****************************************************************************** * linear function - full rank * more, garbow, and hillstrom, acm toms vol. 7 no. 1 (march 1981) 17-41 ****************************************************************************** subroutine getfun( x, n, f, m, ftf, fj, lfj, g, mode) implicit double precision (a-h,o-z) integer n, m, lfj, mode double precision x(n), f(m), ftf, fj(lfj,n), g(n) integer nprob, nprobs, nstart, nstrts common /PROBLM/ nprob, nprobs, nstart, nstrts integer nout common /IOUNIT/ nout logical lf, lj integer na, nb, nc, nd, nt, nh double precision zero, one, two parameter (zero = 0.d0, one = 1.d0, two = 2.d0) *======================================================================= if (mode .eq. 0) goto 20 if (mode .eq. -1) goto 10 if (mode .eq. -2) goto 30 na = mode / 1000 nt = mode - na*1000 nb = nt / 100 nh = nt - nb*100 nc = nh / 10 nd = nh - nc*10 lf = (na .ne. 0) .or. (nb .ne. 0) .or. (nd .ne. 0) lj = (nc .ne. 0) .or. (nd .ne. 0) if (lf .and. lj) goto 300 if (lf) goto 100 if (lj) goto 200 *----------------------------------------------------------------------- 10 continue nprobs = 1 nstrts = 1 n = 10 m = 20 dnfi2 = two / dble(m) if (nout .gt. 0) write( nout, 9999) n, m return *----------------------------------------------------------------------- 20 continue call dcopy( n, one, 0, x, 1) return *----------------------------------------------------------------------- 30 continue call dcopy( n, (-one), 0, x, 1) c ftf = (dble(m - n)) ftf = 10.d0 return *----------------------------------------------------------------------- 100 continue sum = zero do 110 j = 1, n sum = sum + x(j) 110 continue do 120 i = 1, m if (i .le. n) f(i) = x(i) - dnfi2*sum - one if (i .gt. n) f(i) = - dnfi2*sum - one 120 continue if (nb .ne. 0) ftf = ddot( m, f, 1, f, 1) return 200 continue do 210 i = 1, m do 210 j = 1, n if (i .le. n) fj(i,j) = -dnfi2 if (i .le. n) fj(i,i) = one - dnfi2 if (i .gt. n) fj(i,j) = -dnfi2 210 continue return 300 continue sum = zero do 310 j = 1, n sum = sum + x(j) 310 continue do 320 i = 1, m if (i .le. n) f(i) = x(i) - dnfi2*sum - one if (i .gt. n) f(i) = - dnfi2*sum - one do 320 j = 1, n if (i .le. n) fj(i,j) = -dnfi2 if (i .le. n) fj(i,i) = one - dnfi2 if (i .gt. n) fj(i,j) = -dnfi2 320 continue if (nb .ne. 0) ftf = ddot( m, f, 1, f, 1) if (nd .eq. 0) return do 400 j = 1, n g(j) = ddot( m, fj( 1, j), 1, f, 1) 400 continue return 9999 format(/'1',70('=')//, *' linear function - full rank (more et al.)'//, *' number of variables =', i4,' (variable)'/, *' number of functions =', i4,' ( >= n )'//, * ' ',70('=')/) end ************************************************************************ ************************************************************************ subroutine dfjdxk ( k, x, n, dfj, ldfj, m, nonzro) implicit double precision (a-h,o-z) integer k, n, ldfj, m, nonzro(n) double precision x(n), dfj(ldfj,n) integer j double precision zero parameter (zero = 0.d0) *======================================================================= do 100 j = 1, n nonzro(j) = 0 call dcopy( m, zero, 0, dfj( 1, j), 1) 100 continue return end ************************************************************************ ************************************************************************ subroutine dfkdij( k, x, n, hess, lhess, linear) implicit double precision (a-h,o-z) logical linear integer k, n, lhess double precision x(n), hess(lhess,n) integer j double precision zero parameter (zero = 0.d0) *======================================================================= do 100 j = 1, n call dcopy( n, zero, 0, hess( 1, j), 1) 100 continue linear = .true. return end