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update Octave Project Developers copyright for the new year In files that have the "Octave Project Developers" copyright notice, update for 2021. In all .txi and .texi files except gpl.txi and gpl.texi in the doc/liboctave and doc/interpreter directories, change the copyright to "Octave Project Developers", the same as used for other source files. Update copyright notices for 2022 (not done since 2019). For gpl.txi and gpl.texi, change the copyright notice to be "Free Software Foundation, Inc." and leave the date at 2007 only because this file only contains the text of the GPL, not anything created by the Octave Project Developers. Add Paul Thomas to contributors.in.
author John W. Eaton <jwe@octave.org>
date Tue, 28 Dec 2021 18:22:40 -0500
parents 0a5b15007766
children 597f3ee61a48
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c Copyright (C) 2010-2022 The Octave Project Developers
c
c See the file COPYRIGHT.md in the top-level directory of this
c distribution or <https://octave.org/copyright/>.
c
c This file is part of Octave.
c
c Octave is free software: you can redistribute it and/or modify it
c under the terms of the GNU General Public License as published by
c the Free Software Foundation, either version 3 of the License, or
c (at your option) any later version.
c
c Octave is distributed in the hope that it will be useful, but
c WITHOUT ANY WARRANTY; without even the implied warranty of
c MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the
c GNU General Public License for more details.
c
c You should have received a copy of the GNU General Public License
c along with Octave; see the file COPYING.  If not, see
c <https://www.gnu.org/licenses/>.
c

       subroutine zrsf2csf(n,t,u,c,s)
       integer n
       double complex t(n,n),u(n,n)
       double precision c(n-1),s(n-1)
       double precision x,y,z
       integer j
       do j = 1,n-1
          c(j) = 1
       end do
       j = 1
       do while (j < n)
c apply previous rotations to rows
         call zrcrot1(j,t(1,j),c,s)

         y = t(j+1,j)
         if (y /= 0) then
c 2x2 block, form Givens rotation [c, i*s; i*s, c]
           z = t(j,j+1)
           c(j) = sqrt(z/(z-y))
           s(j) = sqrt(y/(y-z))
c apply new rotation to t(j:j+1,j)
           call zrcrot1(2,t(j,j),c(j),s(j))
c apply all rotations to t(1:j+1,j+1)
           call zrcrot1(j+1,t(1,j+1),c,s)
c apply new rotation to columns j,j+1
           call zrcrot2(j+1,t(1,j),t(1,j+1),c(j),s(j))
c zero subdiagonal entry, skip next row
           t(j+1,j) = 0
           j = j + 2
         else
           j = j + 1
         end if
       end do

c apply rotations to last column if needed
       if (j == n) then
         call zrcrot1(j,t(1,j),c,s)
       end if

c apply stored rotations to all columns of u
       do j = 1,n-1
         if (c(j) /= 1) then
           call zrcrot2(n,u(1,j),u(1,j+1),c(j),s(j))
         end if
       end do

       end subroutine

       subroutine zrcrot1(n,x,c,s)
c apply rotations to a column from the left
       integer n
       double complex x(n), t
       double precision c(n-1),s(n-1)
       integer i
       do i = 1,n-1
         if (c(i) /= 1) then
           t = x(i)*c(i) - x(i+1)*dcmplx(0,s(i))
           x(i+1) = x(i+1)*c(i) - x(i)*dcmplx(0,s(i))
           x(i) = t
         endif
       end do
       end subroutine

       subroutine zrcrot2(n,x,y,c,s)
c apply a single rotation from the right to a pair of columns
       integer n
       double complex x(n),y(n),t
       double precision c, s
       integer i
       do i = 1,n
         t = x(i)*c + y(i)*dcmplx(0,s)
         y(i) = y(i)*c + x(i)*dcmplx(0,s)
         x(i) = t
       end do
       end subroutine