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-version 1.5, 2010/12/21 13:53:35
+version 1.16, 2023/08/07 08:39:03
  Line 1
-       SUBROUTINE DPFTRF( TRANSR, UPLO, N, A, INFO )
+ *> \brief \b DPFTRF
+ *
+ *  =========== DOCUMENTATION ===========
  *
- *  -- LAPACK routine (version 3.3.0)                                    --
+ * Online html documentation available at
+ *            http://www.netlib.org/lapack/explore-html/
  *
- *  -- Contributed by Fred Gustavson of the IBM Watson Research Center --
+ *> \htmlonly
- *     November 2010
+ *> Download DPFTRF + dependencies
+ *> <a href="http://www.netlib.org/cgi-bin/netlibfiles.tgz?format=tgz&filename=/lapack/lapack_routine/dpftrf.f">
+ *> [TGZ]</a>
+ *> <a href="http://www.netlib.org/cgi-bin/netlibfiles.zip?format=zip&filename=/lapack/lapack_routine/dpftrf.f">
+ *> [ZIP]</a>
+ *> <a href="http://www.netlib.org/cgi-bin/netlibfiles.txt?format=txt&filename=/lapack/lapack_routine/dpftrf.f">
+ *> [TXT]</a>
+ *> \endhtmlonly
+ *
+ *  Definition:
+ *  ===========
+ *
+ *       SUBROUTINE DPFTRF( TRANSR, UPLO, N, A, INFO )
+ *
+ *       .. Scalar Arguments ..
+ *       CHARACTER          TRANSR, UPLO
+ *       INTEGER            N, INFO
+ *       ..
+ *       .. Array Arguments ..
+ *       DOUBLE PRECISION   A( 0: * )
+ *
+ *
+ *> \par Purpose:
+ *  =============
+ *>
+ *> \verbatim
+ *>
+ *> DPFTRF computes the Cholesky factorization of a real symmetric
+ *> positive definite matrix A.
+ *>
+ *> The factorization has the form
+ *>    A = U**T * U,  if UPLO = 'U', or
+ *>    A = L  * L**T,  if UPLO = 'L',
+ *> where U is an upper triangular matrix and L is lower triangular.
+ *>
+ *> This is the block version of the algorithm, calling Level 3 BLAS.
+ *> \endverbatim
+ *
+ *  Arguments:
+ *  ==========
+ *
+ *> \param[in] TRANSR
+ *> \verbatim
+ *>          TRANSR is CHARACTER*1
+ *>          = 'N':  The Normal TRANSR of RFP A is stored;
+ *>          = 'T':  The Transpose TRANSR of RFP A is stored.
+ *> \endverbatim
+ *>
+ *> \param[in] UPLO
+ *> \verbatim
+ *>          UPLO is CHARACTER*1
+ *>          = 'U':  Upper triangle of RFP A is stored;
+ *>          = 'L':  Lower triangle of RFP A is stored.
+ *> \endverbatim
+ *>
+ *> \param[in] N
+ *> \verbatim
+ *>          N is INTEGER
+ *>          The order of the matrix A.  N >= 0.
+ *> \endverbatim
+ *>
+ *> \param[in,out] A
+ *> \verbatim
+ *>          A is DOUBLE PRECISION array, dimension ( N*(N+1)/2 );
+ *>          On entry, the symmetric matrix A in RFP format. RFP format is
+ *>          described by TRANSR, UPLO, and N as follows: If TRANSR = 'N'
+ *>          then RFP A is (0:N,0:k-1) when N is even; k=N/2. RFP A is
+ *>          (0:N-1,0:k) when N is odd; k=N/2. IF TRANSR = 'T' then RFP is
+ *>          the transpose of RFP A as defined when
+ *>          TRANSR = 'N'. The contents of RFP A are defined by UPLO as
+ *>          follows: If UPLO = 'U' the RFP A contains the NT elements of
+ *>          upper packed A. If UPLO = 'L' the RFP A contains the elements
+ *>          of lower packed A. The LDA of RFP A is (N+1)/2 when TRANSR =
+ *>          'T'. When TRANSR is 'N' the LDA is N+1 when N is even and N
+ *>          is odd. See the Note below for more details.
+ *>
+ *>          On exit, if INFO = 0, the factor U or L from the Cholesky
+ *>          factorization RFP A = U**T*U or RFP A = L*L**T.
+ *> \endverbatim
+ *>
+ *> \param[out] INFO
+ *> \verbatim
+ *>          INFO is INTEGER
+ *>          = 0:  successful exit
+ *>          < 0:  if INFO = -i, the i-th argument had an illegal value
+ *>          > 0:  if INFO = i, the leading minor of order i is not
+ *>                positive definite, and the factorization could not be
+ *>                completed.
+ *> \endverbatim
+ *
+ *  Authors:
+ *  ========
+ *
+ *> \author Univ. of Tennessee
+ *> \author Univ. of California Berkeley
+ *> \author Univ. of Colorado Denver
+ *> \author NAG Ltd.
+ *
+ *> \ingroup doubleOTHERcomputational
+ *
+ *> \par Further Details:
+ *  =====================
+ *>
+ *> \verbatim
+ *>
+ *>  We first consider Rectangular Full Packed (RFP) Format when N is
+ *>  even. We give an example where N = 6.
+ *>
+ *>      AP is Upper             AP is Lower
+ *>
+ *>   00 01 02 03 04 05       00
+ *>      11 12 13 14 15       10 11
+ *>         22 23 24 25       20 21 22
+ *>            33 34 35       30 31 32 33
+ *>               44 45       40 41 42 43 44
+ *>                  55       50 51 52 53 54 55
+ *>
+ *>
+ *>  Let TRANSR = 'N'. RFP holds AP as follows:
+ *>  For UPLO = 'U' the upper trapezoid A(0:5,0:2) consists of the last
+ *>  three columns of AP upper. The lower triangle A(4:6,0:2) consists of
+ *>  the transpose of the first three columns of AP upper.
+ *>  For UPLO = 'L' the lower trapezoid A(1:6,0:2) consists of the first
+ *>  three columns of AP lower. The upper triangle A(0:2,0:2) consists of
+ *>  the transpose of the last three columns of AP lower.
+ *>  This covers the case N even and TRANSR = 'N'.
+ *>
+ *>         RFP A                   RFP A
+ *>
+ *>        03 04 05                33 43 53
+ *>        13 14 15                00 44 54
+ *>        23 24 25                10 11 55
+ *>        33 34 35                20 21 22
+ *>        00 44 45                30 31 32
+ *>        01 11 55                40 41 42
+ *>        02 12 22                50 51 52
+ *>
+ *>  Now let TRANSR = 'T'. RFP A in both UPLO cases is just the
+ *>  transpose of RFP A above. One therefore gets:
+ *>
+ *>
+ *>           RFP A                   RFP A
+ *>
+ *>     03 13 23 33 00 01 02    33 00 10 20 30 40 50
+ *>     04 14 24 34 44 11 12    43 44 11 21 31 41 51
+ *>     05 15 25 35 45 55 22    53 54 55 22 32 42 52
+ *>
+ *>
+ *>  We then consider Rectangular Full Packed (RFP) Format when N is
+ *>  odd. We give an example where N = 5.
+ *>
+ *>     AP is Upper                 AP is Lower
+ *>
+ *>   00 01 02 03 04              00
+ *>      11 12 13 14              10 11
+ *>         22 23 24              20 21 22
+ *>            33 34              30 31 32 33
+ *>               44              40 41 42 43 44
+ *>
+ *>
+ *>  Let TRANSR = 'N'. RFP holds AP as follows:
+ *>  For UPLO = 'U' the upper trapezoid A(0:4,0:2) consists of the last
+ *>  three columns of AP upper. The lower triangle A(3:4,0:1) consists of
+ *>  the transpose of the first two columns of AP upper.
+ *>  For UPLO = 'L' the lower trapezoid A(0:4,0:2) consists of the first
+ *>  three columns of AP lower. The upper triangle A(0:1,1:2) consists of
+ *>  the transpose of the last two columns of AP lower.
+ *>  This covers the case N odd and TRANSR = 'N'.
+ *>
+ *>         RFP A                   RFP A
+ *>
+ *>        02 03 04                00 33 43
+ *>        12 13 14                10 11 44
+ *>        22 23 24                20 21 22
+ *>        00 33 34                30 31 32
+ *>        01 11 44                40 41 42
+ *>
+ *>  Now let TRANSR = 'T'. RFP A in both UPLO cases is just the
+ *>  transpose of RFP A above. One therefore gets:
+ *>
+ *>           RFP A                   RFP A
+ *>
+ *>     02 12 22 00 01             00 10 20 30 40 50
+ *>     03 13 23 33 11             33 11 21 31 41 51
+ *>     04 14 24 34 44             43 44 22 32 42 52
+ *> \endverbatim
+ *>
+ *  =====================================================================
+       SUBROUTINE DPFTRF( TRANSR, UPLO, N, A, INFO )
  *
+ *  -- LAPACK computational routine --
  *  -- LAPACK is a software package provided by Univ. of Tennessee,    --
  *  -- Univ. of California Berkeley, Univ. of Colorado Denver and NAG Ltd..--
  *
- *     ..
  *     .. Scalar Arguments ..
        CHARACTER          TRANSR, UPLO
        INTEGER            N, INFO
- Line 16
+ Line 207
  *     .. Array Arguments ..
        DOUBLE PRECISION   A( 0: * )
  *
- *  Purpose
- *  =======
- *
- *  DPFTRF computes the Cholesky factorization of a real symmetric
- *  positive definite matrix A.
- *
- *  The factorization has the form
- *     A = U**T * U,  if UPLO = 'U', or
- *     A = L  * L**T,  if UPLO = 'L',
- *  where U is an upper triangular matrix and L is lower triangular.
- *
- *  This is the block version of the algorithm, calling Level 3 BLAS.
- *
- *  Arguments
- *  =========
- *
- *  TRANSR    (input) CHARACTER*1
- *          = 'N':  The Normal TRANSR of RFP A is stored;
- *          = 'T':  The Transpose TRANSR of RFP A is stored.
- *
- *  UPLO    (input) CHARACTER*1
- *          = 'U':  Upper triangle of RFP A is stored;
- *          = 'L':  Lower triangle of RFP A is stored.
- *
- *  N       (input) INTEGER
- *          The order of the matrix A.  N >= 0.
- *
- *  A       (input/output) DOUBLE PRECISION array, dimension ( N*(N+1)/2 );
- *          On entry, the symmetric matrix A in RFP format. RFP format is
- *          described by TRANSR, UPLO, and N as follows: If TRANSR = 'N'
- *          then RFP A is (0:N,0:k-1) when N is even; k=N/2. RFP A is
- *          (0:N-1,0:k) when N is odd; k=N/2. IF TRANSR = 'T' then RFP is
- *          the transpose of RFP A as defined when
- *          TRANSR = 'N'. The contents of RFP A are defined by UPLO as
- *          follows: If UPLO = 'U' the RFP A contains the NT elements of
- *          upper packed A. If UPLO = 'L' the RFP A contains the elements
- *          of lower packed A. The LDA of RFP A is (N+1)/2 when TRANSR =
- *          'T'. When TRANSR is 'N' the LDA is N+1 when N is even and N
- *          is odd. See the Note below for more details.
- *
- *          On exit, if INFO = 0, the factor U or L from the Cholesky
- *          factorization RFP A = U**T*U or RFP A = L*L**T.
- *
- *  INFO    (output) INTEGER
- *          = 0:  successful exit
- *          < 0:  if INFO = -i, the i-th argument had an illegal value
- *          > 0:  if INFO = i, the leading minor of order i is not
- *                positive definite, and the factorization could not be
- *                completed.
- *
- *  Further Details
- *  ===============
- *
- *  We first consider Rectangular Full Packed (RFP) Format when N is
- *  even. We give an example where N = 6.
- *
- *      AP is Upper             AP is Lower
- *
- *   00 01 02 03 04 05       00
- *      11 12 13 14 15       10 11
- *         22 23 24 25       20 21 22
- *            33 34 35       30 31 32 33
- *               44 45       40 41 42 43 44
- *                  55       50 51 52 53 54 55
- *
- *
- *  Let TRANSR = 'N'. RFP holds AP as follows:
- *  For UPLO = 'U' the upper trapezoid A(0:5,0:2) consists of the last
- *  three columns of AP upper. The lower triangle A(4:6,0:2) consists of
- *  the transpose of the first three columns of AP upper.
- *  For UPLO = 'L' the lower trapezoid A(1:6,0:2) consists of the first
- *  three columns of AP lower. The upper triangle A(0:2,0:2) consists of
- *  the transpose of the last three columns of AP lower.
- *  This covers the case N even and TRANSR = 'N'.
- *
- *         RFP A                   RFP A
- *
- *        03 04 05                33 43 53
- *        13 14 15                00 44 54
- *        23 24 25                10 11 55
- *        33 34 35                20 21 22
- *        00 44 45                30 31 32
- *        01 11 55                40 41 42
- *        02 12 22                50 51 52
- *
- *  Now let TRANSR = 'T'. RFP A in both UPLO cases is just the
- *  transpose of RFP A above. One therefore gets:
- *
- *
- *           RFP A                   RFP A
- *
- *     03 13 23 33 00 01 02    33 00 10 20 30 40 50
- *     04 14 24 34 44 11 12    43 44 11 21 31 41 51
- *     05 15 25 35 45 55 22    53 54 55 22 32 42 52
- *
- *
- *  We then consider Rectangular Full Packed (RFP) Format when N is
- *  odd. We give an example where N = 5.
- *
- *     AP is Upper                 AP is Lower
- *
- *   00 01 02 03 04              00
- *      11 12 13 14              10 11
- *         22 23 24              20 21 22
- *            33 34              30 31 32 33
- *               44              40 41 42 43 44
- *
- *
- *  Let TRANSR = 'N'. RFP holds AP as follows:
- *  For UPLO = 'U' the upper trapezoid A(0:4,0:2) consists of the last
- *  three columns of AP upper. The lower triangle A(3:4,0:1) consists of
- *  the transpose of the first two columns of AP upper.
- *  For UPLO = 'L' the lower trapezoid A(0:4,0:2) consists of the first
- *  three columns of AP lower. The upper triangle A(0:1,1:2) consists of
- *  the transpose of the last two columns of AP lower.
- *  This covers the case N odd and TRANSR = 'N'.
- *
- *         RFP A                   RFP A
- *
- *        02 03 04                00 33 43
- *        12 13 14                10 11 44
- *        22 23 24                20 21 22
- *        00 33 34                30 31 32
- *        01 11 44                40 41 42
- *
- *  Now let TRANSR = 'T'. RFP A in both UPLO cases is just the
- *  transpose of RFP A above. One therefore gets:
- *
- *           RFP A                   RFP A
- *
- *     02 12 22 00 01             00 10 20 30 40 50
- *     03 13 23 33 11             33 11 21 31 41 51
- *     04 14 24 34 44             43 44 22 32 42 52
- *
  *  =====================================================================
  *
  *     .. Parameters ..
- Line 192
+ Line 249
  *     Quick return if possible
  *
        IF( N.EQ.0 )
-      +   RETURN
+      $   RETURN
  *
  *     If N is odd, set NISODD = .TRUE.
  *     If N is even, set K = N/2 and NISODD = .FALSE.
- Line 232
+ Line 289
  *
                 CALL DPOTRF( 'L', N1, A( 0 ), N, INFO )
                 IF( INFO.GT.0 )
-      +            RETURN
+      $            RETURN
                 CALL DTRSM( 'R', 'L', 'T', 'N', N2, N1, ONE, A( 0 ), N,
-      +                     A( N1 ), N )
+      $                     A( N1 ), N )
                 CALL DSYRK( 'U', 'N', N2, N1, -ONE, A( N1 ), N, ONE,
-      +                     A( N ), N )
+      $                     A( N ), N )
                 CALL DPOTRF( 'U', N2, A( N ), N, INFO )
                 IF( INFO.GT.0 )
-      +            INFO = INFO + N1
+      $            INFO = INFO + N1
  *
              ELSE
  *
- Line 249
+ Line 306
  *
                 CALL DPOTRF( 'L', N1, A( N2 ), N, INFO )
                 IF( INFO.GT.0 )
-      +            RETURN
+      $            RETURN
                 CALL DTRSM( 'L', 'L', 'N', 'N', N1, N2, ONE, A( N2 ), N,
-      +                     A( 0 ), N )
+      $                     A( 0 ), N )
                 CALL DSYRK( 'U', 'T', N2, N1, -ONE, A( 0 ), N, ONE,
-      +                     A( N1 ), N )
+      $                     A( N1 ), N )
                 CALL DPOTRF( 'U', N2, A( N1 ), N, INFO )
                 IF( INFO.GT.0 )
-      +            INFO = INFO + N1
+      $            INFO = INFO + N1
  *
              END IF
  *
- Line 272
+ Line 329
  *
                 CALL DPOTRF( 'U', N1, A( 0 ), N1, INFO )
                 IF( INFO.GT.0 )
-      +            RETURN
+      $            RETURN
                 CALL DTRSM( 'L', 'U', 'T', 'N', N1, N2, ONE, A( 0 ), N1,
-      +                     A( N1*N1 ), N1 )
+      $                     A( N1*N1 ), N1 )
                 CALL DSYRK( 'L', 'T', N2, N1, -ONE, A( N1*N1 ), N1, ONE,
-      +                     A( 1 ), N1 )
+      $                     A( 1 ), N1 )
                 CALL DPOTRF( 'L', N2, A( 1 ), N1, INFO )
                 IF( INFO.GT.0 )
-      +            INFO = INFO + N1
+      $            INFO = INFO + N1
  *
              ELSE
  *
- Line 289
+ Line 346
  *
                 CALL DPOTRF( 'U', N1, A( N2*N2 ), N2, INFO )
                 IF( INFO.GT.0 )
-      +            RETURN
+      $            RETURN
                 CALL DTRSM( 'R', 'U', 'N', 'N', N2, N1, ONE, A( N2*N2 ),
-      +                     N2, A( 0 ), N2 )
+      $                     N2, A( 0 ), N2 )
                 CALL DSYRK( 'L', 'N', N2, N1, -ONE, A( 0 ), N2, ONE,
-      +                     A( N1*N2 ), N2 )
+      $                     A( N1*N2 ), N2 )
                 CALL DPOTRF( 'L', N2, A( N1*N2 ), N2, INFO )
                 IF( INFO.GT.0 )
-      +            INFO = INFO + N1
+      $            INFO = INFO + N1
  *
              END IF
  *
- Line 318
+ Line 375
  *
                 CALL DPOTRF( 'L', K, A( 1 ), N+1, INFO )
                 IF( INFO.GT.0 )
-      +            RETURN
+      $            RETURN
                 CALL DTRSM( 'R', 'L', 'T', 'N', K, K, ONE, A( 1 ), N+1,
-      +                     A( K+1 ), N+1 )
+      $                     A( K+1 ), N+1 )
                 CALL DSYRK( 'U', 'N', K, K, -ONE, A( K+1 ), N+1, ONE,
-      +                     A( 0 ), N+1 )
+      $                     A( 0 ), N+1 )
                 CALL DPOTRF( 'U', K, A( 0 ), N+1, INFO )
                 IF( INFO.GT.0 )
-      +            INFO = INFO + K
+      $            INFO = INFO + K
  *
              ELSE
  *
- Line 335
+ Line 392
  *
                 CALL DPOTRF( 'L', K, A( K+1 ), N+1, INFO )
                 IF( INFO.GT.0 )
-      +            RETURN
+      $            RETURN
                 CALL DTRSM( 'L', 'L', 'N', 'N', K, K, ONE, A( K+1 ),
-      +                     N+1, A( 0 ), N+1 )
+      $                     N+1, A( 0 ), N+1 )
                 CALL DSYRK( 'U', 'T', K, K, -ONE, A( 0 ), N+1, ONE,
-      +                     A( K ), N+1 )
+      $                     A( K ), N+1 )
                 CALL DPOTRF( 'U', K, A( K ), N+1, INFO )
                 IF( INFO.GT.0 )
-      +            INFO = INFO + K
+      $            INFO = INFO + K
  *
              END IF
  *
- Line 358
+ Line 415
  *
                 CALL DPOTRF( 'U', K, A( 0+K ), K, INFO )
                 IF( INFO.GT.0 )
-      +            RETURN
+      $            RETURN
                 CALL DTRSM( 'L', 'U', 'T', 'N', K, K, ONE, A( K ), N1,
-      +                     A( K*( K+1 ) ), K )
+      $                     A( K*( K+1 ) ), K )
                 CALL DSYRK( 'L', 'T', K, K, -ONE, A( K*( K+1 ) ), K, ONE,
-      +                     A( 0 ), K )
+      $                     A( 0 ), K )
                 CALL DPOTRF( 'L', K, A( 0 ), K, INFO )
                 IF( INFO.GT.0 )
-      +            INFO = INFO + K
+      $            INFO = INFO + K
  *
              ELSE
  *
- Line 375
+ Line 432
  *
                 CALL DPOTRF( 'U', K, A( K*( K+1 ) ), K, INFO )
                 IF( INFO.GT.0 )
-      +            RETURN
+      $            RETURN
                 CALL DTRSM( 'R', 'U', 'N', 'N', K, K, ONE,
-      +                     A( K*( K+1 ) ), K, A( 0 ), K )
+      $                     A( K*( K+1 ) ), K, A( 0 ), K )
                 CALL DSYRK( 'L', 'N', K, K, -ONE, A( 0 ), K, ONE,
-      +                     A( K*K ), K )
+      $                     A( K*K ), K )
                 CALL DPOTRF( 'L', K, A( K*K ), K, INFO )
                 IF( INFO.GT.0 )
-      +            INFO = INFO + K
+      $            INFO = INFO + K
  *
              END IF
  *

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	Added in v.1.16