1eb910715SAlp Dener #include <../src/tao/bound/impls/bnk/bnk.h> 2eb910715SAlp Dener #include <petscksp.h> 3eb910715SAlp Dener 4eb910715SAlp Dener /* 5198282dbSAlp Dener Implements Newton's Method with a line search approach for 6198282dbSAlp Dener solving bound constrained minimization problems. 7eb910715SAlp Dener 8198282dbSAlp Dener ------------------------------------------------------------ 9eb910715SAlp Dener 10198282dbSAlp Dener x_0 = VecMedian(x_0) 11198282dbSAlp Dener f_0, g_0 = TaoComputeObjectiveAndGradient(x_0) 12c4b75bccSAlp Dener pg_0 = project(g_0) 13198282dbSAlp Dener check convergence at pg_0 14c4b75bccSAlp Dener needH = TaoBNKInitialize(default:BNK_INIT_DIRECTION) 15198282dbSAlp Dener niter = 0 16c4b75bccSAlp Dener step_accepted = true 17198282dbSAlp Dener 18198282dbSAlp Dener while niter < max_it 19198282dbSAlp Dener niter += 1 20c4b75bccSAlp Dener 21c4b75bccSAlp Dener if needH 22c4b75bccSAlp Dener If max_cg_steps > 0 23c4b75bccSAlp Dener x_k, g_k, pg_k = TaoSolve(BNCG) 24c4b75bccSAlp Dener end 25c4b75bccSAlp Dener 26198282dbSAlp Dener H_k = TaoComputeHessian(x_k) 27198282dbSAlp Dener if pc_type == BNK_PC_BFGS 28198282dbSAlp Dener add correction to BFGS approx 29198282dbSAlp Dener if scale_type == BNK_SCALE_AHESS 30198282dbSAlp Dener D = VecMedian(1e-6, abs(diag(H_k)), 1e6) 31198282dbSAlp Dener scale BFGS with VecReciprocal(D) 32198282dbSAlp Dener end 33198282dbSAlp Dener end 34c4b75bccSAlp Dener needH = False 35c4b75bccSAlp Dener end 36198282dbSAlp Dener 37198282dbSAlp Dener if pc_type = BNK_PC_BFGS 38198282dbSAlp Dener B_k = BFGS 39198282dbSAlp Dener else 40198282dbSAlp Dener B_k = VecMedian(1e-6, abs(diag(H_k)), 1e6) 41198282dbSAlp Dener B_k = VecReciprocal(B_k) 42198282dbSAlp Dener end 43198282dbSAlp Dener w = x_k - VecMedian(x_k - 0.001*B_k*g_k) 44198282dbSAlp Dener eps = min(eps, norm2(w)) 45198282dbSAlp Dener determine the active and inactive index sets such that 46198282dbSAlp Dener L = {i : (x_k)_i <= l_i + eps && (g_k)_i > 0} 47198282dbSAlp Dener U = {i : (x_k)_i >= u_i - eps && (g_k)_i < 0} 48198282dbSAlp Dener F = {i : l_i = (x_k)_i = u_i} 49198282dbSAlp Dener A = {L + U + F} 50c4b75bccSAlp Dener IA = {i : i not in A} 51198282dbSAlp Dener 52c4b75bccSAlp Dener generate the reduced system Hr_k dr_k = -gr_k for variables in IA 53198282dbSAlp Dener if p > 0 54c4b75bccSAlp Dener Hr_k += p* 55198282dbSAlp Dener end 56198282dbSAlp Dener if pc_type == BNK_PC_BFGS && scale_type == BNK_SCALE_PHESS 57198282dbSAlp Dener D = VecMedian(1e-6, abs(diag(Hr_k)), 1e6) 58198282dbSAlp Dener scale BFGS with VecReciprocal(D) 59198282dbSAlp Dener end 60198282dbSAlp Dener solve Hr_k dr_k = -gr_k 61198282dbSAlp Dener set d_k to (l - x) for variables in L, (u - x) for variables in U, and 0 for variables in F 62198282dbSAlp Dener 63198282dbSAlp Dener if dot(d_k, pg_k)) >= 0 || norm(d_k) == NaN || norm(d_k) == Inf 64198282dbSAlp Dener dr_k = -BFGS*gr_k for variables in I 65198282dbSAlp Dener if dot(d_k, pg_k)) >= 0 || norm(d_k) == NaN || norm(d_k) == Inf 66198282dbSAlp Dener reset the BFGS preconditioner 67198282dbSAlp Dener calculate scale delta and apply it to BFGS 68198282dbSAlp Dener dr_k = -BFGS*gr_k for variables in I 69198282dbSAlp Dener if dot(d_k, pg_k)) >= 0 || norm(d_k) == NaN || norm(d_k) == Inf 70198282dbSAlp Dener dr_k = -gr_k for variables in I 71198282dbSAlp Dener end 72198282dbSAlp Dener end 73198282dbSAlp Dener end 74198282dbSAlp Dener 75198282dbSAlp Dener x_{k+1}, f_{k+1}, g_{k+1}, ls_failed = TaoBNKPerformLineSearch() 76198282dbSAlp Dener if ls_failed 77198282dbSAlp Dener f_{k+1} = f_k 78198282dbSAlp Dener x_{k+1} = x_k 79198282dbSAlp Dener g_{k+1} = g_k 80198282dbSAlp Dener pg_{k+1} = pg_k 81198282dbSAlp Dener terminate 82198282dbSAlp Dener else 83c4b75bccSAlp Dener pg_{k+1} = project(g_{k+1}) 84198282dbSAlp Dener count the accepted step type (Newton, BFGS, scaled grad or grad) 85198282dbSAlp Dener end 86198282dbSAlp Dener 87198282dbSAlp Dener check convergence at pg_{k+1} 88198282dbSAlp Dener end 89eb910715SAlp Dener */ 90eb910715SAlp Dener 91e0ed867bSAlp Dener PetscErrorCode TaoSolve_BNLS(Tao tao) 92eb910715SAlp Dener { 93eb910715SAlp Dener TAO_BNK *bnk = (TAO_BNK *)tao->data; 94e465cd6fSAlp Dener KSPConvergedReason ksp_reason; 95eb910715SAlp Dener TaoLineSearchConvergedReason ls_reason; 9689da521bSAlp Dener PetscReal steplen = 1.0, resnorm; 97937a31a1SAlp Dener PetscBool cgTerminate, needH = PETSC_TRUE, stepAccepted, shift = PETSC_TRUE; 98eb910715SAlp Dener PetscInt stepType; 99eb910715SAlp Dener 100eb910715SAlp Dener PetscFunctionBegin; 10128017e9fSAlp Dener /* Initialize the preconditioner, KSP solver and trust radius/line search */ 102eb910715SAlp Dener tao->reason = TAO_CONTINUE_ITERATING; 103*9566063dSJacob Faibussowitsch PetscCall(TaoBNKInitialize(tao, bnk->init_type, &needH)); 10428017e9fSAlp Dener if (tao->reason != TAO_CONTINUE_ITERATING) PetscFunctionReturn(0); 105eb910715SAlp Dener 106eb910715SAlp Dener /* Have not converged; continue with Newton method */ 107eb910715SAlp Dener while (tao->reason == TAO_CONTINUE_ITERATING) { 108e1e80dc8SAlp Dener /* Call general purpose update function */ 109e1e80dc8SAlp Dener if (tao->ops->update) { 110*9566063dSJacob Faibussowitsch PetscCall((*tao->ops->update)(tao, tao->niter, tao->user_update)); 111e1e80dc8SAlp Dener } 112eb910715SAlp Dener ++tao->niter; 113eb910715SAlp Dener 11489da521bSAlp Dener if (needH && bnk->inactive_idx) { 115c0f10754SAlp Dener /* Take BNCG steps (if enabled) to trade-off Hessian evaluations for more gradient evaluations */ 116*9566063dSJacob Faibussowitsch PetscCall(TaoBNKTakeCGSteps(tao, &cgTerminate)); 117c0f10754SAlp Dener if (cgTerminate) { 118c0f10754SAlp Dener tao->reason = bnk->bncg->reason; 119c0f10754SAlp Dener PetscFunctionReturn(0); 120c0f10754SAlp Dener } 12108752603SAlp Dener /* Compute the hessian and update the BFGS preconditioner at the new iterate */ 122*9566063dSJacob Faibussowitsch PetscCall((*bnk->computehessian)(tao)); 123937a31a1SAlp Dener needH = PETSC_FALSE; 124937a31a1SAlp Dener } 125fed79b8eSAlp Dener 1268d5ead36SAlp Dener /* Use the common BNK kernel to compute the safeguarded Newton step (for inactive variables only) */ 127*9566063dSJacob Faibussowitsch PetscCall((*bnk->computestep)(tao, shift, &ksp_reason, &stepType)); 128*9566063dSJacob Faibussowitsch PetscCall(TaoBNKSafeguardStep(tao, ksp_reason, &stepType)); 129eb910715SAlp Dener 130080d2917SAlp Dener /* Store current solution before it changes */ 131080d2917SAlp Dener bnk->fold = bnk->f; 132*9566063dSJacob Faibussowitsch PetscCall(VecCopy(tao->solution, bnk->Xold)); 133*9566063dSJacob Faibussowitsch PetscCall(VecCopy(tao->gradient, bnk->Gold)); 134*9566063dSJacob Faibussowitsch PetscCall(VecCopy(bnk->unprojected_gradient, bnk->unprojected_gradient_old)); 135eb910715SAlp Dener 136c14b763aSAlp Dener /* Trigger the line search */ 137*9566063dSJacob Faibussowitsch PetscCall(TaoBNKPerformLineSearch(tao, &stepType, &steplen, &ls_reason)); 138eb910715SAlp Dener 139eb910715SAlp Dener if (ls_reason != TAOLINESEARCH_SUCCESS && ls_reason != TAOLINESEARCH_SUCCESS_USER) { 140eb910715SAlp Dener /* Failed to find an improving point */ 141937a31a1SAlp Dener needH = PETSC_FALSE; 142080d2917SAlp Dener bnk->f = bnk->fold; 143*9566063dSJacob Faibussowitsch PetscCall(VecCopy(bnk->Xold, tao->solution)); 144*9566063dSJacob Faibussowitsch PetscCall(VecCopy(bnk->Gold, tao->gradient)); 145*9566063dSJacob Faibussowitsch PetscCall(VecCopy(bnk->unprojected_gradient_old, bnk->unprojected_gradient)); 146c14b763aSAlp Dener steplen = 0.0; 147eb910715SAlp Dener tao->reason = TAO_DIVERGED_LS_FAILURE; 148e465cd6fSAlp Dener } else { 149937a31a1SAlp Dener /* new iterate so we need to recompute the Hessian */ 150937a31a1SAlp Dener needH = PETSC_TRUE; 151198282dbSAlp Dener /* compute the projected gradient */ 152*9566063dSJacob Faibussowitsch PetscCall(TaoBNKEstimateActiveSet(tao, bnk->as_type)); 153*9566063dSJacob Faibussowitsch PetscCall(VecCopy(bnk->unprojected_gradient, tao->gradient)); 154*9566063dSJacob Faibussowitsch PetscCall(VecISSet(tao->gradient, bnk->active_idx, 0.0)); 155*9566063dSJacob Faibussowitsch PetscCall(TaoGradientNorm(tao, tao->gradient, NORM_2, &bnk->gnorm)); 1569b6ef848SAlp Dener /* update the trust radius based on the step length */ 157*9566063dSJacob Faibussowitsch PetscCall(TaoBNKUpdateTrustRadius(tao, 0.0, 0.0, BNK_UPDATE_STEP, stepType, &stepAccepted)); 15862675beeSAlp Dener /* count the accepted step type */ 159*9566063dSJacob Faibussowitsch PetscCall(TaoBNKAddStepCounts(tao, stepType)); 160937a31a1SAlp Dener /* active BNCG recycling for next iteration */ 161*9566063dSJacob Faibussowitsch PetscCall(TaoSetRecycleHistory(bnk->bncg, PETSC_TRUE)); 162eb910715SAlp Dener } 163eb910715SAlp Dener 164eb910715SAlp Dener /* Check for termination */ 165*9566063dSJacob Faibussowitsch PetscCall(VecFischer(tao->solution, bnk->unprojected_gradient, tao->XL, tao->XU, bnk->W)); 166*9566063dSJacob Faibussowitsch PetscCall(VecNorm(bnk->W, NORM_2, &resnorm)); 1673c859ba3SBarry Smith PetscCheck(!PetscIsInfOrNanReal(resnorm),PetscObjectComm((PetscObject)tao),PETSC_ERR_USER, "User provided compute function generated Inf or NaN"); 168*9566063dSJacob Faibussowitsch PetscCall(TaoLogConvergenceHistory(tao, bnk->f, resnorm, 0.0, tao->ksp_its)); 169*9566063dSJacob Faibussowitsch PetscCall(TaoMonitor(tao, tao->niter, bnk->f, resnorm, 0.0, steplen)); 170*9566063dSJacob Faibussowitsch PetscCall((*tao->ops->convergencetest)(tao, tao->cnvP)); 171eb910715SAlp Dener } 172eb910715SAlp Dener PetscFunctionReturn(0); 173eb910715SAlp Dener } 174eb910715SAlp Dener 175df278d8fSAlp Dener /*------------------------------------------------------------*/ 1763850be85SAlp Dener /*MC 1773850be85SAlp Dener TAOBNLS - Bounded Newton Line Search for nonlinear minimization with bound constraints. 178df278d8fSAlp Dener 1793850be85SAlp Dener Options Database Keys: 1803850be85SAlp Dener + -tao_bnk_max_cg_its - maximum number of bounded conjugate-gradient iterations taken in each Newton loop 1813850be85SAlp Dener . -tao_bnk_init_type - trust radius initialization method ("constant", "direction", "interpolation") 1823850be85SAlp Dener . -tao_bnk_update_type - trust radius update method ("step", "direction", "interpolation") 1833850be85SAlp Dener - -tao_bnk_as_type - active-set estimation method ("none", "bertsekas") 1843850be85SAlp Dener 1853850be85SAlp Dener Level: beginner 1863850be85SAlp Dener M*/ 187e0ed867bSAlp Dener PETSC_EXTERN PetscErrorCode TaoCreate_BNLS(Tao tao) 188eb910715SAlp Dener { 189fed79b8eSAlp Dener TAO_BNK *bnk; 190eb910715SAlp Dener 191eb910715SAlp Dener PetscFunctionBegin; 192*9566063dSJacob Faibussowitsch PetscCall(TaoCreate_BNK(tao)); 193eb910715SAlp Dener tao->ops->solve = TaoSolve_BNLS; 194fed79b8eSAlp Dener 195fed79b8eSAlp Dener bnk = (TAO_BNK *)tao->data; 196e031d6f5SAlp Dener bnk->init_type = BNK_INIT_DIRECTION; 19766ed3702SAlp Dener bnk->update_type = BNK_UPDATE_STEP; /* trust region updates based on line search step length */ 198eb910715SAlp Dener PetscFunctionReturn(0); 199eb910715SAlp Dener } 200