1 #include <petscsys.h> 2 #include <petscblaslapack.h> 3 4 static PetscErrorCode estsv(PetscInt n, PetscReal *r, PetscInt ldr, PetscReal *svmin, PetscReal *z) 5 { 6 PetscBLASInt blas1=1, blasn, blasnmi, blasj, blasldr; 7 PetscInt i,j; 8 PetscReal e,temp,w,wm,ynorm,znorm,s,sm; 9 PetscErrorCode ierr; 10 11 PetscFunctionBegin; 12 ierr = PetscBLASIntCast(n,&blasn);CHKERRQ(ierr); 13 ierr = PetscBLASIntCast(ldr,&blasldr);CHKERRQ(ierr); 14 for (i=0;i<n;i++) { 15 z[i]=0.0; 16 } 17 e = PetscAbs(r[0]); 18 if (e == 0.0) { 19 *svmin = 0.0; 20 z[0] = 1.0; 21 } else { 22 /* Solve R'*y = e */ 23 for (i=0;i<n;i++) { 24 /* Scale y. The scaling factor (0.01) reduces the number of scalings */ 25 if (z[i] >= 0.0) e =-PetscAbs(e); 26 else e = PetscAbs(e); 27 28 if (PetscAbs(e - z[i]) > PetscAbs(r[i + ldr*i])) { 29 temp = PetscMin(0.01,PetscAbs(r[i + ldr*i]))/PetscAbs(e-z[i]); 30 PetscStackCallBLAS("BLASscal",BLASscal_(&blasn, &temp, z, &blas1)); 31 e = temp*e; 32 } 33 34 /* Determine the two possible choices of y[i] */ 35 if (r[i + ldr*i] == 0.0) { 36 w = wm = 1.0; 37 } else { 38 w = (e - z[i]) / r[i + ldr*i]; 39 wm = - (e + z[i]) / r[i + ldr*i]; 40 } 41 42 /* Chose y[i] based on the predicted value of y[j] for j>i */ 43 s = PetscAbs(e - z[i]); 44 sm = PetscAbs(e + z[i]); 45 for (j=i+1;j<n;j++) { 46 sm += PetscAbs(z[j] + wm * r[i + ldr*j]); 47 } 48 if (i < n-1) { 49 ierr = PetscBLASIntCast(n-i-1,&blasnmi);CHKERRQ(ierr); 50 PetscStackCallBLAS("BLASaxpy",BLASaxpy_(&blasnmi, &w, &r[i + ldr*(i+1)], &blasldr, &z[i+1], &blas1)); 51 PetscStackCallBLAS("BLASasum",s += BLASasum_(&blasnmi, &z[i+1], &blas1)); 52 } 53 if (s < sm) { 54 temp = wm - w; 55 w = wm; 56 if (i < n-1) { 57 PetscStackCallBLAS("BLASaxpy",BLASaxpy_(&blasnmi, &temp, &r[i + ldr*(i+1)], &blasldr, &z[i+1], &blas1)); 58 } 59 } 60 z[i] = w; 61 } 62 63 PetscStackCallBLAS("BLASnrm2",ynorm = BLASnrm2_(&blasn, z, &blas1)); 64 65 /* Solve R*z = y */ 66 for (j=n-1; j>=0; j--) { 67 /* Scale z */ 68 if (PetscAbs(z[j]) > PetscAbs(r[j + ldr*j])) { 69 temp = PetscMin(0.01, PetscAbs(r[j + ldr*j] / z[j])); 70 PetscStackCallBLAS("BLASscal",BLASscal_(&blasn, &temp, z, &blas1)); 71 ynorm *=temp; 72 } 73 if (r[j + ldr*j] == 0) { 74 z[j] = 1.0; 75 } else { 76 z[j] = z[j] / r[j + ldr*j]; 77 } 78 temp = -z[j]; 79 ierr = PetscBLASIntCast(j,&blasj);CHKERRQ(ierr); 80 PetscStackCallBLAS("BLASaxpy",BLASaxpy_(&blasj,&temp,&r[0+ldr*j],&blas1,z,&blas1)); 81 } 82 83 /* Compute svmin and normalize z */ 84 PetscStackCallBLAS("BLASnrm2",znorm = 1.0 / BLASnrm2_(&blasn, z, &blas1)); 85 *svmin = ynorm*znorm; 86 PetscStackCallBLAS("BLASscal",BLASscal_(&blasn, &znorm, z, &blas1)); 87 } 88 PetscFunctionReturn(0); 89 } 90 91 /* 92 c *********** 93 c 94 c Subroutine gqt 95 c 96 c Given an n by n symmetric matrix A, an n-vector b, and a 97 c positive number delta, this subroutine determines a vector 98 c x which approximately minimizes the quadratic function 99 c 100 c f(x) = (1/2)*x'*A*x + b'*x 101 c 102 c subject to the Euclidean norm constraint 103 c 104 c norm(x) <= delta. 105 c 106 c This subroutine computes an approximation x and a Lagrange 107 c multiplier par such that either par is zero and 108 c 109 c norm(x) <= (1+rtol)*delta, 110 c 111 c or par is positive and 112 c 113 c abs(norm(x) - delta) <= rtol*delta. 114 c 115 c If xsol is the solution to the problem, the approximation x 116 c satisfies 117 c 118 c f(x) <= ((1 - rtol)**2)*f(xsol) 119 c 120 c The subroutine statement is 121 c 122 c subroutine gqt(n,a,lda,b,delta,rtol,atol,itmax, 123 c par,f,x,info,z,wa1,wa2) 124 c 125 c where 126 c 127 c n is an integer variable. 128 c On entry n is the order of A. 129 c On exit n is unchanged. 130 c 131 c a is a double precision array of dimension (lda,n). 132 c On entry the full upper triangle of a must contain the 133 c full upper triangle of the symmetric matrix A. 134 c On exit the array contains the matrix A. 135 c 136 c lda is an integer variable. 137 c On entry lda is the leading dimension of the array a. 138 c On exit lda is unchanged. 139 c 140 c b is an double precision array of dimension n. 141 c On entry b specifies the linear term in the quadratic. 142 c On exit b is unchanged. 143 c 144 c delta is a double precision variable. 145 c On entry delta is a bound on the Euclidean norm of x. 146 c On exit delta is unchanged. 147 c 148 c rtol is a double precision variable. 149 c On entry rtol is the relative accuracy desired in the 150 c solution. Convergence occurs if 151 c 152 c f(x) <= ((1 - rtol)**2)*f(xsol) 153 c 154 c On exit rtol is unchanged. 155 c 156 c atol is a double precision variable. 157 c On entry atol is the absolute accuracy desired in the 158 c solution. Convergence occurs when 159 c 160 c norm(x) <= (1 + rtol)*delta 161 c 162 c max(-f(x),-f(xsol)) <= atol 163 c 164 c On exit atol is unchanged. 165 c 166 c itmax is an integer variable. 167 c On entry itmax specifies the maximum number of iterations. 168 c On exit itmax is unchanged. 169 c 170 c par is a double precision variable. 171 c On entry par is an initial estimate of the Lagrange 172 c multiplier for the constraint norm(x) <= delta. 173 c On exit par contains the final estimate of the multiplier. 174 c 175 c f is a double precision variable. 176 c On entry f need not be specified. 177 c On exit f is set to f(x) at the output x. 178 c 179 c x is a double precision array of dimension n. 180 c On entry x need not be specified. 181 c On exit x is set to the final estimate of the solution. 182 c 183 c info is an integer variable. 184 c On entry info need not be specified. 185 c On exit info is set as follows: 186 c 187 c info = 1 The function value f(x) has the relative 188 c accuracy specified by rtol. 189 c 190 c info = 2 The function value f(x) has the absolute 191 c accuracy specified by atol. 192 c 193 c info = 3 Rounding errors prevent further progress. 194 c On exit x is the best available approximation. 195 c 196 c info = 4 Failure to converge after itmax iterations. 197 c On exit x is the best available approximation. 198 c 199 c z is a double precision work array of dimension n. 200 c 201 c wa1 is a double precision work array of dimension n. 202 c 203 c wa2 is a double precision work array of dimension n. 204 c 205 c Subprograms called 206 c 207 c MINPACK-2 ...... destsv 208 c 209 c LAPACK ......... dpotrf 210 c 211 c Level 1 BLAS ... daxpy, dcopy, ddot, dnrm2, dscal 212 c 213 c Level 2 BLAS ... dtrmv, dtrsv 214 c 215 c MINPACK-2 Project. October 1993. 216 c Argonne National Laboratory and University of Minnesota. 217 c Brett M. Averick, Richard Carter, and Jorge J. More' 218 c 219 c *********** 220 */ 221 PetscErrorCode gqt(PetscInt n, PetscReal *a, PetscInt lda, PetscReal *b, 222 PetscReal delta, PetscReal rtol, PetscReal atol, 223 PetscInt itmax, PetscReal *retpar, PetscReal *retf, 224 PetscReal *x, PetscInt *retinfo, PetscInt *retits, 225 PetscReal *z, PetscReal *wa1, PetscReal *wa2) 226 { 227 PetscErrorCode ierr; 228 PetscReal f=0.0,p001=0.001,p5=0.5,minusone=-1,delta2=delta*delta; 229 PetscInt iter, j, rednc,info; 230 PetscBLASInt indef; 231 PetscBLASInt blas1=1, blasn, iblas, blaslda, blasldap1, blasinfo; 232 PetscReal alpha, anorm, bnorm, parc, parf, parl, pars, par=*retpar,paru, prod, rxnorm, rznorm=0.0, temp, xnorm; 233 234 PetscFunctionBegin; 235 ierr = PetscBLASIntCast(n,&blasn);CHKERRQ(ierr); 236 ierr = PetscBLASIntCast(lda,&blaslda);CHKERRQ(ierr); 237 ierr = PetscBLASIntCast(lda+1,&blasldap1);CHKERRQ(ierr); 238 parf = 0.0; 239 xnorm = 0.0; 240 rxnorm = 0.0; 241 rednc = 0; 242 for (j=0; j<n; j++) { 243 x[j] = 0.0; 244 z[j] = 0.0; 245 } 246 247 /* Copy the diagonal and save A in its lower triangle */ 248 PetscStackCallBLAS("BLAScopy",BLAScopy_(&blasn,a,&blasldap1, wa1, &blas1)); 249 for (j=0;j<n-1;j++) { 250 ierr = PetscBLASIntCast(n - j - 1,&iblas);CHKERRQ(ierr); 251 PetscStackCallBLAS("BLAScopy",BLAScopy_(&iblas,&a[j + lda*(j+1)], &blaslda, &a[j+1 + lda*j], &blas1)); 252 } 253 254 /* Calculate the l1-norm of A, the Gershgorin row sums, and the 255 l2-norm of b */ 256 anorm = 0.0; 257 for (j=0;j<n;j++) { 258 PetscStackCallBLAS("BLASasum",wa2[j] = BLASasum_(&blasn, &a[0 + lda*j], &blas1));CHKMEMQ; 259 anorm = PetscMax(anorm,wa2[j]); 260 } 261 for (j=0;j<n;j++) { 262 wa2[j] = wa2[j] - PetscAbs(wa1[j]); 263 } 264 PetscStackCallBLAS("BLASnrm2",bnorm = BLASnrm2_(&blasn,b,&blas1));CHKMEMQ; 265 /* Calculate a lower bound, pars, for the domain of the problem. 266 Also calculate an upper bound, paru, and a lower bound, parl, 267 for the Lagrange multiplier. */ 268 pars = parl = paru = -anorm; 269 for (j=0;j<n;j++) { 270 pars = PetscMax(pars, -wa1[j]); 271 parl = PetscMax(parl, wa1[j] + wa2[j]); 272 paru = PetscMax(paru, -wa1[j] + wa2[j]); 273 } 274 parl = PetscMax(bnorm/delta - parl,pars); 275 parl = PetscMax(0.0,parl); 276 paru = PetscMax(0.0, bnorm/delta + paru); 277 278 /* If the input par lies outside of the interval (parl, paru), 279 set par to the closer endpoint. */ 280 281 par = PetscMax(par,parl); 282 par = PetscMin(par,paru); 283 284 /* Special case: parl == paru */ 285 paru = PetscMax(paru, (1.0 + rtol)*parl); 286 287 /* Beginning of an iteration */ 288 289 info = 0; 290 for (iter=1;iter<=itmax;iter++) { 291 /* Safeguard par */ 292 if (par <= pars && paru > 0) { 293 par = PetscMax(p001, PetscSqrtScalar(parl/paru)) * paru; 294 } 295 296 /* Copy the lower triangle of A into its upper triangle and compute A + par*I */ 297 298 for (j=0;j<n-1;j++) { 299 ierr = PetscBLASIntCast(n - j - 1,&iblas);CHKERRQ(ierr); 300 PetscStackCallBLAS("BLAScopy",BLAScopy_(&iblas,&a[j+1 + j*lda], &blas1,&a[j + (j+1)*lda], &blaslda)); 301 } 302 for (j=0;j<n;j++) { 303 a[j + j*lda] = wa1[j] + par; 304 } 305 306 /* Attempt the Cholesky factorization of A without referencing the lower triangular part. */ 307 PetscStackCallBLAS("LAPACKpotrf",LAPACKpotrf_("U",&blasn,a,&blaslda,&indef)); 308 309 /* Case 1: A + par*I is pos. def. */ 310 if (indef == 0) { 311 312 /* Compute an approximate solution x and save the last value of par with A + par*I pos. def. */ 313 314 parf = par; 315 PetscStackCallBLAS("BLAScopy",BLAScopy_(&blasn, b, &blas1, wa2, &blas1)); 316 PetscStackCallBLAS("LAPACKtrtrs",LAPACKtrtrs_("U","T","N",&blasn,&blas1,a,&blaslda,wa2,&blasn,&blasinfo)); 317 if (blasinfo) SETERRQ1(PETSC_COMM_SELF,PETSC_ERR_LIB,"LAPACKtrtrs() returned info %d",blasinfo); 318 PetscStackCallBLAS("BLASnrm2",rxnorm = BLASnrm2_(&blasn, wa2, &blas1)); 319 PetscStackCallBLAS("LAPACKtrtrs",LAPACKtrtrs_("U","N","N",&blasn,&blas1,a,&blaslda,wa2,&blasn,&blasinfo)); 320 if (blasinfo) SETERRQ1(PETSC_COMM_SELF,PETSC_ERR_LIB,"LAPACKtrtrs() returned info %d",blasinfo); 321 322 PetscStackCallBLAS("BLAScopy",BLAScopy_(&blasn, wa2, &blas1, x, &blas1)); 323 PetscStackCallBLAS("BLASscal",BLASscal_(&blasn, &minusone, x, &blas1)); 324 PetscStackCallBLAS("BLASnrm2",xnorm = BLASnrm2_(&blasn, x, &blas1));CHKMEMQ; 325 326 /* Test for convergence */ 327 if (PetscAbs(xnorm - delta) <= rtol*delta || (par == 0 && xnorm <= (1.0+rtol)*delta)) { 328 info = 1; 329 } 330 331 /* Compute a direction of negative curvature and use this information to improve pars. */ 332 ierr = estsv(n,a,lda,&rznorm,z);CHKERRQ(ierr);CHKMEMQ; 333 pars = PetscMax(pars, par-rznorm*rznorm); 334 335 /* Compute a negative curvature solution of the form x + alpha*z, where norm(x+alpha*z)==delta */ 336 337 rednc = 0; 338 if (xnorm < delta) { 339 /* Compute alpha */ 340 PetscStackCallBLAS("BLASdot",prod = BLASdot_(&blasn, z, &blas1, x, &blas1)/delta); 341 temp = (delta - xnorm)*((delta + xnorm)/delta); 342 alpha = temp/(PetscAbs(prod) + PetscSqrtScalar(prod*prod + temp/delta)); 343 if (prod >= 0) alpha = PetscAbs(alpha); 344 else alpha =-PetscAbs(alpha); 345 346 /* Test to decide if the negative curvature step produces a larger reduction than with z=0 */ 347 rznorm = PetscAbs(alpha) * rznorm; 348 if ((rznorm*rznorm + par*xnorm*xnorm)/(delta2) <= par) { 349 rednc = 1; 350 } 351 /* Test for convergence */ 352 if (p5 * rznorm*rznorm / delta2 <= rtol*(1.0-p5*rtol)*(par + rxnorm*rxnorm/delta2)) { 353 info = 1; 354 } else if (info == 0 && (p5*(par + rxnorm*rxnorm/delta2) <= atol/delta2)) { 355 info = 2; 356 } 357 } 358 359 /* Compute the Newton correction parc to par. */ 360 if (xnorm == 0) { 361 parc = -par; 362 } else { 363 PetscStackCallBLAS("BLAScopy",BLAScopy_(&blasn, x, &blas1, wa2, &blas1)); 364 temp = 1.0/xnorm; 365 PetscStackCallBLAS("BLASscal",BLASscal_(&blasn, &temp, wa2, &blas1)); 366 PetscStackCallBLAS("LAPACKtrtrs",LAPACKtrtrs_("U","T","N",&blasn, &blas1, a, &blaslda, wa2, &blasn, &blasinfo)); 367 if (blasinfo) SETERRQ1(PETSC_COMM_SELF,PETSC_ERR_LIB,"LAPACKtrtrs() returned info %d",blasinfo); 368 PetscStackCallBLAS("BLASnrm2",temp = BLASnrm2_(&blasn, wa2, &blas1)); 369 parc = (xnorm - delta)/(delta*temp*temp); 370 } 371 372 /* update parl or paru */ 373 if (xnorm > delta) { 374 parl = PetscMax(parl, par); 375 } else if (xnorm < delta) { 376 paru = PetscMin(paru, par); 377 } 378 } else { 379 /* Case 2: A + par*I is not pos. def. */ 380 381 /* Use the rank information from the Cholesky decomposition to update par. */ 382 383 if (indef > 1) { 384 /* Restore column indef to A + par*I. */ 385 iblas = indef - 1; 386 PetscStackCallBLAS("BLAScopy",BLAScopy_(&iblas,&a[indef-1 + 0*lda],&blaslda,&a[0 + (indef-1)*lda],&blas1)); 387 a[indef-1 + (indef-1)*lda] = wa1[indef-1] + par; 388 389 /* compute parc. */ 390 PetscStackCallBLAS("BLAScopy",BLAScopy_(&iblas,&a[0 + (indef-1)*lda], &blas1, wa2, &blas1)); 391 PetscStackCallBLAS("LAPACKtrtrs",LAPACKtrtrs_("U","T","N",&iblas,&blas1,a,&blaslda,wa2,&blasn,&blasinfo)); 392 if (blasinfo) SETERRQ1(PETSC_COMM_SELF,PETSC_ERR_LIB,"LAPACKtrtrs() returned info %d",blasinfo); 393 PetscStackCallBLAS("BLAScopy",BLAScopy_(&iblas,wa2,&blas1,&a[0 + (indef-1)*lda],&blas1)); 394 PetscStackCallBLAS("BLASnrm2",temp = BLASnrm2_(&iblas,&a[0 + (indef-1)*lda],&blas1));CHKMEMQ; 395 a[indef-1 + (indef-1)*lda] -= temp*temp; 396 PetscStackCallBLAS("LAPACKtrtrs",LAPACKtrtrs_("U","N","N",&iblas,&blas1,a,&blaslda,wa2,&blasn,&blasinfo)); 397 if (blasinfo) SETERRQ1(PETSC_COMM_SELF,PETSC_ERR_LIB,"LAPACKtrtrs() returned info %d",blasinfo); 398 } 399 400 wa2[indef-1] = -1.0; 401 iblas = indef; 402 PetscStackCallBLAS("BLASnrm2",temp = BLASnrm2_(&iblas,wa2,&blas1)); 403 parc = - a[indef-1 + (indef-1)*lda]/(temp*temp); 404 pars = PetscMax(pars,par+parc); 405 406 /* If necessary, increase paru slightly. 407 This is needed because in some exceptional situations 408 paru is the optimal value of par. */ 409 410 paru = PetscMax(paru, (1.0+rtol)*pars); 411 } 412 413 /* Use pars to update parl */ 414 parl = PetscMax(parl,pars); 415 416 /* Test for converged. */ 417 if (info == 0) { 418 if (iter == itmax) info=4; 419 if (paru <= (1.0+p5*rtol)*pars) info=3; 420 if (paru == 0.0) info = 2; 421 } 422 423 /* If exiting, store the best approximation and restore 424 the upper triangle of A. */ 425 426 if (info != 0) { 427 /* Compute the best current estimates for x and f. */ 428 par = parf; 429 f = -p5 * (rxnorm*rxnorm + par*xnorm*xnorm); 430 if (rednc) { 431 f = -p5 * (rxnorm*rxnorm + par*delta*delta - rznorm*rznorm); 432 PetscStackCallBLAS("BLASaxpy",BLASaxpy_(&blasn, &alpha, z, &blas1, x, &blas1)); 433 } 434 /* Restore the upper triangle of A */ 435 for (j = 0; j<n; j++) { 436 ierr = PetscBLASIntCast(n - j - 1,&iblas);CHKERRQ(ierr); 437 PetscStackCallBLAS("BLAScopy",BLAScopy_(&iblas,&a[j+1 + j*lda],&blas1, &a[j + (j+1)*lda],&blaslda)); 438 } 439 ierr = PetscBLASIntCast(lda+1,&iblas);CHKERRQ(ierr); 440 PetscStackCallBLAS("BLAScopy",BLAScopy_(&blasn,wa1,&blas1,a,&iblas)); 441 break; 442 } 443 par = PetscMax(parl,par+parc); 444 } 445 *retpar = par; 446 *retf = f; 447 *retinfo = info; 448 *retits = iter; 449 CHKMEMQ; 450 PetscFunctionReturn(0); 451 } 452