1a5eb4965SSatish Balay #ifdef PETSC_RCS_HEADER 2*3a40ed3dSBarry Smith static char vcid[] = "$Id: snesut.c,v 1.32 1997/08/22 15:17:50 bsmith Exp bsmith $"; 3e7e93795SLois Curfman McInnes #endif 4e7e93795SLois Curfman McInnes 5e7e93795SLois Curfman McInnes #include <math.h> 670f55243SBarry Smith #include "src/snes/snesimpl.h" /*I "snes.h" I*/ 7e7e93795SLois Curfman McInnes 85615d1e5SSatish Balay #undef __FUNC__ 9d4bb536fSBarry Smith #define __FUNC__ "SNESDefaultMonitor" 104b828684SBarry Smith /*@C 11f525115eSLois Curfman McInnes SNESDefaultMonitor - Monitoring progress of the SNES solvers (default). 12e7e93795SLois Curfman McInnes 13e7e93795SLois Curfman McInnes Input Parameters: 14e7e93795SLois Curfman McInnes . snes - the SNES context 15e7e93795SLois Curfman McInnes . its - iteration number 16e7e93795SLois Curfman McInnes . fgnorm - 2-norm of residual (or gradient) 17e7e93795SLois Curfman McInnes . dummy - unused context 18e7e93795SLois Curfman McInnes 19e7e93795SLois Curfman McInnes Notes: 20e7e93795SLois Curfman McInnes For SNES_NONLINEAR_EQUATIONS methods the routine prints the 21e7e93795SLois Curfman McInnes residual norm at each iteration. 22e7e93795SLois Curfman McInnes 23e7e93795SLois Curfman McInnes For SNES_UNCONSTRAINED_MINIMIZATION methods the routine prints the 24e7e93795SLois Curfman McInnes function value and gradient norm at each iteration. 25e7e93795SLois Curfman McInnes 26e7e93795SLois Curfman McInnes .keywords: SNES, nonlinear, default, monitor, norm 27e7e93795SLois Curfman McInnes 28e7e93795SLois Curfman McInnes .seealso: SNESSetMonitor() 29e7e93795SLois Curfman McInnes @*/ 30e7e93795SLois Curfman McInnes int SNESDefaultMonitor(SNES snes,int its,double fgnorm,void *dummy) 31e7e93795SLois Curfman McInnes { 32*3a40ed3dSBarry Smith PetscFunctionBegin; 33e7e93795SLois Curfman McInnes if (snes->method_class == SNES_NONLINEAR_EQUATIONS) 3477c4ece6SBarry Smith PetscPrintf(snes->comm, "iter = %d, SNES Function norm %g \n",its,fgnorm); 35e7e93795SLois Curfman McInnes else if (snes->method_class == SNES_UNCONSTRAINED_MINIMIZATION) 36*3a40ed3dSBarry Smith PetscPrintf(snes->comm,"iter = %d, SNES Function value %g, Gradient norm %g \n",its,snes->fc,fgnorm); 37e3372554SBarry Smith else SETERRQ(1,0,"Unknown method class"); 38*3a40ed3dSBarry Smith PetscFunctionReturn(0); 39e7e93795SLois Curfman McInnes } 40e7e93795SLois Curfman McInnes /* ---------------------------------------------------------------- */ 415615d1e5SSatish Balay #undef __FUNC__ 42d4bb536fSBarry Smith #define __FUNC__ "SNESDefaultSMonitor" 43be1f7002SBarry Smith /* 44be1f7002SBarry Smith Default (short) SNES Monitor, same as SNESDefaultMonitor() except 45be1f7002SBarry Smith it prints fewer digits of the residual as the residual gets smaller. 46be1f7002SBarry Smith This is because the later digits are meaningless and are often 47be1f7002SBarry Smith different on different machines; by using this routine different 48be1f7002SBarry Smith machines will usually generate the same output. 49be1f7002SBarry Smith */ 50e7e93795SLois Curfman McInnes int SNESDefaultSMonitor(SNES snes,int its, double fgnorm,void *dummy) 51e7e93795SLois Curfman McInnes { 52*3a40ed3dSBarry Smith PetscFunctionBegin; 53e7e93795SLois Curfman McInnes if (snes->method_class == SNES_NONLINEAR_EQUATIONS) { 548f240d10SBarry Smith if (fgnorm > 1.e-9) { 55c7ab52efSLois Curfman McInnes PetscPrintf(snes->comm, "iter = %d, SNES Function norm %g \n",its,fgnorm); 56*3a40ed3dSBarry Smith } else if (fgnorm > 1.e-11){ 57c7ab52efSLois Curfman McInnes PetscPrintf(snes->comm, "iter = %d, SNES Function norm %5.3e \n",its,fgnorm); 58*3a40ed3dSBarry Smith } else { 59c7ab52efSLois Curfman McInnes PetscPrintf(snes->comm, "iter = %d, SNES Function norm < 1.e-11\n",its); 60e7e93795SLois Curfman McInnes } 61e7e93795SLois Curfman McInnes } else if (snes->method_class == SNES_UNCONSTRAINED_MINIMIZATION) { 628f240d10SBarry Smith if (fgnorm > 1.e-9) { 6377c4ece6SBarry Smith PetscPrintf(snes->comm, 64*3a40ed3dSBarry Smith "iter = %d, SNES Function value %g, Gradient norm %g \n",its,snes->fc,fgnorm); 65*3a40ed3dSBarry Smith } else if (fgnorm > 1.e-11) { 6677c4ece6SBarry Smith PetscPrintf(snes->comm, 67*3a40ed3dSBarry Smith "iter = %d, SNES Function value %g, Gradient norm %5.3e \n",its,snes->fc,fgnorm); 68*3a40ed3dSBarry Smith } else { 6977c4ece6SBarry Smith PetscPrintf(snes->comm, 70*3a40ed3dSBarry Smith "iter = %d, SNES Function value %g, Gradient norm < 1.e-11\n",its,snes->fc); 71e7e93795SLois Curfman McInnes } 72e3372554SBarry Smith } else SETERRQ(1,0,"Unknown method class"); 73*3a40ed3dSBarry Smith PetscFunctionReturn(0); 74e7e93795SLois Curfman McInnes } 75e7e93795SLois Curfman McInnes /* ---------------------------------------------------------------- */ 765615d1e5SSatish Balay #undef __FUNC__ 775615d1e5SSatish Balay #define __FUNC__ "SNESConverged_EQ_LS" 784b828684SBarry Smith /*@C 79f525115eSLois Curfman McInnes SNESConverged_EQ_LS - Monitors the convergence of the solvers for 80f525115eSLois Curfman McInnes systems of nonlinear equations (default). 81e7e93795SLois Curfman McInnes 82e7e93795SLois Curfman McInnes Input Parameters: 83e7e93795SLois Curfman McInnes . snes - the SNES context 84e7e93795SLois Curfman McInnes . xnorm - 2-norm of current iterate 85e7e93795SLois Curfman McInnes . pnorm - 2-norm of current step 86e7e93795SLois Curfman McInnes . fnorm - 2-norm of function 87e7e93795SLois Curfman McInnes . dummy - unused context 88e7e93795SLois Curfman McInnes 89e7e93795SLois Curfman McInnes Returns: 90e7e93795SLois Curfman McInnes $ 2 if ( fnorm < atol ), 91e7e93795SLois Curfman McInnes $ 3 if ( pnorm < xtol*xnorm ), 925d2e0e51SBarry Smith $ 4 if ( fnorm < rtol*fnorm0 ), 93e7e93795SLois Curfman McInnes $ -2 if ( nfct > maxf ), 94e7e93795SLois Curfman McInnes $ 0 otherwise, 95e7e93795SLois Curfman McInnes 96e7e93795SLois Curfman McInnes where 97e7e93795SLois Curfman McInnes $ maxf - maximum number of function evaluations, 98acd914d5SLois Curfman McInnes $ set with SNESSetTolerances() 99e7e93795SLois Curfman McInnes $ nfct - number of function evaluations, 100e7e93795SLois Curfman McInnes $ atol - absolute function norm tolerance, 101acd914d5SLois Curfman McInnes $ set with SNESSetTolerances() 102d7a720efSLois Curfman McInnes $ rtol - relative function norm tolerance, 103acd914d5SLois Curfman McInnes $ set with SNESSetTolerances() 104e7e93795SLois Curfman McInnes 105e7e93795SLois Curfman McInnes .keywords: SNES, nonlinear, default, converged, convergence 106e7e93795SLois Curfman McInnes 107e7e93795SLois Curfman McInnes .seealso: SNESSetConvergenceTest(), SNESEisenstatWalkerConverged() 108e7e93795SLois Curfman McInnes @*/ 10940191667SLois Curfman McInnes int SNESConverged_EQ_LS(SNES snes,double xnorm,double pnorm,double fnorm,void *dummy) 110e7e93795SLois Curfman McInnes { 111*3a40ed3dSBarry Smith PetscFunctionBegin; 112d252947aSBarry Smith if (snes->method_class != SNES_NONLINEAR_EQUATIONS) { 113d252947aSBarry Smith SETERRQ(1,0,"For SNES_NONLINEAR_EQUATIONS only"); 114d252947aSBarry Smith } 115082acdaeSLois Curfman McInnes /* Note: Reserve return code 1, -1 for compatibility with SNESConverged_EQ_TR */ 116d252947aSBarry Smith if (fnorm != fnorm) { 117d252947aSBarry Smith PLogInfo(snes,"SNES:Failed to converged, function norm is NaN\n"); 118*3a40ed3dSBarry Smith PetscFunctionReturn(-3); 119d252947aSBarry Smith } 1205d2e0e51SBarry Smith if (fnorm <= snes->ttol) { 12194a424c1SBarry Smith PLogInfo(snes, 1225d2e0e51SBarry Smith "SNES:Converged due to function norm %g < %g (relative tolerance)\n",fnorm,snes->ttol); 123*3a40ed3dSBarry Smith PetscFunctionReturn(4); 1245d2e0e51SBarry Smith } 1255d2e0e51SBarry Smith 126e7e93795SLois Curfman McInnes if (fnorm < snes->atol) { 12794a424c1SBarry Smith PLogInfo(snes, 1280de55854SLois Curfman McInnes "SNES: Converged due to function norm %g < %g\n",fnorm,snes->atol); 129*3a40ed3dSBarry Smith PetscFunctionReturn(2); 130e7e93795SLois Curfman McInnes } 131e7e93795SLois Curfman McInnes if (pnorm < snes->xtol*(xnorm)) { 13294a424c1SBarry Smith PLogInfo(snes, 133e7e93795SLois Curfman McInnes "SNES: Converged due to small update length: %g < %g * %g\n", 134e7e93795SLois Curfman McInnes pnorm,snes->xtol,xnorm); 135*3a40ed3dSBarry Smith PetscFunctionReturn(3); 136e7e93795SLois Curfman McInnes } 137e7e93795SLois Curfman McInnes if (snes->nfuncs > snes->max_funcs) { 138d252947aSBarry Smith PLogInfo(snes,"SNES: Exceeded maximum number of function evaluations: %d > %d\n", 139e7e93795SLois Curfman McInnes snes->nfuncs, snes->max_funcs ); 140*3a40ed3dSBarry Smith PetscFunctionReturn(-2); 141e7e93795SLois Curfman McInnes } 142*3a40ed3dSBarry Smith PetscFunctionReturn(0); 143e7e93795SLois Curfman McInnes } 144e7e93795SLois Curfman McInnes /* ------------------------------------------------------------ */ 1455615d1e5SSatish Balay #undef __FUNC__ 1465615d1e5SSatish Balay #define __FUNC__ "SNES_KSP_SetConvergenceTestEW" 147e7e93795SLois Curfman McInnes /*@ 148f525115eSLois Curfman McInnes SNES_KSP_SetConvergenceTestEW - Sets alternative convergence test 149e7e93795SLois Curfman McInnes for the linear solvers within an inexact Newton method. 150e7e93795SLois Curfman McInnes 151e7e93795SLois Curfman McInnes Input Parameter: 152e7e93795SLois Curfman McInnes . snes - SNES context 153e7e93795SLois Curfman McInnes 154e7e93795SLois Curfman McInnes Notes: 155e7e93795SLois Curfman McInnes Currently, the default is to use a constant relative tolerance for 156e7e93795SLois Curfman McInnes the inner linear solvers. Alternatively, one can use the 157e7e93795SLois Curfman McInnes Eisenstat-Walker method, where the relative convergence tolerance 158e7e93795SLois Curfman McInnes is reset at each Newton iteration according progress of the nonlinear 159e7e93795SLois Curfman McInnes solver. 160e7e93795SLois Curfman McInnes 161e7e93795SLois Curfman McInnes Reference: 162e7e93795SLois Curfman McInnes S. C. Eisenstat and H. F. Walker, "Choosing the forcing terms in an 163e7e93795SLois Curfman McInnes inexact Newton method", Utah State University Math. Stat. Dept. Res. 164e7e93795SLois Curfman McInnes Report 6/94/75, June, 1994, to appear in SIAM J. Sci. Comput. 165e7e93795SLois Curfman McInnes 166e7e93795SLois Curfman McInnes .keywords: SNES, KSP, Eisenstat, Walker, convergence, test, inexact, Newton 167e7e93795SLois Curfman McInnes @*/ 168e7e93795SLois Curfman McInnes int SNES_KSP_SetConvergenceTestEW(SNES snes) 169e7e93795SLois Curfman McInnes { 170*3a40ed3dSBarry Smith PetscFunctionBegin; 171e7e93795SLois Curfman McInnes snes->ksp_ewconv = 1; 172*3a40ed3dSBarry Smith PetscFunctionReturn(0); 173e7e93795SLois Curfman McInnes } 174e7e93795SLois Curfman McInnes 1755615d1e5SSatish Balay #undef __FUNC__ 1765615d1e5SSatish Balay #define __FUNC__ "SNES_KSP_SetParametersEW" 177e7e93795SLois Curfman McInnes /*@ 178e7e93795SLois Curfman McInnes SNES_KSP_SetParametersEW - Sets parameters for Eisenstat-Walker 179e7e93795SLois Curfman McInnes convergence criteria for the linear solvers within an inexact 180e7e93795SLois Curfman McInnes Newton method. 181e7e93795SLois Curfman McInnes 182e7e93795SLois Curfman McInnes Input Parameters: 183e7e93795SLois Curfman McInnes . snes - SNES context 184e7e93795SLois Curfman McInnes . version - version 1 or 2 (default is 2) 185e7e93795SLois Curfman McInnes . rtol_0 - initial relative tolerance 186e7e93795SLois Curfman McInnes $ (0 <= rtol_0 < 1) 187e7e93795SLois Curfman McInnes . rtol_max - maximum relative tolerance 188e7e93795SLois Curfman McInnes $ (0 <= rtol_max < 1) 189e7e93795SLois Curfman McInnes . alpha - power for version 2 rtol computation 190e7e93795SLois Curfman McInnes $ (1 < alpha <= 2) 191e7e93795SLois Curfman McInnes . alpha2 - power for safeguard 192e7e93795SLois Curfman McInnes . gamma2 - multiplicative factor for version 2 rtol computation 193e7e93795SLois Curfman McInnes $ (0 <= gamma2 <= 1) 194e7e93795SLois Curfman McInnes . threshold - threshold for imposing safeguard 195e7e93795SLois Curfman McInnes $ (0 < threshold < 1) 196e7e93795SLois Curfman McInnes 197e7e93795SLois Curfman McInnes Note: 198e7e93795SLois Curfman McInnes Use PETSC_DEFAULT to retain the default for any of the parameters. 199e7e93795SLois Curfman McInnes 200e7e93795SLois Curfman McInnes Reference: 201e7e93795SLois Curfman McInnes S. C. Eisenstat and H. F. Walker, "Choosing the forcing terms in an 202e7e93795SLois Curfman McInnes inexact Newton method", Utah State University Math. Stat. Dept. Res. 203e7e93795SLois Curfman McInnes Report 6/94/75, June, 1994, to appear in SIAM J. Sci. Comput. 204e7e93795SLois Curfman McInnes 205e7e93795SLois Curfman McInnes .keywords: SNES, KSP, Eisenstat, Walker, set, parameters 206e7e93795SLois Curfman McInnes 207e7e93795SLois Curfman McInnes .seealso: SNES_KSP_SetConvergenceTestEW() 208e7e93795SLois Curfman McInnes @*/ 209e7e93795SLois Curfman McInnes int SNES_KSP_SetParametersEW(SNES snes,int version,double rtol_0, 210e7e93795SLois Curfman McInnes double rtol_max,double gamma2,double alpha, 211e7e93795SLois Curfman McInnes double alpha2,double threshold) 212e7e93795SLois Curfman McInnes { 213e7e93795SLois Curfman McInnes SNES_KSP_EW_ConvCtx *kctx = (SNES_KSP_EW_ConvCtx*)snes->kspconvctx; 214*3a40ed3dSBarry Smith 215*3a40ed3dSBarry Smith PetscFunctionBegin; 216e3372554SBarry Smith if (!kctx) SETERRQ(1,0,"No context"); 217e7e93795SLois Curfman McInnes if (version != PETSC_DEFAULT) kctx->version = version; 218e7e93795SLois Curfman McInnes if (rtol_0 != PETSC_DEFAULT) kctx->rtol_0 = rtol_0; 219e7e93795SLois Curfman McInnes if (rtol_max != PETSC_DEFAULT) kctx->rtol_max = rtol_max; 220e7e93795SLois Curfman McInnes if (gamma2 != PETSC_DEFAULT) kctx->gamma = gamma2; 221e7e93795SLois Curfman McInnes if (alpha != PETSC_DEFAULT) kctx->alpha = alpha; 222e7e93795SLois Curfman McInnes if (alpha2 != PETSC_DEFAULT) kctx->alpha2 = alpha2; 223e7e93795SLois Curfman McInnes if (threshold != PETSC_DEFAULT) kctx->threshold = threshold; 224e3372554SBarry Smith if (kctx->rtol_0 < 0.0 || kctx->rtol_0 >= 1.0) SETERRQ(1,0, 22563c41f6aSSatish Balay "0.0 <= rtol_0 < 1.0\n"); 226e3372554SBarry Smith if (kctx->rtol_max < 0.0 || kctx->rtol_max >= 1.0) SETERRQ(1,0, 22763c41f6aSSatish Balay "0.0 <= rtol_max < 1.0\n"); 228e3372554SBarry Smith if (kctx->threshold <= 0.0 || kctx->threshold >= 1.0) SETERRQ(1,0, 22963c41f6aSSatish Balay "0.0 < threshold < 1.0\n"); 230e3372554SBarry Smith if (kctx->gamma < 0.0 || kctx->gamma > 1.0) SETERRQ(1,0, 23163c41f6aSSatish Balay "0.0 <= alpha <= 1.0\n"); 232e3372554SBarry Smith if (kctx->alpha <= 1.0 || kctx->alpha > 2.0) SETERRQ(1,0, 23363c41f6aSSatish Balay "1.0 < alpha <= 2.0\n"); 234e3372554SBarry Smith if (kctx->version != 1 && kctx->version !=2) SETERRQ(1,0, 23563c41f6aSSatish Balay "Only versions 1 and 2 are supported"); 236*3a40ed3dSBarry Smith PetscFunctionReturn(0); 237e7e93795SLois Curfman McInnes } 238e7e93795SLois Curfman McInnes 2395615d1e5SSatish Balay #undef __FUNC__ 2405615d1e5SSatish Balay #define __FUNC__ "SNES_KSP_EW_ComputeRelativeTolerance_Private" 241e7e93795SLois Curfman McInnes int SNES_KSP_EW_ComputeRelativeTolerance_Private(SNES snes,KSP ksp) 242e7e93795SLois Curfman McInnes { 243e7e93795SLois Curfman McInnes SNES_KSP_EW_ConvCtx *kctx = (SNES_KSP_EW_ConvCtx*)snes->kspconvctx; 244e7e93795SLois Curfman McInnes double rtol, stol; 245e7e93795SLois Curfman McInnes int ierr; 246*3a40ed3dSBarry Smith 247*3a40ed3dSBarry Smith PetscFunctionBegin; 248*3a40ed3dSBarry Smith if (!kctx) SETERRQ(1,0,"No context"); 249e7e93795SLois Curfman McInnes if (snes->iter == 1) { 250e7e93795SLois Curfman McInnes rtol = kctx->rtol_0; 251e7e93795SLois Curfman McInnes } else { 252e7e93795SLois Curfman McInnes if (kctx->version == 1) { 253e7e93795SLois Curfman McInnes rtol = (snes->norm - kctx->lresid_last)/kctx->norm_last; 254e7e93795SLois Curfman McInnes if (rtol < 0.0) rtol = -rtol; 255e7e93795SLois Curfman McInnes stol = pow(kctx->rtol_last,kctx->alpha2); 2560452661fSBarry Smith if (stol > kctx->threshold) rtol = PetscMax(rtol,stol); 257e7e93795SLois Curfman McInnes } else if (kctx->version == 2) { 258e7e93795SLois Curfman McInnes rtol = kctx->gamma * pow(snes->norm/kctx->norm_last,kctx->alpha); 259e7e93795SLois Curfman McInnes stol = kctx->gamma * pow(kctx->rtol_last,kctx->alpha); 2600452661fSBarry Smith if (stol > kctx->threshold) rtol = PetscMax(rtol,stol); 261*3a40ed3dSBarry Smith } else SETERRQ(1,0,"Only versions 1 or 2 are supported"); 262e7e93795SLois Curfman McInnes } 2630452661fSBarry Smith rtol = PetscMin(rtol,kctx->rtol_max); 264e7e93795SLois Curfman McInnes kctx->rtol_last = rtol; 26594a424c1SBarry Smith PLogInfo(snes, 266e7e93795SLois Curfman McInnes "SNES: iter %d, Eisenstat-Walker (version %d) KSP rtol = %g\n", 267e7e93795SLois Curfman McInnes snes->iter,kctx->version,rtol); 2683131a8b6SLois Curfman McInnes ierr = KSPSetTolerances(ksp,rtol,PETSC_DEFAULT,PETSC_DEFAULT,PETSC_DEFAULT); CHKERRQ(ierr); 269e7e93795SLois Curfman McInnes kctx->norm_last = snes->norm; 270*3a40ed3dSBarry Smith PetscFunctionReturn(0); 271e7e93795SLois Curfman McInnes } 272e7e93795SLois Curfman McInnes 2735615d1e5SSatish Balay #undef __FUNC__ 2745615d1e5SSatish Balay #define __FUNC__ "SNES_KSP_EW_Converged_Private" 275e7e93795SLois Curfman McInnes int SNES_KSP_EW_Converged_Private(KSP ksp,int n,double rnorm,void *ctx) 276e7e93795SLois Curfman McInnes { 277e7e93795SLois Curfman McInnes SNES snes = (SNES)ctx; 278e7e93795SLois Curfman McInnes SNES_KSP_EW_ConvCtx *kctx = (SNES_KSP_EW_ConvCtx*)snes->kspconvctx; 279e7e93795SLois Curfman McInnes int convinfo; 280e7e93795SLois Curfman McInnes 281*3a40ed3dSBarry Smith PetscFunctionBegin; 282e3372554SBarry Smith if (!kctx) SETERRQ(1,0,"No convergence context"); 283e7e93795SLois Curfman McInnes if (n == 0) SNES_KSP_EW_ComputeRelativeTolerance_Private(snes,ksp); 284e7e93795SLois Curfman McInnes convinfo = KSPDefaultConverged(ksp,n,rnorm,ctx); 285e7e93795SLois Curfman McInnes kctx->lresid_last = rnorm; 286*3a40ed3dSBarry Smith if (convinfo) { 28794a424c1SBarry Smith PLogInfo(snes,"SNES: KSP iterations=%d, rnorm=%g\n",n,rnorm); 288*3a40ed3dSBarry Smith } 289*3a40ed3dSBarry Smith PetscFunctionReturn(convinfo); 290e7e93795SLois Curfman McInnes } 291e7e93795SLois Curfman McInnes 292e7e93795SLois Curfman McInnes 293