528 CeedTransposeMode tmode, CeedInt i, CeedInt k, 529 CeedInt m, CeedInt n) { 530 CeedInt stridej = 1, strideik = m, numits = n; 531 if (tmode == CEED_NOTRANSPOSE) { 532 stridej = n; strideik = 1; numits = m; 533 } 534 535 // Apply rotation 536 for (CeedInt j=0; j<numits; j++) { 537 CeedScalar tau1 = A[i*strideik+j*stridej], tau2 = A[k*strideik+j*stridej]; 538 A[i*strideik+j*stridej] = c*tau1 - s*tau2; 539 A[k*strideik+j*stridej] = s*tau1 + c*tau2; 540 } 541 542 return 0; 543 } 544 545 /** 546 @brief Return QR Factorization of matrix 547 548 @param ceed A Ceed object currently in use 549 @param[in,out] mat Row-major matrix to be factorized in place 550 @param[in,out] tau Vector of length m of scaling factors 551 @param m Number of rows 552 @param n Number of columns 553 554 @return An error code: 0 - success, otherwise - failure 555 556 @ref Utility 557 **/ 558 int CeedQRFactorization(Ceed ceed, CeedScalar *mat, CeedScalar *tau, 559 CeedInt m, CeedInt n) { 560 CeedScalar v[m]; 561 562 // Check m >= n 563 if (n > m) 564 // LCOV_EXCL_START 565 return CeedError(ceed, 1, "Cannot compute QR factorization with n > m"); 566 // LCOV_EXCL_STOP 567 568 for (CeedInt i=0; i<n; i++) { 569 // Calculate Householder vector, magnitude 570 CeedScalar sigma = 0.0; 571 v[i] = mat[i+n*i]; 572 for (CeedInt j=i+1; j<m; j++) { 573 v[j] = mat[i+n*j]; 574 sigma += v[j] * v[j]; 575 } 576 CeedScalar norm = sqrt(v[i]*v[i] + sigma); // norm of v[i:m] 577 CeedScalar Rii = -copysign(norm, v[i]); 578 v[i] -= Rii; 579 // norm of v[i:m] after modification above and scaling below 580 // norm = sqrt(v[i]*v[i] + sigma) / v[i]; 581 // tau = 2 / (norm*norm) 582 tau[i] = 2 * v[i]*v[i] / (v[i]*v[i] + sigma); 583 for (CeedInt j=i+1; j<m; j++) 584 v[j] /= v[i]; 585 586 // Apply Householder reflector to lower right panel 587 CeedHouseholderReflect(&mat[i*n+i+1], &v[i], tau[i], m-i, n-i-1, n, 1); 588 // Save v 589 mat[i+n*i] = Rii; 590 for (CeedInt j=i+1; j<m; j++) 591 mat[i+n*j] = v[j]; 592 } 593 594 return 0; 595 } 596 597 /** 598 @brief Return symmetric Schur decomposition of the symmetric matrix mat via 599 symmetric QR factorization 600 601 @param ceed A Ceed object for error handling 602 @param[in,out] mat Row-major matrix to be factorized in place 603 @param[out] lambda Vector of length m of eigenvalues 604 @param n Number of rows/columns 605 606 @return An error code: 0 - success, otherwise - failure 607 608 @ref Utility 609 **/ 610 int CeedSymmetricSchurDecomposition(Ceed ceed, CeedScalar *mat, 611 CeedScalar *lambda, CeedInt n) { 612 // Check bounds for clang-tidy 613 if (n<2) 614 // LCOV_EXCL_START 615 return CeedError(ceed, 1, 616 "Cannot compute symmetric Schur decomposition of scalars"); 617 // LCOV_EXCL_STOP 618 619 CeedScalar v[n-1], tau[n-1], matT[n*n]; 620 621 // Copy mat to matT and set mat to I 622 memcpy(matT, mat, n*n*sizeof(mat[0])); 623 for (CeedInt i=0; i<n; i++) 624 for (CeedInt j=0; j<n; j++) 625 mat[j+n*i] = (i==j) ? 1 : 0; 626 627 // Reduce to tridiagonal 628 for (CeedInt i=0; i<n-1; i++) { 629 // Calculate Householder vector, magnitude 630 CeedScalar sigma = 0.0; 631 v[i] = matT[i+n*(i+1)]; 632 for (CeedInt j=i+1; j<n-1; j++) { 633 v[j] = matT[i+n*(j+1)]; 634 sigma += v[j] * v[j]; 635 } 636 CeedScalar norm = sqrt(v[i]*v[i] + sigma); // norm of v[i:n-1] 637 CeedScalar Rii = -copysign(norm, v[i]); 638 v[i] -= Rii; 639 // norm of v[i:m] after modification above and scaling below 640 // norm = sqrt(v[i]*v[i] + sigma) / v[i]; 641 // tau = 2 / (norm*norm) 642 tau[i] = 2 * v[i]*v[i] / (v[i]*v[i] + sigma); 643 for (CeedInt j=i+1; j<n-1; j++) v[j] /= v[i]; 644 645 // Update sub and super diagonal 646 matT[i+n*(i+1)] = Rii; 647 matT[(i+1)+n*i] = Rii; 648 for (CeedInt j=i+2; j<n; j++) { 649 matT[i+n*j] = 0; matT[j+n*i] = 0; 650 } 651 // Apply symmetric Householder reflector to lower right panel 652 CeedHouseholderReflect(&matT[(i+1)+n*(i+1)], &v[i], tau[i], 653 n-(i+1), n-(i+1), n, 1); 654 CeedHouseholderReflect(&matT[(i+1)+n*(i+1)], &v[i], tau[i], 655 n-(i+1), n-(i+1), 1, n); 656 // Save v 657 for (CeedInt j=i+1; j<n-1; j++) { 658 matT[i+n*(j+1)] = v[j]; 659 } 660 } 661 // Backwards accumulation of Q 662 for (CeedInt i=n-2; i>=0; i--) { 663 v[i] = 1; 664 for (CeedInt j=i+1; j<n-1; j++) { 665 v[j] = matT[i+n*(j+1)]; 666 matT[i+n*(j+1)] = 0; 667 } 668 CeedHouseholderReflect(&mat[(i+1)+n*(i+1)], &v[i], tau[i], 669 n-(i+1), n-(i+1), n, 1); 670 } 671 672 // Reduce sub and super diagonal 673 CeedInt p = 0, q = 0, itr = 0, maxitr = n*n*n; 674 CeedScalar tol = 1e-15; 675 676 while (q < n && itr < maxitr) { 677 // Update p, q, size of reduced portions of diagonal 678 p = 0; q = 0; 679 for (CeedInt i=n-2; i>=0; i--) { 680 if (fabs(matT[i+n*(i+1)]) < tol) 681 q += 1; 682 else 683 break; 684 } 685 for (CeedInt i=0; i<n-1-q; i++) { 686 if (fabs(matT[i+n*(i+1)]) < tol) 687 p += 1; 688 else 689 break; 690 } 691 if (q == n-1) break; // Finished reducing 692 693 // Reduce tridiagonal portion 694 CeedScalar tnn = matT[(n-1-q)+n*(n-1-q)], 695 tnnm1 = matT[(n-2-q)+n*(n-1-q)]; 696 CeedScalar d = (matT[(n-2-q)+n*(n-2-q)] - tnn)/2; 697 CeedScalar mu = tnn - tnnm1*tnnm1 / 698 (d + copysign(sqrt(d*d + tnnm1*tnnm1), d)); 699 CeedScalar x = matT[p+n*p] - mu; 700 CeedScalar z = matT[p+n*(p+1)]; 701 for (CeedInt k=p; k<n-1-q; k++) { 702 // Compute Givens rotation 703 CeedScalar c = 1, s = 0; 704 if (fabs(z) > tol) { 705 if (fabs(z) > fabs(x)) { 706 CeedScalar tau = -x/z; 707 s = 1/sqrt(1+tau*tau), c = s*tau; 708 } else { 709 CeedScalar tau = -z/x; 710 c = 1/sqrt(1+tau*tau), s = c*tau; 711 } 712 } 713 714 // Apply Givens rotation to T 715 CeedGivensRotation(matT, c, s, CEED_NOTRANSPOSE, k, k+1, n, n); 716 CeedGivensRotation(matT, c, s, CEED_TRANSPOSE, k, k+1, n, n); 717 718 // Apply Givens rotation to Q 719 CeedGivensRotation(mat, c, s, CEED_NOTRANSPOSE, k, k+1, n, n); 720 721 // Update x, z 722 if (k < n-q-2) { 723 x = matT[k+n*(k+1)]; 724 z = matT[k+n*(k+2)]; 725 } 726 } 727 itr++; 728 } 729 // Save eigenvalues 730 for (CeedInt i=0; i<n; i++) 731 lambda[i] = matT[i+n*i]; 732 733 // Check convergence 734 if (itr == maxitr && q < n-1) 735 // LCOV_EXCL_START 736 return CeedError(ceed, 1, "Symmetric QR failed to converge"); 737 // LCOV_EXCL_STOP 738 739 return 0; 740 } 741 742 /** 743 @brief Return C = A B 744 745 @param[in] matA Row-major matrix A 746 @param[in] matB Row-major matrix B 747 @param[out] matC Row-major output matrix C 748 @param m Number of rows of C 749 @param n Number of columns of C 750 @param kk Number of columns of A/rows of B 751 752 @return An error code: 0 - success, otherwise - failure 753 754 @ref Utility 755 **/ 756 static int CeedMatrixMultiply(Ceed ceed, CeedScalar *matA, CeedScalar *matB, 757 CeedScalar *matC, CeedInt m, CeedInt n, 758 CeedInt kk) { 759 for (CeedInt i=0; i<m; i++) 760 for (CeedInt j=0; j<n; j++) { 761 CeedScalar sum = 0; 762 for (CeedInt k=0; k<kk; k++) 763 sum += matA[k+i*kk]*matB[j+k*n]; 764 matC[j+i*n] = sum; 765 } 766 return 0; 767 } 768 769 /** 770 @brief Return Simultaneous Diagonalization of two matrices. This solves the 771 generalized eigenvalue problem A x = lambda B x, where A and B 772 are symmetric and B is positive definite. We generate the matrix X 773 and vector Lambda such that X^T A X = Lambda and X^T B X = I. This 774 is equivalent to the LAPACK routine 'sygv' with TYPE = 1. 775 776 @param ceed A Ceed object for error handling 777 @param[in] matA Row-major matrix to be factorized with eigenvalues 778 @param[in] matB Row-major matrix to be factorized to identity 779 @param[out] x Row-major orthogonal matrix 780 @param[out] lambda Vector of length m of generalized eigenvalues 781 @param n Number of rows/columns 782 783 @return An error code: 0 - success, otherwise - failure 784 785 @ref Utility 786 **/ 787 int CeedSimultaneousDiagonalization(Ceed ceed, CeedScalar *matA, 788 CeedScalar *matB, CeedScalar *x, 789 CeedScalar *lambda, CeedInt n) { 790 int ierr; 791 CeedScalar matC[n*n], matG[n*n], vecD[n]; 792 793 // Compute B = G D G^T 794 memcpy(matG, matB, n*n*sizeof(matB[0])); 795 ierr = CeedSymmetricSchurDecomposition(ceed, matG, vecD, n); CeedChk(ierr); 796 for (CeedInt i=0; i<n; i++) vecD[i] = sqrt(vecD[i]); 797 798 // Compute C = (G D^-1/2)^-1 A (G D^-1/2)^-T 799 // = D^1/2 G^T A D^1/2 G 800 for (CeedInt i=0; i<n; i++) 801 for (CeedInt j=0; j<n; j++) 802 matC[j+i*n] = vecD[i] * matG[i+j*n]; 803 CeedMatrixMultiply(ceed, matC, matA, x, n, n, n); 804 for (CeedInt i=0; i<n; i++) 805 for (CeedInt j=0; j<n; j++) 806 matG[j+i*n] = vecD[i] * matG[j+i*n]; 807 CeedMatrixMultiply(ceed, x, matG, matC, n, n, n); 808 809 // Compute Q^T C Q = lambda 810 ierr = CeedSymmetricSchurDecomposition(ceed, matC, lambda, n); CeedChk(ierr); 811 812 // Set x = (G D^-1/2)^-T Q 813 // = D^1/2 G Q 814 CeedMatrixMultiply(ceed, matG, matC, x, n, n, n); 815 816 return 0; 817 } 818 819 /** 820 @brief Return collocated grad matrix 821 822 @param basis CeedBasis 823 @param[out] colograd1d Row-major Q1d × Q1d matrix expressing derivatives of 824 basis functions at quadrature points 825 826 @return An error code: 0 - success, otherwise - failure 827 828 @ref Advanced 829 **/ 830 int CeedBasisGetCollocatedGrad(CeedBasis basis, CeedScalar *colograd1d) { 831 int i, j, k; 832 Ceed ceed; 833 CeedInt ierr, P1d=(basis)->P1d, Q1d=(basis)->Q1d; 834 CeedScalar *interp1d, *grad1d, tau[Q1d]; 835 836 ierr = CeedMalloc(Q1d*P1d, &interp1d); CeedChk(ierr); 837 ierr = CeedMalloc(Q1d*P1d, &grad1d); CeedChk(ierr); 838 memcpy(interp1d, (basis)->interp1d, Q1d*P1d*sizeof(basis)->interp1d[0]); 839 memcpy(grad1d, (basis)->grad1d, Q1d*P1d*sizeof(basis)->interp1d[0]); 840 841 // QR Factorization, interp1d = Q R 842 ierr = CeedBasisGetCeed(basis, &ceed); CeedChk(ierr); 843 ierr = CeedQRFactorization(ceed, interp1d, tau, Q1d, P1d); CeedChk(ierr); 844 845 // Apply Rinv, colograd1d = grad1d Rinv 846 for (i=0; i<Q1d; i++) { // Row i 847 colograd1d[Q1d*i] = grad1d[P1d*i]/interp1d[0]; 848 for (j=1; j<P1d; j++) { // Column j 849 colograd1d[j+Q1d*i] = grad1d[j+P1d*i]; 850 for (k=0; k<j; k++) 851 colograd1d[j+Q1d*i] -= interp1d[j+P1d*k]*colograd1d[k+Q1d*i]; 852 colograd1d[j+Q1d*i] /= interp1d[j+P1d*j]; 853 } 854 for (j=P1d; j<Q1d; j++) 855 colograd1d[j+Q1d*i] = 0; 856 } 857 858 // Apply Qtranspose, colograd = colograd Qtranspose 859 CeedHouseholderApplyQ(colograd1d, interp1d, tau, CEED_NOTRANSPOSE, 860 Q1d, Q1d, P1d, 1, Q1d); 861 862 ierr = CeedFree(&interp1d); CeedChk(ierr); 863 ierr = CeedFree(&grad1d); CeedChk(ierr); 864 865 return 0; 866 } 867 868 /** 869 @brief Apply basis evaluation from nodes to quadrature points or vice-versa 870 871 @param basis CeedBasis to evaluate 872 @param nelem The number of elements to apply the basis evaluation to; 873 the backend will specify the ordering in 874 ElemRestrictionCreateBlocked 875 @param tmode \ref CEED_NOTRANSPOSE to evaluate from nodes to quadrature 876 points, \ref CEED_TRANSPOSE to apply the transpose, mapping 877 from quadrature points to nodes 878 @param emode \ref CEED_EVAL_INTERP to obtain interpolated values, 879 \ref CEED_EVAL_GRAD to obtain gradients. 880 @param[in] u Input array 881 @param[out] v Output array 882 883 @return An error code: 0 - success, otherwise - failure 884 885 @ref Advanced 886 **/ 887 int CeedBasisApply(CeedBasis basis, CeedInt nelem, CeedTransposeMode tmode, 888 CeedEvalMode emode, CeedVector u, CeedVector v) { 889 int ierr; 890 CeedInt ulength = 0, vlength, nnodes, nqpt; 891 if (!basis->Apply) 892 // LCOV_EXCL_START 893 return CeedError(basis->ceed, 1, "Backend does not support BasisApply"); 894 // LCOV_EXCL_STOP 895 896 // Check compatibility of topological and geometrical dimensions 897 ierr = CeedBasisGetNumNodes(basis, &nnodes); CeedChk(ierr); 898 ierr = CeedBasisGetNumQuadraturePoints(basis, &nqpt); CeedChk(ierr); 899 ierr = CeedVectorGetLength(v, &vlength); CeedChk(ierr); 900 901 if (u) { 902 ierr = CeedVectorGetLength(u, &ulength); CeedChk(ierr); 903 } 904 905 if ((tmode == CEED_TRANSPOSE && (vlength%nnodes != 0 || ulength%nqpt != 0)) || 906 (tmode == CEED_NOTRANSPOSE && (ulength%nnodes != 0 || vlength%nqpt != 0))) 907 return CeedError(basis->ceed, 1, "Length of input/output vectors " 908 "incompatible with basis dimensions"); 909 910 ierr = basis->Apply(basis, nelem, tmode, emode, u, v); CeedChk(ierr); 911 return 0; 912 } 913 914 /** 915 @brief Get Ceed associated with a CeedBasis 916 917 @param basis CeedBasis 918 @param[out] ceed Variable to store Ceed 919 920 @return An error code: 0 - success, otherwise - failure 921 922 @ref Advanced 923 **/ 924 int CeedBasisGetCeed(CeedBasis basis, Ceed *ceed) { 925 *ceed = basis->ceed; 926 return 0; 927 }; 928 929 /** 930 @brief Get dimension for given CeedBasis 931 932 @param basis CeedBasis 933 @param[out] dim Variable to store dimension of basis 934 935 @return An error code: 0 - success, otherwise - failure 936 937 @ref Advanced 938 **/ 939 int CeedBasisGetDimension(CeedBasis basis, CeedInt *dim) { 940 *dim = basis->dim; 941 return 0; 942 }; 943 944 /** 945 @brief Get tensor status for given CeedBasis 946 947 @param basis CeedBasis 948 @param[out] tensor Variable to store tensor status 949 950 @return An error code: 0 - success, otherwise - failure 951 952 @ref Advanced 953 **/ 954 int CeedBasisGetTensorStatus(CeedBasis basis, bool *tensor) { 955 *tensor = basis->tensorbasis; 956 return 0; 957 }; 958 959 /** 960 @brief Get number of components for given CeedBasis 961 962 @param basis CeedBasis 963 @param[out] numcomp Variable to store number of components of basis 964 965 @return An error code: 0 - success, otherwise - failure 966 967 @ref Advanced 968 **/ 969 int CeedBasisGetNumComponents(CeedBasis basis, CeedInt *numcomp) { 970 *numcomp = basis->ncomp; 971 return 0; 972 }; 973 974 /** 975 @brief Get total number of nodes (in 1 dimension) of a CeedBasis 976 977 @param basis CeedBasis 978 @param[out] P1d Variable to store number of nodes 979 980 @return An error code: 0 - success, otherwise - failure 981 982 @ref Advanced 983 **/ 984 int CeedBasisGetNumNodes1D(CeedBasis basis, CeedInt *P1d) { 985 if (!basis->tensorbasis) 986 // LCOV_EXCL_START 987 return CeedError(basis->ceed, 1, "Cannot supply P1d for non-tensor basis"); 988 // LCOV_EXCL_STOP 989 990 *P1d = basis->P1d; 991 return 0; 992 } 993 994 /** 995 @brief Get total number of quadrature points (in 1 dimension) of a CeedBasis 996 997 @param basis CeedBasis 998 @param[out] Q1d Variable to store number of quadrature points 999 1000 @return An error code: 0 - success, otherwise - failure 1001 1002 @ref Advanced 1003 **/ 1004 int CeedBasisGetNumQuadraturePoints1D(CeedBasis basis, CeedInt *Q1d) { 1005 if (!basis->tensorbasis) 1006 // LCOV_EXCL_START 1007 return CeedError(basis->ceed, 1, "Cannot supply Q1d for non-tensor basis"); 1008 // LCOV_EXCL_STOP 1009 1010 *Q1d = basis->Q1d; 1011 return 0; 1012 } 1013 1014 /** 1015 @brief Get total number of nodes (in dim dimensions) of a CeedBasis 1016 1017 @param basis CeedBasis 1018 @param[out] P Variable to store number of nodes 1019 1020 @return An error code: 0 - success, otherwise - failure 1021 1022 @ref Utility 1023 **/ 1024 int CeedBasisGetNumNodes(CeedBasis basis, CeedInt *P) { 1025 *P = basis->P; 1026 return 0; 1027 } 1028 1029 /** 1030 @brief Get total number of quadrature points (in dim dimensions) of a CeedBasis 1031 1032 @param basis CeedBasis 1033 @param[out] Q Variable to store number of quadrature points 1034 1035 @return An error code: 0 - success, otherwise - failure 1036 1037 @ref Utility 1038 **/ 1039 int CeedBasisGetNumQuadraturePoints(CeedBasis basis, CeedInt *Q) { 1040 *Q = basis->Q; 1041 return 0; 1042 } 1043 1044 /** 1045 @brief Get reference coordinates of quadrature points (in dim dimensions) 1046 of a CeedBasis 1047 1048 @param basis CeedBasis 1049 @param[out] qref Variable to store reference coordinates of quadrature points 1050 1051 @return An error code: 0 - success, otherwise - failure 1052 1053 @ref Advanced 1054 **/ 1055 int CeedBasisGetQRef(CeedBasis basis, CeedScalar **qref) { 1056 *qref = basis->qref1d; 1057 return 0; 1058 } 1059 1060 /** 1061 @brief Get quadrature weights of quadrature points (in dim dimensions) 1062 of a CeedBasis 1063 1064 @param basis CeedBasis 1065 @param[out] qweight Variable to store quadrature weights 1066 1067 @return An error code: 0 - success, otherwise - failure 1068 1069 @ref Advanced 1070 **/ 1071 int CeedBasisGetQWeights(CeedBasis basis, CeedScalar **qweight) { 1072 *qweight = basis->qweight1d; 1073 return 0; 1074 } 1075 1076 /** 1077 @brief Get interpolation matrix of a CeedBasis 1078 1079 @param basis CeedBasis 1080 @param[out] interp Variable to store interpolation matrix 1081 1082 @return An error code: 0 - success, otherwise - failure 1083 1084 @ref Advanced 1085 **/ 1086 int CeedBasisGetInterp(CeedBasis basis, CeedScalar **interp) { 1087 *interp = basis->interp1d; 1088 return 0; 1089 } 1090 1091 /** 1092 @brief Get gradient matrix of a CeedBasis 1093 1094 @param basis CeedBasis 1095 @param[out] grad Variable to store gradient matrix 1096 1097 @return An error code: 0 - success, otherwise - failure 1098 1099 @ref Advanced 1100 **/ 1101 int CeedBasisGetGrad(CeedBasis basis, CeedScalar **grad) { 1102 *grad = basis->grad1d; 1103 return 0; 1104 } 1105 1106 /** 1107 @brief Get value in CeedEvalMode matrix of a CeedBasis 1108 1109 @param basis CeedBasis @param[in] emode CeedEvalMode to retrieve value 1110 @param[in] node Node (column) to retrieve value 1111 @param[in] qpt Quadrature point (row) to retrieve value 1112 @param[in] dim Dimension to retrieve value for, for CEED_EVAL_GRAD 1113 @param[out] value Variable to store value 1114 1115 @return An error code: 0 - success, otherwise - failure 1116 1117 @ref Advanced 1118 **/ 1119 int CeedBasisGetValue(CeedBasis basis, CeedEvalMode emode, CeedInt qpt, 1120 CeedInt node, CeedInt dim, CeedScalar *value) { 1121 bool tensor = basis->tensorbasis; 1122 1123 switch (emode) { 1124 case CEED_EVAL_NONE: 1125 if (node == qpt) 1126 *value = 0.0; 1127 else 1128 *value = 1.0; 1129 break; 1130 case CEED_EVAL_INTERP: { 1131 CeedScalar *interp = basis->interp1d; 1132 1133 if (tensor) { 1134 CeedInt n, q; 1135 1136 *value = 1.0; 1137 for (CeedInt d=0; d<basis->dim; d++) { 1138 n = (node / CeedIntPow(basis->P1d, d)) % basis->P1d; 1139 q = (qpt / CeedIntPow(basis->Q1d, d)) % basis->Q1d; 1140 *value *= interp[q*(basis->P1d)+n]; 1141 } 1142 } else { 1143 *value = interp[qpt*(basis->P)+node]; 1144 } 1145 } break; 1146 case CEED_EVAL_GRAD: { 1147 CeedScalar *grad = basis->grad1d; 1148 1149 if (tensor) { 1150 CeedInt n, q; 1151 CeedScalar *interp = basis->interp1d; 1152 1153 *value = 1.0; 1154 for (CeedInt d=0; d<basis->dim; d++) { 1155 n = (node / CeedIntPow(basis->P1d, d)) % basis->P1d; 1156 q = (qpt / CeedIntPow(basis->Q1d, d)) % basis->Q1d; 1157 if (d == dim) 1158 *value *= grad[q*(basis->P1d)+n]; 1159 else 1160 *value *= interp[q*(basis->P1d)+n]; 1161 } 1162 } else { 1163 *value = grad[(dim*(basis->Q)+qpt)*(basis->P)+node]; 1164 } 1165 } break; 1166 case CEED_EVAL_WEIGHT: 1167 // LCOV_EXCL_START 1168 return CeedError(basis->ceed, 1, "CEED_EVAL_WEIGHT does not make sense in " 1169 "this context"); 1170 // LCOV_EXCL_STOP 1171 case CEED_EVAL_DIV: 1172 // LCOV_EXCL_START 1173 return CeedError(basis->ceed, 1, "CEED_EVAL_DIV not supported"); 1174 // LCOV_EXCL_STOP 1175 case CEED_EVAL_CURL: 1176 // LCOV_EXCL_START 1177 return CeedError(basis->ceed, 1, "CEED_EVAL_CURL not supported"); 1178 // LCOV_EXCL_STOP 1179 } 1180 return 0; 1181 } 1182 1183 /** 1184 @brief Get backend data of a CeedBasis 1185 1186 @param basis CeedBasis 1187 @param[out] data Variable to store data 1188 1189 @return An error code: 0 - success, otherwise - failure 1190 1191 @ref Advanced 1192 **/ 1193 int CeedBasisGetData(CeedBasis basis, void **data) { 1194 *data = basis->data; 1195 return 0; 1196 } 1197 1198 /** 1199 @brief Set backend data of a CeedBasis 1200 1201 @param[out] basis CeedBasis 1202 @param data Data to set 1203 1204 @return An error code: 0 - success, otherwise - failure 1205 1206 @ref Advanced 1207 **/ 1208 int CeedBasisSetData(CeedBasis basis, void **data) { 1209 basis->data = *data; 1210 return 0; 1211 } 1212 1213 /** 1214 @brief Get CeedTensorContract of a CeedBasis 1215 1216 @param basis CeedBasis 1217 @param[out] contract Variable to store CeedTensorContract 1218 1219 @return An error code: 0 - success, otherwise - failure 1220 1221 @ref Advanced 1222 **/ 1223 int CeedBasisGetTensorContract(CeedBasis basis, CeedTensorContract *contract) { 1224 *contract = basis->contract; 1225 return 0; 1226 } 1227 1228 /** 1229 @brief Set CeedTensorContract of a CeedBasis 1230 1231 @param[out] basis CeedBasis 1232 @param contract CeedTensorContract to set 1233 1234 @return An error code: 0 - success, otherwise - failure 1235 1236 @ref Advanced 1237 **/ 1238 int CeedBasisSetTensorContract(CeedBasis basis, CeedTensorContract *contract) { 1239 basis->contract = *contract; 1240 return 0; 1241 } 1242 1243 /** 1244 @brief Get dimension for given CeedElemTopology 1245 1246 @param topo CeedElemTopology 1247 @param[out] dim Variable to store dimension of topology 1248 1249 @return An error code: 0 - success, otherwise - failure 1250 1251 @ref Advanced 1252 **/ 1253 int CeedBasisGetTopologyDimension(CeedElemTopology topo, CeedInt *dim) { 1254 *dim = (CeedInt) topo >> 16; 1255 return 0; 1256 }; 1257 1258 /** 1259 @brief Destroy a CeedBasis 1260 1261 @param basis CeedBasis to destroy 1262 1263 @return An error code: 0 - success, otherwise - failure 1264 1265 @ref Basic 1266 **/ 1267 int CeedBasisDestroy(CeedBasis *basis) { 1268 int ierr; 1269 1270 if (!*basis || --(*basis)->refcount > 0) 1271 return 0; 1272 if ((*basis)->Destroy) { 1273 ierr = (*basis)->Destroy(*basis); CeedChk(ierr); 1274 } 1275 ierr = CeedFree(&(*basis)->interp1d); CeedChk(ierr); 1276 ierr = CeedFree(&(*basis)->grad1d); CeedChk(ierr); 1277 ierr = CeedFree(&(*basis)->qref1d); CeedChk(ierr); 1278 ierr = CeedFree(&(*basis)->qweight1d); CeedChk(ierr); 1279 ierr = CeedDestroy(&(*basis)->ceed); CeedChk(ierr); 1280 ierr = CeedFree(basis); CeedChk(ierr); 1281 return 0; 1282 } 1283 1284 /// @cond DOXYGEN_SKIP 1285 // Indicate that the quadrature points are collocated with the nodes 1286 CeedBasis CEED_BASIS_COLLOCATED = &ceed_basis_collocated; 1287 /// @endcond 1288 /// @} 1289