1 2 #include <petsc/private/tsimpl.h> /*I "petscts.h" I*/ 3 #include <petscdm.h> 4 5 static const PetscInt TSEIMEXDefault = 3; 6 7 typedef struct { 8 PetscInt row_ind; /* Return the term T[row_ind][col_ind] */ 9 PetscInt col_ind; /* Return the term T[row_ind][col_ind] */ 10 PetscInt nstages; /* Numbers of stages in current scheme */ 11 PetscInt max_rows; /* Maximum number of rows */ 12 PetscInt *N; /* Harmonic sequence N[max_rows] */ 13 Vec Y; /* States computed during the step, used to complete the step */ 14 Vec Z; /* For shift*(Y-Z) */ 15 Vec *T; /* Working table, size determined by nstages */ 16 Vec YdotRHS; /* f(x) Work vector holding YdotRHS during residual evaluation */ 17 Vec YdotI; /* xdot-g(x) Work vector holding YdotI = G(t,x,xdot) when xdot =0 */ 18 Vec Ydot; /* f(x)+g(x) Work vector */ 19 Vec VecSolPrev; /* Work vector holding the solution from the previous step (used for interpolation) */ 20 PetscReal shift; 21 PetscReal ctime; 22 PetscBool recompute_jacobian; /* Recompute the Jacobian at each stage, default is to freeze the Jacobian at the start of each step */ 23 PetscBool ord_adapt; /* order adapativity */ 24 TSStepStatus status; 25 } TS_EIMEX; 26 27 /* This function is pure */ 28 static PetscInt Map(PetscInt i, PetscInt j, PetscInt s) 29 { 30 return ((2*s-j+1)*j/2+i-j); 31 } 32 33 static PetscErrorCode TSEvaluateStep_EIMEX(TS ts,PetscInt order,Vec X,PetscBool *done) 34 { 35 TS_EIMEX *ext = (TS_EIMEX*)ts->data; 36 const PetscInt ns = ext->nstages; 37 PetscFunctionBegin; 38 PetscCall(VecCopy(ext->T[Map(ext->row_ind,ext->col_ind,ns)],X)); 39 PetscFunctionReturn(0); 40 } 41 42 static PetscErrorCode TSStage_EIMEX(TS ts,PetscInt istage) 43 { 44 TS_EIMEX *ext = (TS_EIMEX*)ts->data; 45 PetscReal h; 46 Vec Y=ext->Y, Z=ext->Z; 47 SNES snes; 48 TSAdapt adapt; 49 PetscInt i,its,lits; 50 PetscBool accept; 51 52 PetscFunctionBegin; 53 PetscCall(TSGetSNES(ts,&snes)); 54 h = ts->time_step/ext->N[istage];/* step size for the istage-th stage */ 55 ext->shift = 1./h; 56 PetscCall(SNESSetLagJacobian(snes,-2)); /* Recompute the Jacobian on this solve, but not again */ 57 PetscCall(VecCopy(ext->VecSolPrev,Y)); /* Take the previous solution as initial step */ 58 59 for (i=0; i<ext->N[istage]; i++) { 60 ext->ctime = ts->ptime + h*i; 61 PetscCall(VecCopy(Y,Z));/* Save the solution of the previous substep */ 62 PetscCall(SNESSolve(snes,NULL,Y)); 63 PetscCall(SNESGetIterationNumber(snes,&its)); 64 PetscCall(SNESGetLinearSolveIterations(snes,&lits)); 65 ts->snes_its += its; ts->ksp_its += lits; 66 PetscCall(TSGetAdapt(ts,&adapt)); 67 PetscCall(TSAdaptCheckStage(adapt,ts,ext->ctime,Y,&accept)); 68 } 69 PetscFunctionReturn(0); 70 } 71 72 static PetscErrorCode TSStep_EIMEX(TS ts) 73 { 74 TS_EIMEX *ext = (TS_EIMEX*)ts->data; 75 const PetscInt ns = ext->nstages; 76 Vec *T=ext->T, Y=ext->Y; 77 78 SNES snes; 79 PetscInt i,j; 80 PetscBool accept = PETSC_FALSE; 81 PetscErrorCode ierr; 82 PetscReal alpha,local_error,local_error_a,local_error_r; 83 PetscFunctionBegin; 84 85 PetscCall(TSGetSNES(ts,&snes)); 86 PetscCall(SNESSetType(snes,"ksponly")); 87 ext->status = TS_STEP_INCOMPLETE; 88 89 PetscCall(VecCopy(ts->vec_sol,ext->VecSolPrev)); 90 91 /* Apply n_j steps of the base method to obtain solutions of T(j,1),1<=j<=s */ 92 for (j=0; j<ns; j++) { 93 PetscCall(TSStage_EIMEX(ts,j)); 94 PetscCall(VecCopy(Y,T[j])); 95 } 96 97 for (i=1;i<ns;i++) { 98 for (j=i;j<ns;j++) { 99 alpha = -(PetscReal)ext->N[j]/ext->N[j-i]; 100 ierr = VecAXPBYPCZ(T[Map(j,i,ns)],alpha,1.0,0,T[Map(j,i-1,ns)],T[Map(j-1,i-1,ns)]);/* T[j][i]=alpha*T[j][i-1]+T[j-1][i-1] */PetscCall(ierr); 101 alpha = 1.0/(1.0 + alpha); 102 PetscCall(VecScale(T[Map(j,i,ns)],alpha)); 103 } 104 } 105 106 PetscCall(TSEvaluateStep(ts,ns,ts->vec_sol,NULL));/*update ts solution */ 107 108 if (ext->ord_adapt && ext->nstages < ext->max_rows) { 109 accept = PETSC_FALSE; 110 while (!accept && ext->nstages < ext->max_rows) { 111 PetscCall(TSErrorWeightedNorm(ts,ts->vec_sol,T[Map(ext->nstages-1,ext->nstages-2,ext->nstages)],ts->adapt->wnormtype,&local_error,&local_error_a,&local_error_r)); 112 accept = (local_error < 1.0)? PETSC_TRUE : PETSC_FALSE; 113 114 if (!accept) {/* add one more stage*/ 115 PetscCall(TSStage_EIMEX(ts,ext->nstages)); 116 ext->nstages++; ext->row_ind++; ext->col_ind++; 117 /*T table need to be recycled*/ 118 PetscCall(VecDuplicateVecs(ts->vec_sol,(1+ext->nstages)*ext->nstages/2,&ext->T)); 119 for (i=0; i<ext->nstages-1; i++) { 120 for (j=0; j<=i; j++) { 121 PetscCall(VecCopy(T[Map(i,j,ext->nstages-1)],ext->T[Map(i,j,ext->nstages)])); 122 } 123 } 124 PetscCall(VecDestroyVecs(ext->nstages*(ext->nstages-1)/2,&T)); 125 T = ext->T; /*reset the pointer*/ 126 /*recycling finished, store the new solution*/ 127 PetscCall(VecCopy(Y,T[ext->nstages-1])); 128 /*extrapolation for the newly added stage*/ 129 for (i=1;i<ext->nstages;i++) { 130 alpha = -(PetscReal)ext->N[ext->nstages-1]/ext->N[ext->nstages-1-i]; 131 ierr = VecAXPBYPCZ(T[Map(ext->nstages-1,i,ext->nstages)],alpha,1.0,0,T[Map(ext->nstages-1,i-1,ext->nstages)],T[Map(ext->nstages-1-1,i-1,ext->nstages)]);/*T[ext->nstages-1][i]=alpha*T[ext->nstages-1][i-1]+T[ext->nstages-1-1][i-1]*/PetscCall(ierr); 132 alpha = 1.0/(1.0 + alpha); 133 PetscCall(VecScale(T[Map(ext->nstages-1,i,ext->nstages)],alpha)); 134 } 135 /*update ts solution */ 136 PetscCall(TSEvaluateStep(ts,ext->nstages,ts->vec_sol,NULL)); 137 }/*end if !accept*/ 138 }/*end while*/ 139 140 if (ext->nstages == ext->max_rows) { 141 PetscCall(PetscInfo(ts,"Max number of rows has been used\n")); 142 } 143 }/*end if ext->ord_adapt*/ 144 ts->ptime += ts->time_step; 145 ext->status = TS_STEP_COMPLETE; 146 147 if (ext->status != TS_STEP_COMPLETE && !ts->reason) ts->reason = TS_DIVERGED_STEP_REJECTED; 148 PetscFunctionReturn(0); 149 } 150 151 /* cubic Hermit spline */ 152 static PetscErrorCode TSInterpolate_EIMEX(TS ts,PetscReal itime,Vec X) 153 { 154 TS_EIMEX *ext = (TS_EIMEX*)ts->data; 155 PetscReal t,a,b; 156 Vec Y0=ext->VecSolPrev,Y1=ext->Y,Ydot=ext->Ydot,YdotI=ext->YdotI; 157 const PetscReal h = ts->ptime - ts->ptime_prev; 158 PetscFunctionBegin; 159 t = (itime -ts->ptime + h)/h; 160 /* YdotI = -f(x)-g(x) */ 161 162 PetscCall(VecZeroEntries(Ydot)); 163 PetscCall(TSComputeIFunction(ts,ts->ptime-h,Y0,Ydot,YdotI,PETSC_FALSE)); 164 165 a = 2.0*t*t*t - 3.0*t*t + 1.0; 166 b = -(t*t*t - 2.0*t*t + t)*h; 167 PetscCall(VecAXPBYPCZ(X,a,b,0.0,Y0,YdotI)); 168 169 PetscCall(TSComputeIFunction(ts,ts->ptime,Y1,Ydot,YdotI,PETSC_FALSE)); 170 a = -2.0*t*t*t+3.0*t*t; 171 b = -(t*t*t - t*t)*h; 172 PetscCall(VecAXPBYPCZ(X,a,b,1.0,Y1,YdotI)); 173 174 PetscFunctionReturn(0); 175 } 176 177 static PetscErrorCode TSReset_EIMEX(TS ts) 178 { 179 TS_EIMEX *ext = (TS_EIMEX*)ts->data; 180 PetscInt ns; 181 182 PetscFunctionBegin; 183 ns = ext->nstages; 184 PetscCall(VecDestroyVecs((1+ns)*ns/2,&ext->T)); 185 PetscCall(VecDestroy(&ext->Y)); 186 PetscCall(VecDestroy(&ext->Z)); 187 PetscCall(VecDestroy(&ext->YdotRHS)); 188 PetscCall(VecDestroy(&ext->YdotI)); 189 PetscCall(VecDestroy(&ext->Ydot)); 190 PetscCall(VecDestroy(&ext->VecSolPrev)); 191 PetscCall(PetscFree(ext->N)); 192 PetscFunctionReturn(0); 193 } 194 195 static PetscErrorCode TSDestroy_EIMEX(TS ts) 196 { 197 PetscFunctionBegin; 198 PetscCall(TSReset_EIMEX(ts)); 199 PetscCall(PetscFree(ts->data)); 200 PetscCall(PetscObjectComposeFunction((PetscObject)ts,"TSEIMEXSetMaxRows_C",NULL)); 201 PetscCall(PetscObjectComposeFunction((PetscObject)ts,"TSEIMEXSetRowCol_C",NULL)); 202 PetscCall(PetscObjectComposeFunction((PetscObject)ts,"TSEIMEXSetOrdAdapt_C",NULL)); 203 PetscFunctionReturn(0); 204 } 205 206 static PetscErrorCode TSEIMEXGetVecs(TS ts,DM dm,Vec *Z,Vec *Ydot,Vec *YdotI, Vec *YdotRHS) 207 { 208 TS_EIMEX *ext = (TS_EIMEX*)ts->data; 209 210 PetscFunctionBegin; 211 if (Z) { 212 if (dm && dm != ts->dm) { 213 PetscCall(DMGetNamedGlobalVector(dm,"TSEIMEX_Z",Z)); 214 } else *Z = ext->Z; 215 } 216 if (Ydot) { 217 if (dm && dm != ts->dm) { 218 PetscCall(DMGetNamedGlobalVector(dm,"TSEIMEX_Ydot",Ydot)); 219 } else *Ydot = ext->Ydot; 220 } 221 if (YdotI) { 222 if (dm && dm != ts->dm) { 223 PetscCall(DMGetNamedGlobalVector(dm,"TSEIMEX_YdotI",YdotI)); 224 } else *YdotI = ext->YdotI; 225 } 226 if (YdotRHS) { 227 if (dm && dm != ts->dm) { 228 PetscCall(DMGetNamedGlobalVector(dm,"TSEIMEX_YdotRHS",YdotRHS)); 229 } else *YdotRHS = ext->YdotRHS; 230 } 231 PetscFunctionReturn(0); 232 } 233 234 static PetscErrorCode TSEIMEXRestoreVecs(TS ts,DM dm,Vec *Z,Vec *Ydot,Vec *YdotI,Vec *YdotRHS) 235 { 236 PetscFunctionBegin; 237 if (Z) { 238 if (dm && dm != ts->dm) { 239 PetscCall(DMRestoreNamedGlobalVector(dm,"TSEIMEX_Z",Z)); 240 } 241 } 242 if (Ydot) { 243 if (dm && dm != ts->dm) { 244 PetscCall(DMRestoreNamedGlobalVector(dm,"TSEIMEX_Ydot",Ydot)); 245 } 246 } 247 if (YdotI) { 248 if (dm && dm != ts->dm) { 249 PetscCall(DMRestoreNamedGlobalVector(dm,"TSEIMEX_YdotI",YdotI)); 250 } 251 } 252 if (YdotRHS) { 253 if (dm && dm != ts->dm) { 254 PetscCall(DMRestoreNamedGlobalVector(dm,"TSEIMEX_YdotRHS",YdotRHS)); 255 } 256 } 257 PetscFunctionReturn(0); 258 } 259 260 /* 261 This defines the nonlinear equation that is to be solved with SNES 262 Fn[t0+Theta*dt, U, (U-U0)*shift] = 0 263 In the case of Backward Euler, Fn = (U-U0)/h-g(t1,U)) 264 Since FormIFunction calculates G = ydot - g(t,y), ydot will be set to (U-U0)/h 265 */ 266 static PetscErrorCode SNESTSFormFunction_EIMEX(SNES snes,Vec X,Vec G,TS ts) 267 { 268 TS_EIMEX *ext = (TS_EIMEX*)ts->data; 269 Vec Ydot,Z; 270 DM dm,dmsave; 271 272 PetscFunctionBegin; 273 PetscCall(VecZeroEntries(G)); 274 275 PetscCall(SNESGetDM(snes,&dm)); 276 PetscCall(TSEIMEXGetVecs(ts,dm,&Z,&Ydot,NULL,NULL)); 277 PetscCall(VecZeroEntries(Ydot)); 278 dmsave = ts->dm; 279 ts->dm = dm; 280 PetscCall(TSComputeIFunction(ts,ext->ctime,X,Ydot,G,PETSC_FALSE)); 281 /* PETSC_FALSE indicates non-imex, adding explicit RHS to the implicit I function. */ 282 PetscCall(VecCopy(G,Ydot)); 283 ts->dm = dmsave; 284 PetscCall(TSEIMEXRestoreVecs(ts,dm,&Z,&Ydot,NULL,NULL)); 285 286 PetscFunctionReturn(0); 287 } 288 289 /* 290 This defined the Jacobian matrix for SNES. Jn = (I/h-g'(t,y)) 291 */ 292 static PetscErrorCode SNESTSFormJacobian_EIMEX(SNES snes,Vec X,Mat A,Mat B,TS ts) 293 { 294 TS_EIMEX *ext = (TS_EIMEX*)ts->data; 295 Vec Ydot; 296 DM dm,dmsave; 297 PetscFunctionBegin; 298 PetscCall(SNESGetDM(snes,&dm)); 299 PetscCall(TSEIMEXGetVecs(ts,dm,NULL,&Ydot,NULL,NULL)); 300 /* PetscCall(VecZeroEntries(Ydot)); */ 301 /* ext->Ydot have already been computed in SNESTSFormFunction_EIMEX (SNES guarantees this) */ 302 dmsave = ts->dm; 303 ts->dm = dm; 304 PetscCall(TSComputeIJacobian(ts,ts->ptime,X,Ydot,ext->shift,A,B,PETSC_TRUE)); 305 ts->dm = dmsave; 306 PetscCall(TSEIMEXRestoreVecs(ts,dm,NULL,&Ydot,NULL,NULL)); 307 PetscFunctionReturn(0); 308 } 309 310 static PetscErrorCode DMCoarsenHook_TSEIMEX(DM fine,DM coarse,void *ctx) 311 { 312 PetscFunctionBegin; 313 PetscFunctionReturn(0); 314 } 315 316 static PetscErrorCode DMRestrictHook_TSEIMEX(DM fine,Mat restrct,Vec rscale,Mat inject,DM coarse,void *ctx) 317 { 318 TS ts = (TS)ctx; 319 Vec Z,Z_c; 320 321 PetscFunctionBegin; 322 PetscCall(TSEIMEXGetVecs(ts,fine,&Z,NULL,NULL,NULL)); 323 PetscCall(TSEIMEXGetVecs(ts,coarse,&Z_c,NULL,NULL,NULL)); 324 PetscCall(MatRestrict(restrct,Z,Z_c)); 325 PetscCall(VecPointwiseMult(Z_c,rscale,Z_c)); 326 PetscCall(TSEIMEXRestoreVecs(ts,fine,&Z,NULL,NULL,NULL)); 327 PetscCall(TSEIMEXRestoreVecs(ts,coarse,&Z_c,NULL,NULL,NULL)); 328 PetscFunctionReturn(0); 329 } 330 331 static PetscErrorCode TSSetUp_EIMEX(TS ts) 332 { 333 TS_EIMEX *ext = (TS_EIMEX*)ts->data; 334 DM dm; 335 336 PetscFunctionBegin; 337 if (!ext->N) { /* ext->max_rows not set */ 338 PetscCall(TSEIMEXSetMaxRows(ts,TSEIMEXDefault)); 339 } 340 if (-1 == ext->row_ind && -1 == ext->col_ind) { 341 PetscCall(TSEIMEXSetRowCol(ts,ext->max_rows,ext->max_rows)); 342 } else{/* ext->row_ind and col_ind already set */ 343 if (ext->ord_adapt) { 344 PetscCall(PetscInfo(ts,"Order adaptivity is enabled and TSEIMEXSetRowCol or -ts_eimex_row_col option will take no effect\n")); 345 } 346 } 347 348 if (ext->ord_adapt) { 349 ext->nstages = 2; /* Start with the 2-stage scheme */ 350 PetscCall(TSEIMEXSetRowCol(ts,ext->nstages,ext->nstages)); 351 } else{ 352 ext->nstages = ext->max_rows; /* by default nstages is the same as max_rows, this can be changed by setting order adaptivity */ 353 } 354 355 PetscCall(TSGetAdapt(ts,&ts->adapt)); 356 357 PetscCall(VecDuplicateVecs(ts->vec_sol,(1+ext->nstages)*ext->nstages/2,&ext->T));/* full T table */ 358 PetscCall(VecDuplicate(ts->vec_sol,&ext->YdotI)); 359 PetscCall(VecDuplicate(ts->vec_sol,&ext->YdotRHS)); 360 PetscCall(VecDuplicate(ts->vec_sol,&ext->Ydot)); 361 PetscCall(VecDuplicate(ts->vec_sol,&ext->VecSolPrev)); 362 PetscCall(VecDuplicate(ts->vec_sol,&ext->Y)); 363 PetscCall(VecDuplicate(ts->vec_sol,&ext->Z)); 364 PetscCall(TSGetDM(ts,&dm)); 365 if (dm) { 366 PetscCall(DMCoarsenHookAdd(dm,DMCoarsenHook_TSEIMEX,DMRestrictHook_TSEIMEX,ts)); 367 } 368 PetscFunctionReturn(0); 369 } 370 371 static PetscErrorCode TSSetFromOptions_EIMEX(PetscOptionItems *PetscOptionsObject,TS ts) 372 { 373 TS_EIMEX *ext = (TS_EIMEX*)ts->data; 374 PetscInt tindex[2]; 375 PetscInt np = 2, nrows=TSEIMEXDefault; 376 377 PetscFunctionBegin; 378 tindex[0] = TSEIMEXDefault; 379 tindex[1] = TSEIMEXDefault; 380 PetscCall(PetscOptionsHead(PetscOptionsObject,"EIMEX ODE solver options")); 381 { 382 PetscBool flg; 383 PetscCall(PetscOptionsInt("-ts_eimex_max_rows","Define the maximum number of rows used","TSEIMEXSetMaxRows",nrows,&nrows,&flg)); /* default value 3 */ 384 if (flg) { 385 PetscCall(TSEIMEXSetMaxRows(ts,nrows)); 386 } 387 PetscCall(PetscOptionsIntArray("-ts_eimex_row_col","Return the specific term in the T table","TSEIMEXSetRowCol",tindex,&np,&flg)); 388 if (flg) { 389 PetscCall(TSEIMEXSetRowCol(ts,tindex[0],tindex[1])); 390 } 391 PetscCall(PetscOptionsBool("-ts_eimex_order_adapt","Solve the problem with adaptive order","TSEIMEXSetOrdAdapt",ext->ord_adapt,&ext->ord_adapt,NULL)); 392 } 393 PetscCall(PetscOptionsTail()); 394 PetscFunctionReturn(0); 395 } 396 397 static PetscErrorCode TSView_EIMEX(TS ts,PetscViewer viewer) 398 { 399 PetscFunctionBegin; 400 PetscFunctionReturn(0); 401 } 402 403 /*@C 404 TSEIMEXSetMaxRows - Set the maximum number of rows for EIMEX schemes 405 406 Logically collective 407 408 Input Parameters: 409 + ts - timestepping context 410 - nrows - maximum number of rows 411 412 Level: intermediate 413 414 .seealso: TSEIMEXSetRowCol(), TSEIMEXSetOrdAdapt(), TSEIMEX 415 @*/ 416 PetscErrorCode TSEIMEXSetMaxRows(TS ts, PetscInt nrows) 417 { 418 PetscFunctionBegin; 419 PetscValidHeaderSpecific(ts,TS_CLASSID,1); 420 PetscTryMethod(ts,"TSEIMEXSetMaxRows_C",(TS,PetscInt),(ts,nrows)); 421 PetscFunctionReturn(0); 422 } 423 424 /*@C 425 TSEIMEXSetRowCol - Set the type index in the T table for the return value 426 427 Logically collective 428 429 Input Parameters: 430 + ts - timestepping context 431 - tindex - index in the T table 432 433 Level: intermediate 434 435 .seealso: TSEIMEXSetMaxRows(), TSEIMEXSetOrdAdapt(), TSEIMEX 436 @*/ 437 PetscErrorCode TSEIMEXSetRowCol(TS ts, PetscInt row, PetscInt col) 438 { 439 PetscFunctionBegin; 440 PetscValidHeaderSpecific(ts,TS_CLASSID,1); 441 PetscTryMethod(ts,"TSEIMEXSetRowCol_C",(TS,PetscInt, PetscInt),(ts,row,col)); 442 PetscFunctionReturn(0); 443 } 444 445 /*@C 446 TSEIMEXSetOrdAdapt - Set the order adaptativity 447 448 Logically collective 449 450 Input Parameters: 451 + ts - timestepping context 452 - tindex - index in the T table 453 454 Level: intermediate 455 456 .seealso: TSEIMEXSetRowCol(), TSEIMEXSetOrdAdapt(), TSEIMEX 457 @*/ 458 PetscErrorCode TSEIMEXSetOrdAdapt(TS ts, PetscBool flg) 459 { 460 PetscFunctionBegin; 461 PetscValidHeaderSpecific(ts,TS_CLASSID,1); 462 PetscTryMethod(ts,"TSEIMEXSetOrdAdapt_C",(TS,PetscBool),(ts,flg)); 463 PetscFunctionReturn(0); 464 } 465 466 static PetscErrorCode TSEIMEXSetMaxRows_EIMEX(TS ts,PetscInt nrows) 467 { 468 TS_EIMEX *ext = (TS_EIMEX*)ts->data; 469 PetscInt i; 470 471 PetscFunctionBegin; 472 PetscCheck(nrows >= 0 && nrows <= 100,((PetscObject)ts)->comm,PETSC_ERR_ARG_OUTOFRANGE,"Max number of rows (current value %D) should be an integer number between 1 and 100",nrows); 473 PetscCall(PetscFree(ext->N)); 474 ext->max_rows = nrows; 475 PetscCall(PetscMalloc1(nrows,&ext->N)); 476 for (i=0;i<nrows;i++) ext->N[i]=i+1; 477 PetscFunctionReturn(0); 478 } 479 480 static PetscErrorCode TSEIMEXSetRowCol_EIMEX(TS ts,PetscInt row,PetscInt col) 481 { 482 TS_EIMEX *ext = (TS_EIMEX*)ts->data; 483 484 PetscFunctionBegin; 485 PetscCheck(row >= 1 && col >= 1,((PetscObject)ts)->comm,PETSC_ERR_ARG_OUTOFRANGE,"The row or column index (current value %d,%d) should not be less than 1 ",row,col); 486 PetscCheck(row <= ext->max_rows && col <= ext->max_rows,((PetscObject)ts)->comm,PETSC_ERR_ARG_OUTOFRANGE,"The row or column index (current value %d,%d) exceeds the maximum number of rows %d",row,col,ext->max_rows); 487 PetscCheck(col <= row,((PetscObject)ts)->comm,PETSC_ERR_ARG_OUTOFRANGE,"The column index (%d) exceeds the row index (%d)",col,row); 488 489 ext->row_ind = row - 1; 490 ext->col_ind = col - 1; /* Array index in C starts from 0 */ 491 PetscFunctionReturn(0); 492 } 493 494 static PetscErrorCode TSEIMEXSetOrdAdapt_EIMEX(TS ts,PetscBool flg) 495 { 496 TS_EIMEX *ext = (TS_EIMEX*)ts->data; 497 PetscFunctionBegin; 498 ext->ord_adapt = flg; 499 PetscFunctionReturn(0); 500 } 501 502 /*MC 503 TSEIMEX - Time stepping with Extrapolated IMEX methods. 504 505 These methods are intended for problems with well-separated time scales, especially when a slow scale is strongly nonlinear such that it 506 is expensive to solve with a fully implicit method. The user should provide the stiff part of the equation using TSSetIFunction() and the 507 non-stiff part with TSSetRHSFunction(). 508 509 Notes: 510 The default is a 3-stage scheme, it can be changed with TSEIMEXSetMaxRows() or -ts_eimex_max_rows 511 512 This method currently only works with ODE, for which the stiff part G(t,X,Xdot) has the form Xdot + Ghat(t,X). 513 514 The general system is written as 515 516 G(t,X,Xdot) = F(t,X) 517 518 where G represents the stiff part and F represents the non-stiff part. The user should provide the stiff part 519 of the equation using TSSetIFunction() and the non-stiff part with TSSetRHSFunction(). 520 This method is designed to be linearly implicit on G and can use an approximate and lagged Jacobian. 521 522 Another common form for the system is 523 524 y'=f(x)+g(x) 525 526 The relationship between F,G and f,g is 527 528 G = y'-g(x), F = f(x) 529 530 References 531 E. Constantinescu and A. Sandu, Extrapolated implicit-explicit time stepping, SIAM Journal on Scientific 532 Computing, 31 (2010), pp. 4452-4477. 533 534 Level: beginner 535 536 .seealso: TSCreate(), TS, TSSetType(), TSEIMEXSetMaxRows(), TSEIMEXSetRowCol(), TSEIMEXSetOrdAdapt() 537 538 M*/ 539 PETSC_EXTERN PetscErrorCode TSCreate_EIMEX(TS ts) 540 { 541 TS_EIMEX *ext; 542 543 PetscFunctionBegin; 544 545 ts->ops->reset = TSReset_EIMEX; 546 ts->ops->destroy = TSDestroy_EIMEX; 547 ts->ops->view = TSView_EIMEX; 548 ts->ops->setup = TSSetUp_EIMEX; 549 ts->ops->step = TSStep_EIMEX; 550 ts->ops->interpolate = TSInterpolate_EIMEX; 551 ts->ops->evaluatestep = TSEvaluateStep_EIMEX; 552 ts->ops->setfromoptions = TSSetFromOptions_EIMEX; 553 ts->ops->snesfunction = SNESTSFormFunction_EIMEX; 554 ts->ops->snesjacobian = SNESTSFormJacobian_EIMEX; 555 ts->default_adapt_type = TSADAPTNONE; 556 557 ts->usessnes = PETSC_TRUE; 558 559 PetscCall(PetscNewLog(ts,&ext)); 560 ts->data = (void*)ext; 561 562 ext->ord_adapt = PETSC_FALSE; /* By default, no order adapativity */ 563 ext->row_ind = -1; 564 ext->col_ind = -1; 565 ext->max_rows = TSEIMEXDefault; 566 ext->nstages = TSEIMEXDefault; 567 568 PetscCall(PetscObjectComposeFunction((PetscObject)ts,"TSEIMEXSetMaxRows_C", TSEIMEXSetMaxRows_EIMEX)); 569 PetscCall(PetscObjectComposeFunction((PetscObject)ts,"TSEIMEXSetRowCol_C", TSEIMEXSetRowCol_EIMEX)); 570 PetscCall(PetscObjectComposeFunction((PetscObject)ts,"TSEIMEXSetOrdAdapt_C",TSEIMEXSetOrdAdapt_EIMEX)); 571 PetscFunctionReturn(0); 572 } 573