1 #include <../src/tao/bound/impls/bnk/bnk.h>
2 #include <petscksp.h>
3
4 /*
5 Implements Newton's Method with a trust region approach for solving
6 bound constrained minimization problems.
7
8 In this variant, the trust region failures trigger a line search with
9 the existing Newton step instead of re-solving the step with a
10 different radius.
11
12 x_0 = VecMedian(x_0)
13 f_0, g_0 = TaoComputeObjectiveAndGradient(x_0)
14 pg_0 = project(g_0)
15 check convergence at pg_0
16 needH = TaoBNKInitialize(default:BNK_INIT_INTERPOLATION)
17 niter = 0
18 step_accepted = true
19
20 while niter <= max_it
21 niter += 1
22
23 if needH
24 If max_cg_steps > 0
25 x_k, g_k, pg_k = TaoSolve(BNCG)
26 end
27
28 H_k = TaoComputeHessian(x_k)
29 if pc_type == BNK_PC_BFGS
30 add correction to BFGS approx
31 if scale_type == BNK_SCALE_AHESS
32 D = VecMedian(1e-6, abs(diag(H_k)), 1e6)
33 scale BFGS with VecReciprocal(D)
34 end
35 end
36 needH = False
37 end
38
39 if pc_type = BNK_PC_BFGS
40 B_k = BFGS
41 else
42 B_k = VecMedian(1e-6, abs(diag(H_k)), 1e6)
43 B_k = VecReciprocal(B_k)
44 end
45 w = x_k - VecMedian(x_k - 0.001*B_k*g_k)
46 eps = min(eps, norm2(w))
47 determine the active and inactive index sets such that
48 L = {i : (x_k)_i <= l_i + eps && (g_k)_i > 0}
49 U = {i : (x_k)_i >= u_i - eps && (g_k)_i < 0}
50 F = {i : l_i = (x_k)_i = u_i}
51 A = {L + U + F}
52 IA = {i : i not in A}
53
54 generate the reduced system Hr_k dr_k = -gr_k for variables in IA
55 if pc_type == BNK_PC_BFGS && scale_type == BNK_SCALE_PHESS
56 D = VecMedian(1e-6, abs(diag(Hr_k)), 1e6)
57 scale BFGS with VecReciprocal(D)
58 end
59 solve Hr_k dr_k = -gr_k
60 set d_k to (l - x) for variables in L, (u - x) for variables in U, and 0 for variables in F
61
62 x_{k+1} = VecMedian(x_k + d_k)
63 s = x_{k+1} - x_k
64 prered = dot(s, 0.5*gr_k - Hr_k*s)
65 f_{k+1} = TaoComputeObjective(x_{k+1})
66 actred = f_k - f_{k+1}
67
68 oldTrust = trust
69 step_accepted, trust = TaoBNKUpdateTrustRadius(default: BNK_UPDATE_REDUCTION)
70 if step_accepted
71 g_{k+1} = TaoComputeGradient(x_{k+1})
72 pg_{k+1} = project(g_{k+1})
73 count the accepted Newton step
74 else
75 if dot(d_k, pg_k)) >= 0 || norm(d_k) == NaN || norm(d_k) == Inf
76 dr_k = -BFGS*gr_k for variables in I
77 if dot(d_k, pg_k)) >= 0 || norm(d_k) == NaN || norm(d_k) == Inf
78 reset the BFGS preconditioner
79 calculate scale delta and apply it to BFGS
80 dr_k = -BFGS*gr_k for variables in I
81 if dot(d_k, pg_k)) >= 0 || norm(d_k) == NaN || norm(d_k) == Inf
82 dr_k = -gr_k for variables in I
83 end
84 end
85 end
86
87 x_{k+1}, f_{k+1}, g_{k+1}, ls_failed = TaoBNKPerformLineSearch()
88 if ls_failed
89 f_{k+1} = f_k
90 x_{k+1} = x_k
91 g_{k+1} = g_k
92 pg_{k+1} = pg_k
93 terminate
94 else
95 pg_{k+1} = project(g_{k+1})
96 trust = oldTrust
97 trust = TaoBNKUpdateTrustRadius(BNK_UPDATE_STEP)
98 count the accepted step type (Newton, BFGS, scaled grad or grad)
99 end
100 end
101
102 check convergence at pg_{k+1}
103 end
104 */
105
TaoSolve_BNTL(Tao tao)106 PetscErrorCode TaoSolve_BNTL(Tao tao)
107 {
108 TAO_BNK *bnk = (TAO_BNK *)tao->data;
109 KSPConvergedReason ksp_reason;
110 TaoLineSearchConvergedReason ls_reason;
111
112 PetscReal oldTrust, prered, actred, steplen, resnorm;
113 PetscBool cgTerminate, needH = PETSC_TRUE, stepAccepted, shift = PETSC_FALSE;
114 PetscInt stepType, nDiff;
115
116 PetscFunctionBegin;
117 /* Initialize the preconditioner, KSP solver and trust radius/line search */
118 tao->reason = TAO_CONTINUE_ITERATING;
119 PetscCall(TaoBNKInitialize(tao, bnk->init_type, &needH));
120 if (tao->reason != TAO_CONTINUE_ITERATING) PetscFunctionReturn(PETSC_SUCCESS);
121
122 /* Have not converged; continue with Newton method */
123 while (tao->reason == TAO_CONTINUE_ITERATING) {
124 /* Call general purpose update function */
125 if (tao->ops->update) {
126 PetscUseTypeMethod(tao, update, tao->niter, tao->user_update);
127 PetscCall(TaoComputeObjective(tao, tao->solution, &bnk->f));
128 }
129
130 if (needH && bnk->inactive_idx) {
131 /* Take BNCG steps (if enabled) to trade-off Hessian evaluations for more gradient evaluations */
132 PetscCall(TaoBNKTakeCGSteps(tao, &cgTerminate));
133 if (cgTerminate) {
134 tao->reason = bnk->bncg->reason;
135 PetscFunctionReturn(PETSC_SUCCESS);
136 }
137 /* Compute the hessian and update the BFGS preconditioner at the new iterate */
138 PetscCall((*bnk->computehessian)(tao));
139 needH = PETSC_FALSE;
140 }
141
142 /* Use the common BNK kernel to compute the Newton step (for inactive variables only) */
143 PetscCall((*bnk->computestep)(tao, shift, &ksp_reason, &stepType));
144
145 /* Store current solution before it changes */
146 oldTrust = tao->trust;
147 bnk->fold = bnk->f;
148 PetscCall(VecCopy(tao->solution, bnk->Xold));
149 PetscCall(VecCopy(tao->gradient, bnk->Gold));
150 PetscCall(VecCopy(bnk->unprojected_gradient, bnk->unprojected_gradient_old));
151
152 /* Temporarily accept the step and project it into the bounds */
153 PetscCall(VecAXPY(tao->solution, 1.0, tao->stepdirection));
154 PetscCall(TaoBoundSolution(tao->solution, tao->XL, tao->XU, 0.0, &nDiff, tao->solution));
155
156 /* Check if the projection changed the step direction */
157 if (nDiff > 0) {
158 /* Projection changed the step, so we have to recompute the step and
159 the predicted reduction. Leave the trust radius unchanged. */
160 PetscCall(VecCopy(tao->solution, tao->stepdirection));
161 PetscCall(VecAXPY(tao->stepdirection, -1.0, bnk->Xold));
162 PetscCall(TaoBNKRecomputePred(tao, tao->stepdirection, &prered));
163 } else {
164 /* Step did not change, so we can just recover the pre-computed prediction */
165 PetscCall(KSPCGGetObjFcn(tao->ksp, &prered));
166 }
167 prered = -prered;
168
169 /* Compute the actual reduction and update the trust radius */
170 PetscCall(TaoComputeObjective(tao, tao->solution, &bnk->f));
171 PetscCheck(!PetscIsInfOrNanReal(bnk->f), PetscObjectComm((PetscObject)tao), PETSC_ERR_USER, "User provided compute function generated infinity or NaN");
172 actred = bnk->fold - bnk->f;
173 PetscCall(TaoBNKUpdateTrustRadius(tao, prered, actred, bnk->update_type, stepType, &stepAccepted));
174
175 if (stepAccepted) {
176 /* Step is good, evaluate the gradient and the hessian */
177 steplen = 1.0;
178 needH = PETSC_TRUE;
179 ++bnk->newt;
180 PetscCall(TaoComputeGradient(tao, tao->solution, bnk->unprojected_gradient));
181 PetscCall(TaoBNKEstimateActiveSet(tao, bnk->as_type));
182 PetscCall(VecCopy(bnk->unprojected_gradient, tao->gradient));
183 if (bnk->active_idx) PetscCall(VecISSet(tao->gradient, bnk->active_idx, 0.0));
184 PetscCall(TaoGradientNorm(tao, tao->gradient, NORM_2, &bnk->gnorm));
185 } else {
186 /* Trust-region rejected the step. Revert the solution. */
187 bnk->f = bnk->fold;
188 PetscCall(VecCopy(bnk->Xold, tao->solution));
189 /* Trigger the line search */
190 PetscCall(TaoBNKSafeguardStep(tao, ksp_reason, &stepType));
191 PetscCall(TaoBNKPerformLineSearch(tao, &stepType, &steplen, &ls_reason));
192 if (ls_reason != TAOLINESEARCH_SUCCESS && ls_reason != TAOLINESEARCH_SUCCESS_USER) {
193 /* Line search failed, revert solution and terminate */
194 stepAccepted = PETSC_FALSE;
195 needH = PETSC_FALSE;
196 bnk->f = bnk->fold;
197 PetscCall(VecCopy(bnk->Xold, tao->solution));
198 PetscCall(VecCopy(bnk->Gold, tao->gradient));
199 PetscCall(VecCopy(bnk->unprojected_gradient_old, bnk->unprojected_gradient));
200 tao->trust = 0.0;
201 tao->reason = TAO_DIVERGED_LS_FAILURE;
202 } else {
203 /* new iterate so we need to recompute the Hessian */
204 needH = PETSC_TRUE;
205 /* compute the projected gradient */
206 PetscCall(TaoBNKEstimateActiveSet(tao, bnk->as_type));
207 PetscCall(VecCopy(bnk->unprojected_gradient, tao->gradient));
208 if (bnk->active_idx) PetscCall(VecISSet(tao->gradient, bnk->active_idx, 0.0));
209 PetscCall(TaoGradientNorm(tao, tao->gradient, NORM_2, &bnk->gnorm));
210 /* Line search succeeded so we should update the trust radius based on the LS step length */
211 tao->trust = oldTrust;
212 PetscCall(TaoBNKUpdateTrustRadius(tao, prered, actred, BNK_UPDATE_STEP, stepType, &stepAccepted));
213 /* count the accepted step type */
214 PetscCall(TaoBNKAddStepCounts(tao, stepType));
215 }
216 }
217
218 /* Check for termination */
219 PetscCall(VecFischer(tao->solution, bnk->unprojected_gradient, tao->XL, tao->XU, bnk->W));
220 PetscCall(VecNorm(bnk->W, NORM_2, &resnorm));
221 PetscCheck(!PetscIsInfOrNanReal(resnorm), PetscObjectComm((PetscObject)tao), PETSC_ERR_USER, "User provided compute function generated infinity or NaN");
222 ++tao->niter;
223 PetscCall(TaoLogConvergenceHistory(tao, bnk->f, resnorm, 0.0, tao->ksp_its));
224 PetscCall(TaoMonitor(tao, tao->niter, bnk->f, resnorm, 0.0, steplen));
225 PetscUseTypeMethod(tao, convergencetest, tao->cnvP);
226 }
227 PetscFunctionReturn(PETSC_SUCCESS);
228 }
229
TaoSetUp_BNTL(Tao tao)230 static PetscErrorCode TaoSetUp_BNTL(Tao tao)
231 {
232 KSP ksp;
233 PetscBool valid;
234
235 PetscFunctionBegin;
236 PetscCall(TaoSetUp_BNK(tao));
237 PetscCall(TaoGetKSP(tao, &ksp));
238 PetscCall(PetscObjectHasFunction((PetscObject)ksp, "KSPCGSetRadius_C", &valid));
239 PetscCheck(valid, PetscObjectComm((PetscObject)tao), PETSC_ERR_SUP, "Not for KSP type %s. Must use a trust-region CG method for KSP (e.g. KSPNASH, KSPSTCG, KSPGLTR)", ((PetscObject)ksp)->type_name);
240 PetscFunctionReturn(PETSC_SUCCESS);
241 }
242
TaoSetFromOptions_BNTL(Tao tao,PetscOptionItems PetscOptionsObject)243 static PetscErrorCode TaoSetFromOptions_BNTL(Tao tao, PetscOptionItems PetscOptionsObject)
244 {
245 TAO_BNK *bnk = (TAO_BNK *)tao->data;
246
247 PetscFunctionBegin;
248 PetscCall(TaoSetFromOptions_BNK(tao, PetscOptionsObject));
249 if (bnk->update_type == BNK_UPDATE_STEP) bnk->update_type = BNK_UPDATE_REDUCTION;
250 PetscFunctionReturn(PETSC_SUCCESS);
251 }
252
253 /*MC
254 TAOBNTL - Bounded Newton Trust Region method with line-search fall-back for nonlinear
255 minimization with bound constraints.
256
257 Options Database Keys:
258 + -tao_bnk_max_cg_its - maximum number of bounded conjugate-gradient iterations taken in each Newton loop
259 . -tao_bnk_init_type - trust radius initialization method ("constant", "direction", "interpolation")
260 . -tao_bnk_update_type - trust radius update method ("step", "direction", "interpolation")
261 - -tao_bnk_as_type - active-set estimation method ("none", "bertsekas")
262
263 Level: beginner
264
265 Developer Note:
266 One should control the maximum number of cg iterations through the standard pc_max_it option not with a special
267 ad hoc option
268
269 M*/
TaoCreate_BNTL(Tao tao)270 PETSC_EXTERN PetscErrorCode TaoCreate_BNTL(Tao tao)
271 {
272 TAO_BNK *bnk;
273
274 PetscFunctionBegin;
275 PetscCall(TaoCreate_BNK(tao));
276 tao->ops->solve = TaoSolve_BNTL;
277 tao->ops->setup = TaoSetUp_BNTL;
278 tao->ops->setfromoptions = TaoSetFromOptions_BNTL;
279
280 bnk = (TAO_BNK *)tao->data;
281 bnk->update_type = BNK_UPDATE_REDUCTION; /* trust region updates based on predicted/actual reduction */
282 PetscFunctionReturn(PETSC_SUCCESS);
283 }
284