1 /* 2 Code for timestepping with implicit generalized-\alpha method 3 for first order systems. 4 */ 5 #include <petsc/private/tsimpl.h> /*I "petscts.h" I*/ 6 7 static PetscBool cited = PETSC_FALSE; 8 static const char citation[] = "@article{Jansen2000,\n" 9 " title = {A generalized-$\\alpha$ method for integrating the filtered {N}avier--{S}tokes equations with a stabilized finite element method},\n" 10 " author = {Kenneth E. Jansen and Christian H. Whiting and Gregory M. Hulbert},\n" 11 " journal = {Computer Methods in Applied Mechanics and Engineering},\n" 12 " volume = {190},\n" 13 " number = {3--4},\n" 14 " pages = {305--319},\n" 15 " year = {2000},\n" 16 " issn = {0045-7825},\n" 17 " doi = {http://dx.doi.org/10.1016/S0045-7825(00)00203-6}\n}\n"; 18 19 typedef struct { 20 PetscReal stage_time; 21 PetscReal shift_V; 22 PetscReal scale_F; 23 Vec X0, Xa, X1; 24 Vec V0, Va, V1; 25 26 PetscReal Alpha_m; 27 PetscReal Alpha_f; 28 PetscReal Gamma; 29 PetscInt order; 30 31 Vec vec_sol_prev; 32 Vec vec_lte_work; 33 34 TSStepStatus status; 35 } TS_Alpha; 36 37 static PetscErrorCode TSResizeRegister_Alpha(TS ts, PetscBool reg) 38 { 39 TS_Alpha *th = (TS_Alpha *)ts->data; 40 41 PetscFunctionBegin; 42 if (reg) { 43 PetscCall(TSResizeRegisterVec(ts, "ts:theta:sol_prev", th->vec_sol_prev)); 44 PetscCall(TSResizeRegisterVec(ts, "ts:theta:X0", th->X0)); 45 } else { 46 PetscCall(TSResizeRetrieveVec(ts, "ts:theta:sol_prev", &th->vec_sol_prev)); 47 PetscCall(PetscObjectReference((PetscObject)th->vec_sol_prev)); 48 PetscCall(TSResizeRetrieveVec(ts, "ts:theta:X0", &th->X0)); 49 PetscCall(PetscObjectReference((PetscObject)th->X0)); 50 } 51 PetscFunctionReturn(PETSC_SUCCESS); 52 } 53 54 static PetscErrorCode TSAlpha_StageTime(TS ts) 55 { 56 TS_Alpha *th = (TS_Alpha *)ts->data; 57 PetscReal t = ts->ptime; 58 PetscReal dt = ts->time_step; 59 PetscReal Alpha_m = th->Alpha_m; 60 PetscReal Alpha_f = th->Alpha_f; 61 PetscReal Gamma = th->Gamma; 62 63 PetscFunctionBegin; 64 th->stage_time = t + Alpha_f * dt; 65 th->shift_V = Alpha_m / (Alpha_f * Gamma * dt); 66 th->scale_F = 1 / Alpha_f; 67 PetscFunctionReturn(PETSC_SUCCESS); 68 } 69 70 static PetscErrorCode TSAlpha_StageVecs(TS ts, Vec X) 71 { 72 TS_Alpha *th = (TS_Alpha *)ts->data; 73 Vec X1 = X, V1 = th->V1; 74 Vec Xa = th->Xa, Va = th->Va; 75 Vec X0 = th->X0, V0 = th->V0; 76 PetscReal dt = ts->time_step; 77 PetscReal Alpha_m = th->Alpha_m; 78 PetscReal Alpha_f = th->Alpha_f; 79 PetscReal Gamma = th->Gamma; 80 81 PetscFunctionBegin; 82 /* V1 = 1/(Gamma*dT)*(X1-X0) + (1-1/Gamma)*V0 */ 83 PetscCall(VecWAXPY(V1, -1.0, X0, X1)); 84 PetscCall(VecAXPBY(V1, 1 - 1 / Gamma, 1 / (Gamma * dt), V0)); 85 /* Xa = X0 + Alpha_f*(X1-X0) */ 86 PetscCall(VecWAXPY(Xa, -1.0, X0, X1)); 87 PetscCall(VecAYPX(Xa, Alpha_f, X0)); 88 /* Va = V0 + Alpha_m*(V1-V0) */ 89 PetscCall(VecWAXPY(Va, -1.0, V0, V1)); 90 PetscCall(VecAYPX(Va, Alpha_m, V0)); 91 PetscFunctionReturn(PETSC_SUCCESS); 92 } 93 94 static PetscErrorCode TSAlpha_SNESSolve(TS ts, Vec b, Vec x) 95 { 96 PetscInt nits, lits; 97 98 PetscFunctionBegin; 99 PetscCall(SNESSolve(ts->snes, b, x)); 100 PetscCall(SNESGetIterationNumber(ts->snes, &nits)); 101 PetscCall(SNESGetLinearSolveIterations(ts->snes, &lits)); 102 ts->snes_its += nits; 103 ts->ksp_its += lits; 104 PetscFunctionReturn(PETSC_SUCCESS); 105 } 106 107 /* 108 Compute a consistent initial state for the generalized-alpha method. 109 - Solve two successive backward Euler steps with halved time step. 110 - Compute the initial time derivative using backward differences. 111 - If using adaptivity, estimate the LTE of the initial step. 112 */ 113 static PetscErrorCode TSAlpha_Restart(TS ts, PetscBool *initok) 114 { 115 TS_Alpha *th = (TS_Alpha *)ts->data; 116 PetscReal time_step; 117 PetscReal alpha_m, alpha_f, gamma; 118 Vec X0 = ts->vec_sol, X1, X2 = th->X1; 119 PetscBool stageok; 120 121 PetscFunctionBegin; 122 PetscCall(VecDuplicate(X0, &X1)); 123 124 /* Setup backward Euler with halved time step */ 125 PetscCall(TSAlphaGetParams(ts, &alpha_m, &alpha_f, &gamma)); 126 PetscCall(TSAlphaSetParams(ts, 1, 1, 1)); 127 PetscCall(TSGetTimeStep(ts, &time_step)); 128 ts->time_step = time_step / 2; 129 PetscCall(TSAlpha_StageTime(ts)); 130 th->stage_time = ts->ptime; 131 PetscCall(VecZeroEntries(th->V0)); 132 133 /* First BE step, (t0,X0) -> (t1,X1) */ 134 th->stage_time += ts->time_step; 135 PetscCall(VecCopy(X0, th->X0)); 136 PetscCall(TSPreStage(ts, th->stage_time)); 137 PetscCall(VecCopy(th->X0, X1)); 138 PetscCall(TSAlpha_SNESSolve(ts, NULL, X1)); 139 PetscCall(TSPostStage(ts, th->stage_time, 0, &X1)); 140 PetscCall(TSAdaptCheckStage(ts->adapt, ts, th->stage_time, X1, &stageok)); 141 if (!stageok) goto finally; 142 143 /* Second BE step, (t1,X1) -> (t2,X2) */ 144 th->stage_time += ts->time_step; 145 PetscCall(VecCopy(X1, th->X0)); 146 PetscCall(TSPreStage(ts, th->stage_time)); 147 PetscCall(VecCopy(th->X0, X2)); 148 PetscCall(TSAlpha_SNESSolve(ts, NULL, X2)); 149 PetscCall(TSPostStage(ts, th->stage_time, 0, &X2)); 150 PetscCall(TSAdaptCheckStage(ts->adapt, ts, th->stage_time, X2, &stageok)); 151 if (!stageok) goto finally; 152 153 /* Compute V0 ~ dX/dt at t0 with backward differences */ 154 PetscCall(VecZeroEntries(th->V0)); 155 PetscCall(VecAXPY(th->V0, -3 / time_step, X0)); 156 PetscCall(VecAXPY(th->V0, +4 / time_step, X1)); 157 PetscCall(VecAXPY(th->V0, -1 / time_step, X2)); 158 159 /* Rough, lower-order estimate LTE of the initial step */ 160 if (th->vec_lte_work) { 161 PetscCall(VecZeroEntries(th->vec_lte_work)); 162 PetscCall(VecAXPY(th->vec_lte_work, +2, X2)); 163 PetscCall(VecAXPY(th->vec_lte_work, -4, X1)); 164 PetscCall(VecAXPY(th->vec_lte_work, +2, X0)); 165 } 166 167 finally: 168 /* Revert TSAlpha to the initial state (t0,X0), but retain 169 potential time step reduction by factor after failed solve. */ 170 if (initok) *initok = stageok; 171 PetscCall(TSSetTimeStep(ts, 2 * ts->time_step)); 172 PetscCall(TSAlphaSetParams(ts, alpha_m, alpha_f, gamma)); 173 PetscCall(VecCopy(ts->vec_sol, th->X0)); 174 175 PetscCall(VecDestroy(&X1)); 176 PetscFunctionReturn(PETSC_SUCCESS); 177 } 178 179 static PetscErrorCode TSStep_Alpha(TS ts) 180 { 181 TS_Alpha *th = (TS_Alpha *)ts->data; 182 PetscInt rejections = 0; 183 PetscBool stageok, accept = PETSC_TRUE; 184 PetscReal next_time_step = ts->time_step; 185 186 PetscFunctionBegin; 187 PetscCall(PetscCitationsRegister(citation, &cited)); 188 189 if (!ts->steprollback) { 190 if (th->vec_sol_prev) PetscCall(VecCopy(th->X0, th->vec_sol_prev)); 191 PetscCall(VecCopy(ts->vec_sol, th->X0)); 192 PetscCall(VecCopy(th->V1, th->V0)); 193 } 194 195 th->status = TS_STEP_INCOMPLETE; 196 while (!ts->reason && th->status != TS_STEP_COMPLETE) { 197 if (ts->steprestart) { 198 PetscCall(TSAlpha_Restart(ts, &stageok)); 199 if (!stageok) goto reject_step; 200 } 201 202 PetscCall(TSAlpha_StageTime(ts)); 203 PetscCall(VecCopy(th->X0, th->X1)); 204 PetscCall(TSPreStage(ts, th->stage_time)); 205 PetscCall(TSAlpha_SNESSolve(ts, NULL, th->X1)); 206 PetscCall(TSPostStage(ts, th->stage_time, 0, &th->Xa)); 207 PetscCall(TSAdaptCheckStage(ts->adapt, ts, th->stage_time, th->Xa, &stageok)); 208 if (!stageok) goto reject_step; 209 210 th->status = TS_STEP_PENDING; 211 PetscCall(VecCopy(th->X1, ts->vec_sol)); 212 PetscCall(TSAdaptChoose(ts->adapt, ts, ts->time_step, NULL, &next_time_step, &accept)); 213 th->status = accept ? TS_STEP_COMPLETE : TS_STEP_INCOMPLETE; 214 if (!accept) { 215 PetscCall(VecCopy(th->X0, ts->vec_sol)); 216 ts->time_step = next_time_step; 217 goto reject_step; 218 } 219 220 ts->ptime += ts->time_step; 221 ts->time_step = next_time_step; 222 break; 223 224 reject_step: 225 ts->reject++; 226 accept = PETSC_FALSE; 227 if (!ts->reason && ++rejections > ts->max_reject && ts->max_reject >= 0) { 228 ts->reason = TS_DIVERGED_STEP_REJECTED; 229 PetscCall(PetscInfo(ts, "Step=%" PetscInt_FMT ", step rejections %" PetscInt_FMT " greater than current TS allowed, stopping solve\n", ts->steps, rejections)); 230 } 231 } 232 PetscFunctionReturn(PETSC_SUCCESS); 233 } 234 235 static PetscErrorCode TSEvaluateWLTE_Alpha(TS ts, NormType wnormtype, PetscInt *order, PetscReal *wlte) 236 { 237 TS_Alpha *th = (TS_Alpha *)ts->data; 238 Vec X = th->X1; /* X = solution */ 239 Vec Y = th->vec_lte_work; /* Y = X + LTE */ 240 PetscReal wltea, wlter; 241 242 PetscFunctionBegin; 243 if (!th->vec_sol_prev) { 244 *wlte = -1; 245 PetscFunctionReturn(PETSC_SUCCESS); 246 } 247 if (!th->vec_lte_work) { 248 *wlte = -1; 249 PetscFunctionReturn(PETSC_SUCCESS); 250 } 251 if (ts->steprestart) { 252 /* th->vec_lte_work is set to the LTE in TSAlpha_Restart() */ 253 PetscCall(VecAXPY(Y, 1, X)); 254 } else { 255 /* Compute LTE using backward differences with non-constant time step */ 256 PetscReal h = ts->time_step, h_prev = ts->ptime - ts->ptime_prev; 257 PetscReal a = 1 + h_prev / h; 258 PetscScalar scal[3]; 259 Vec vecs[3]; 260 scal[0] = +1 / a; 261 scal[1] = -1 / (a - 1); 262 scal[2] = +1 / (a * (a - 1)); 263 vecs[0] = th->X1; 264 vecs[1] = th->X0; 265 vecs[2] = th->vec_sol_prev; 266 PetscCall(VecCopy(X, Y)); 267 PetscCall(VecMAXPY(Y, 3, scal, vecs)); 268 } 269 PetscCall(TSErrorWeightedNorm(ts, X, Y, wnormtype, wlte, &wltea, &wlter)); 270 if (order) *order = 2; 271 PetscFunctionReturn(PETSC_SUCCESS); 272 } 273 274 static PetscErrorCode TSInterpolate_Alpha(TS ts, PetscReal t, Vec X) 275 { 276 TS_Alpha *th = (TS_Alpha *)ts->data; 277 PetscReal dt = t - ts->ptime; 278 PetscReal Gamma = th->Gamma; 279 280 PetscFunctionBegin; 281 PetscCall(VecWAXPY(th->V1, -1.0, th->X0, ts->vec_sol)); 282 PetscCall(VecAXPBY(th->V1, 1 - 1 / Gamma, 1 / (Gamma * ts->time_step), th->V0)); 283 PetscCall(VecCopy(ts->vec_sol, X)); 284 /* X = X + Gamma*dT*V1 */ 285 PetscCall(VecAXPY(X, th->Gamma * dt, th->V1)); 286 /* X = X + (1-Gamma)*dT*V0 */ 287 PetscCall(VecAXPY(X, (1 - th->Gamma) * dt, th->V0)); 288 PetscFunctionReturn(PETSC_SUCCESS); 289 } 290 291 static PetscErrorCode SNESTSFormFunction_Alpha(PETSC_UNUSED SNES snes, Vec X, Vec F, TS ts) 292 { 293 TS_Alpha *th = (TS_Alpha *)ts->data; 294 PetscReal ta = th->stage_time; 295 Vec Xa = th->Xa, Va = th->Va; 296 297 PetscFunctionBegin; 298 PetscCall(TSAlpha_StageVecs(ts, X)); 299 /* F = Function(ta,Xa,Va) */ 300 PetscCall(TSComputeIFunction(ts, ta, Xa, Va, F, PETSC_FALSE)); 301 PetscCall(VecScale(F, th->scale_F)); 302 PetscFunctionReturn(PETSC_SUCCESS); 303 } 304 305 static PetscErrorCode SNESTSFormJacobian_Alpha(PETSC_UNUSED SNES snes, PETSC_UNUSED Vec X, Mat J, Mat P, TS ts) 306 { 307 TS_Alpha *th = (TS_Alpha *)ts->data; 308 PetscReal ta = th->stage_time; 309 Vec Xa = th->Xa, Va = th->Va; 310 PetscReal dVdX = th->shift_V; 311 312 PetscFunctionBegin; 313 /* J,P = Jacobian(ta,Xa,Va) */ 314 PetscCall(TSComputeIJacobian(ts, ta, Xa, Va, dVdX, J, P, PETSC_FALSE)); 315 PetscFunctionReturn(PETSC_SUCCESS); 316 } 317 318 static PetscErrorCode TSReset_Alpha(TS ts) 319 { 320 TS_Alpha *th = (TS_Alpha *)ts->data; 321 322 PetscFunctionBegin; 323 PetscCall(VecDestroy(&th->X0)); 324 PetscCall(VecDestroy(&th->Xa)); 325 PetscCall(VecDestroy(&th->X1)); 326 PetscCall(VecDestroy(&th->V0)); 327 PetscCall(VecDestroy(&th->Va)); 328 PetscCall(VecDestroy(&th->V1)); 329 PetscCall(VecDestroy(&th->vec_sol_prev)); 330 PetscCall(VecDestroy(&th->vec_lte_work)); 331 PetscFunctionReturn(PETSC_SUCCESS); 332 } 333 334 static PetscErrorCode TSDestroy_Alpha(TS ts) 335 { 336 PetscFunctionBegin; 337 PetscCall(TSReset_Alpha(ts)); 338 PetscCall(PetscFree(ts->data)); 339 340 PetscCall(PetscObjectComposeFunction((PetscObject)ts, "TSAlphaSetRadius_C", NULL)); 341 PetscCall(PetscObjectComposeFunction((PetscObject)ts, "TSAlphaSetParams_C", NULL)); 342 PetscCall(PetscObjectComposeFunction((PetscObject)ts, "TSAlphaGetParams_C", NULL)); 343 PetscFunctionReturn(PETSC_SUCCESS); 344 } 345 346 static PetscErrorCode TSSetUp_Alpha(TS ts) 347 { 348 TS_Alpha *th = (TS_Alpha *)ts->data; 349 PetscBool match; 350 351 PetscFunctionBegin; 352 if (!th->X0) PetscCall(VecDuplicate(ts->vec_sol, &th->X0)); 353 PetscCall(VecDuplicate(ts->vec_sol, &th->Xa)); 354 PetscCall(VecDuplicate(ts->vec_sol, &th->X1)); 355 PetscCall(VecDuplicate(ts->vec_sol, &th->V0)); 356 PetscCall(VecDuplicate(ts->vec_sol, &th->Va)); 357 PetscCall(VecDuplicate(ts->vec_sol, &th->V1)); 358 359 PetscCall(TSGetAdapt(ts, &ts->adapt)); 360 PetscCall(TSAdaptCandidatesClear(ts->adapt)); 361 PetscCall(PetscObjectTypeCompare((PetscObject)ts->adapt, TSADAPTNONE, &match)); 362 if (!match) { 363 if (!th->vec_sol_prev) PetscCall(VecDuplicate(ts->vec_sol, &th->vec_sol_prev)); 364 if (!th->vec_lte_work) PetscCall(VecDuplicate(ts->vec_sol, &th->vec_lte_work)); 365 } 366 367 PetscCall(TSGetSNES(ts, &ts->snes)); 368 PetscFunctionReturn(PETSC_SUCCESS); 369 } 370 371 static PetscErrorCode TSSetFromOptions_Alpha(TS ts, PetscOptionItems PetscOptionsObject) 372 { 373 TS_Alpha *th = (TS_Alpha *)ts->data; 374 375 PetscFunctionBegin; 376 PetscOptionsHeadBegin(PetscOptionsObject, "Generalized-Alpha ODE solver options"); 377 { 378 PetscBool flg; 379 PetscReal radius = 1; 380 PetscCall(PetscOptionsReal("-ts_alpha_radius", "Spectral radius (high-frequency dissipation)", "TSAlphaSetRadius", radius, &radius, &flg)); 381 if (flg) PetscCall(TSAlphaSetRadius(ts, radius)); 382 PetscCall(PetscOptionsReal("-ts_alpha_alpha_m", "Algorithmic parameter alpha_m", "TSAlphaSetParams", th->Alpha_m, &th->Alpha_m, NULL)); 383 PetscCall(PetscOptionsReal("-ts_alpha_alpha_f", "Algorithmic parameter alpha_f", "TSAlphaSetParams", th->Alpha_f, &th->Alpha_f, NULL)); 384 PetscCall(PetscOptionsReal("-ts_alpha_gamma", "Algorithmic parameter gamma", "TSAlphaSetParams", th->Gamma, &th->Gamma, NULL)); 385 PetscCall(TSAlphaSetParams(ts, th->Alpha_m, th->Alpha_f, th->Gamma)); 386 } 387 PetscOptionsHeadEnd(); 388 PetscFunctionReturn(PETSC_SUCCESS); 389 } 390 391 static PetscErrorCode TSView_Alpha(TS ts, PetscViewer viewer) 392 { 393 TS_Alpha *th = (TS_Alpha *)ts->data; 394 PetscBool iascii; 395 396 PetscFunctionBegin; 397 PetscCall(PetscObjectTypeCompare((PetscObject)viewer, PETSCVIEWERASCII, &iascii)); 398 if (iascii) PetscCall(PetscViewerASCIIPrintf(viewer, " Alpha_m=%g, Alpha_f=%g, Gamma=%g\n", (double)th->Alpha_m, (double)th->Alpha_f, (double)th->Gamma)); 399 PetscFunctionReturn(PETSC_SUCCESS); 400 } 401 402 static PetscErrorCode TSAlphaSetRadius_Alpha(TS ts, PetscReal radius) 403 { 404 PetscReal alpha_m, alpha_f, gamma; 405 406 PetscFunctionBegin; 407 PetscCheck(radius >= 0 && radius <= 1, PetscObjectComm((PetscObject)ts), PETSC_ERR_ARG_OUTOFRANGE, "Radius %g not in range [0,1]", (double)radius); 408 alpha_m = (PetscReal)0.5 * (3 - radius) / (1 + radius); 409 alpha_f = 1 / (1 + radius); 410 gamma = (PetscReal)0.5 + alpha_m - alpha_f; 411 PetscCall(TSAlphaSetParams(ts, alpha_m, alpha_f, gamma)); 412 PetscFunctionReturn(PETSC_SUCCESS); 413 } 414 415 static PetscErrorCode TSAlphaSetParams_Alpha(TS ts, PetscReal alpha_m, PetscReal alpha_f, PetscReal gamma) 416 { 417 TS_Alpha *th = (TS_Alpha *)ts->data; 418 PetscReal tol = 100 * PETSC_MACHINE_EPSILON; 419 PetscReal res = ((PetscReal)0.5 + alpha_m - alpha_f) - gamma; 420 421 PetscFunctionBegin; 422 th->Alpha_m = alpha_m; 423 th->Alpha_f = alpha_f; 424 th->Gamma = gamma; 425 th->order = (PetscAbsReal(res) < tol) ? 2 : 1; 426 PetscFunctionReturn(PETSC_SUCCESS); 427 } 428 429 static PetscErrorCode TSAlphaGetParams_Alpha(TS ts, PetscReal *alpha_m, PetscReal *alpha_f, PetscReal *gamma) 430 { 431 TS_Alpha *th = (TS_Alpha *)ts->data; 432 433 PetscFunctionBegin; 434 if (alpha_m) *alpha_m = th->Alpha_m; 435 if (alpha_f) *alpha_f = th->Alpha_f; 436 if (gamma) *gamma = th->Gamma; 437 PetscFunctionReturn(PETSC_SUCCESS); 438 } 439 440 /*MC 441 TSALPHA - ODE/DAE solver using the implicit Generalized-Alpha method {cite}`jansen_2000` {cite}`chung1993` for first-order systems 442 443 Level: beginner 444 445 .seealso: [](ch_ts), `TS`, `TSCreate()`, `TSSetType()`, `TSAlphaSetRadius()`, `TSAlphaSetParams()` 446 M*/ 447 PETSC_EXTERN PetscErrorCode TSCreate_Alpha(TS ts) 448 { 449 TS_Alpha *th; 450 451 PetscFunctionBegin; 452 ts->ops->reset = TSReset_Alpha; 453 ts->ops->destroy = TSDestroy_Alpha; 454 ts->ops->view = TSView_Alpha; 455 ts->ops->setup = TSSetUp_Alpha; 456 ts->ops->setfromoptions = TSSetFromOptions_Alpha; 457 ts->ops->step = TSStep_Alpha; 458 ts->ops->evaluatewlte = TSEvaluateWLTE_Alpha; 459 ts->ops->interpolate = TSInterpolate_Alpha; 460 ts->ops->resizeregister = TSResizeRegister_Alpha; 461 ts->ops->snesfunction = SNESTSFormFunction_Alpha; 462 ts->ops->snesjacobian = SNESTSFormJacobian_Alpha; 463 ts->default_adapt_type = TSADAPTNONE; 464 465 ts->usessnes = PETSC_TRUE; 466 467 PetscCall(PetscNew(&th)); 468 ts->data = (void *)th; 469 470 th->Alpha_m = 0.5; 471 th->Alpha_f = 0.5; 472 th->Gamma = 0.5; 473 th->order = 2; 474 475 PetscCall(PetscObjectComposeFunction((PetscObject)ts, "TSAlphaSetRadius_C", TSAlphaSetRadius_Alpha)); 476 PetscCall(PetscObjectComposeFunction((PetscObject)ts, "TSAlphaSetParams_C", TSAlphaSetParams_Alpha)); 477 PetscCall(PetscObjectComposeFunction((PetscObject)ts, "TSAlphaGetParams_C", TSAlphaGetParams_Alpha)); 478 PetscFunctionReturn(PETSC_SUCCESS); 479 } 480 481 /*@ 482 TSAlphaSetRadius - sets the desired spectral radius of the method for `TSALPHA` 483 (i.e. high-frequency numerical damping) 484 485 Logically Collective 486 487 Input Parameters: 488 + ts - timestepping context 489 - radius - the desired spectral radius 490 491 Options Database Key: 492 . -ts_alpha_radius <radius> - set alpha radius 493 494 Level: intermediate 495 496 Notes: 497 The algorithmic parameters $\alpha_m$ and $\alpha_f$ of the generalized-$\alpha$ method can 498 be computed in terms of a specified spectral radius $\rho$ in [0, 1] for infinite time step 499 in order to control high-frequency numerical damping\: 500 501 $$ 502 \begin{align*} 503 \alpha_m = 0.5*(3-\rho)/(1+\rho) \\ 504 \alpha_f = 1/(1+\rho) 505 \end{align*} 506 $$ 507 508 .seealso: [](ch_ts), `TS`, `TSALPHA`, `TSAlphaSetParams()`, `TSAlphaGetParams()` 509 @*/ 510 PetscErrorCode TSAlphaSetRadius(TS ts, PetscReal radius) 511 { 512 PetscFunctionBegin; 513 PetscValidHeaderSpecific(ts, TS_CLASSID, 1); 514 PetscValidLogicalCollectiveReal(ts, radius, 2); 515 PetscCheck(radius >= 0 && radius <= 1, ((PetscObject)ts)->comm, PETSC_ERR_ARG_OUTOFRANGE, "Radius %g not in range [0,1]", (double)radius); 516 PetscTryMethod(ts, "TSAlphaSetRadius_C", (TS, PetscReal), (ts, radius)); 517 PetscFunctionReturn(PETSC_SUCCESS); 518 } 519 520 /*@ 521 TSAlphaSetParams - sets the algorithmic parameters for `TSALPHA` 522 523 Logically Collective 524 525 Input Parameters: 526 + ts - timestepping context 527 . alpha_m - algorithmic parameter 528 . alpha_f - algorithmic parameter 529 - gamma - algorithmic parameter 530 531 Options Database Keys: 532 + -ts_alpha_alpha_m <alpha_m> - set alpha_m 533 . -ts_alpha_alpha_f <alpha_f> - set alpha_f 534 - -ts_alpha_gamma <gamma> - set gamma 535 536 Level: advanced 537 538 Note: 539 Second-order accuracy can be obtained so long as\: $\gamma = 0.5 + \alpha_m - \alpha_f$ 540 541 Unconditional stability requires\: $\alpha_m >= \alpha_f >= 0.5$ 542 543 Backward Euler method is recovered with\: $\alpha_m = \alpha_f = \gamma = 1$ 544 545 Use of this function is normally only required to hack `TSALPHA` to use a modified 546 integration scheme. Users should call `TSAlphaSetRadius()` to set the desired spectral radius 547 of the methods (i.e. high-frequency damping) in order so select optimal values for these 548 parameters. 549 550 .seealso: [](ch_ts), `TS`, `TSALPHA`, `TSAlphaSetRadius()`, `TSAlphaGetParams()` 551 @*/ 552 PetscErrorCode TSAlphaSetParams(TS ts, PetscReal alpha_m, PetscReal alpha_f, PetscReal gamma) 553 { 554 PetscFunctionBegin; 555 PetscValidHeaderSpecific(ts, TS_CLASSID, 1); 556 PetscValidLogicalCollectiveReal(ts, alpha_m, 2); 557 PetscValidLogicalCollectiveReal(ts, alpha_f, 3); 558 PetscValidLogicalCollectiveReal(ts, gamma, 4); 559 PetscTryMethod(ts, "TSAlphaSetParams_C", (TS, PetscReal, PetscReal, PetscReal), (ts, alpha_m, alpha_f, gamma)); 560 PetscFunctionReturn(PETSC_SUCCESS); 561 } 562 563 /*@ 564 TSAlphaGetParams - gets the algorithmic parameters for `TSALPHA` 565 566 Not Collective 567 568 Input Parameter: 569 . ts - timestepping context 570 571 Output Parameters: 572 + alpha_m - algorithmic parameter 573 . alpha_f - algorithmic parameter 574 - gamma - algorithmic parameter 575 576 Level: advanced 577 578 Note: 579 Use of this function is normally only required to hack `TSALPHA` to use a modified 580 integration scheme. Users should call `TSAlphaSetRadius()` to set the high-frequency damping 581 (i.e. spectral radius of the method) in order so select optimal values for these parameters. 582 583 .seealso: [](ch_ts), `TS`, `TSALPHA`, `TSAlphaSetRadius()`, `TSAlphaSetParams()` 584 @*/ 585 PetscErrorCode TSAlphaGetParams(TS ts, PetscReal *alpha_m, PetscReal *alpha_f, PetscReal *gamma) 586 { 587 PetscFunctionBegin; 588 PetscValidHeaderSpecific(ts, TS_CLASSID, 1); 589 if (alpha_m) PetscAssertPointer(alpha_m, 2); 590 if (alpha_f) PetscAssertPointer(alpha_f, 3); 591 if (gamma) PetscAssertPointer(gamma, 4); 592 PetscUseMethod(ts, "TSAlphaGetParams_C", (TS, PetscReal *, PetscReal *, PetscReal *), (ts, alpha_m, alpha_f, gamma)); 593 PetscFunctionReturn(PETSC_SUCCESS); 594 } 595