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      SUBROUTINE ZPFTRI( TRANSR, UPLO, N, A, INFO )
*
*  -- LAPACK routine (version 3.3.1)                                    --
*
*  -- Contributed by Fred Gustavson of the IBM Watson Research Center --
*  -- April 2011                                                      --
*
*  -- 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            INFO, N
*     .. Array Arguments ..
      COMPLEX*16         A( 0* )
*     ..
*
*  Purpose
*  =======
*
*  ZPFTRI computes the inverse of a complex Hermitian positive definite
*  matrix A using the Cholesky factorization A = U**H*U or A = L*L**H
*  computed by ZPFTRF.
*
*  Arguments
*  =========
*
*  TRANSR    (input) CHARACTER*1
*          = 'N':  The Normal TRANSR of RFP A is stored;
*          = 'C':  The Conjugate-transpose TRANSR of RFP A is stored.
*
*  UPLO    (input) CHARACTER*1
*          = 'U':  Upper triangle of A is stored;
*          = 'L':  Lower triangle of A is stored.
*
*  N       (input) INTEGER
*          The order of the matrix A.  N >= 0.
*
*  A       (input/output) COMPLEX*16 array, dimension ( N*(N+1)/2 );
*          On entry, the Hermitian 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 = 'C' then RFP is
*          the Conjugate-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 =
*          'C'. 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, the Hermitian inverse of the original matrix, in the
*          same storage format.
*
*  INFO    (output) INTEGER
*          = 0:  successful exit
*          < 0:  if INFO = -i, the i-th argument had an illegal value
*          > 0:  if INFO = i, the (i,i) element of the factor U or L is
*                zero, and the inverse could not be computed.
*
*  Further Details
*  ===============
*
*  We first consider Standard Packed 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
*  conjugate-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
*  conjugate-transpose of the last three columns of AP lower.
*  To denote conjugate we place -- above the element. 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 = 'C'. RFP A in both UPLO cases is just the conjugate-
*  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 next  consider Standard Packed 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
*  conjugate-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
*  conjugate-transpose of the last two   columns of AP lower.
*  To denote conjugate we place -- above the element. 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 = 'C'. RFP A in both UPLO cases is just the conjugate-
*  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 ..
      DOUBLE PRECISION   ONE
      COMPLEX*16         CONE
      PARAMETER          ( ONE = 1.D0, CONE = ( 1.D00.D0 ) )
*     ..
*     .. Local Scalars ..
      LOGICAL            LOWER, NISODD, NORMALTRANSR
      INTEGER            N1, N2, K
*     ..
*     .. External Functions ..
      LOGICAL            LSAME
      EXTERNAL           LSAME
*     ..
*     .. External Subroutines ..
      EXTERNAL           XERBLA, ZTFTRI, ZLAUUM, ZTRMM, ZHERK
*     ..
*     .. Intrinsic Functions ..
      INTRINSIC          MOD
*     ..
*     .. Executable Statements ..
*
*     Test the input parameters.
*
      INFO = 0
      NORMALTRANSR = LSAME( TRANSR, 'N' )
      LOWER = LSAME( UPLO, 'L' )
      IF.NOT.NORMALTRANSR .AND. .NOT.LSAME( TRANSR, 'C' ) ) THEN
         INFO = -1
      ELSE IF.NOT.LOWER .AND. .NOT.LSAME( UPLO, 'U' ) ) THEN
         INFO = -2
      ELSE IF( N.LT.0 ) THEN
         INFO = -3
      END IF
      IF( INFO.NE.0 ) THEN
         CALL XERBLA( 'ZPFTRI'-INFO )
         RETURN
      END IF
*
*     Quick return if possible
*
      IF( N.EQ.0 )
     $   RETURN
*
*     Invert the triangular Cholesky factor U or L.
*
      CALL ZTFTRI( TRANSR, UPLO, 'N', N, A, INFO )
      IF( INFO.GT.0 )
     $   RETURN
*
*     If N is odd, set NISODD = .TRUE.
*     If N is even, set K = N/2 and NISODD = .FALSE.
*
      IFMOD( N, 2 ).EQ.0 ) THEN
         K = N / 2
         NISODD = .FALSE.
      ELSE
         NISODD = .TRUE.
      END IF
*
*     Set N1 and N2 depending on LOWER
*
      IF( LOWER ) THEN
         N2 = N / 2
         N1 = N - N2
      ELSE
         N1 = N / 2
         N2 = N - N1
      END IF
*
*     Start execution of triangular matrix multiply: inv(U)*inv(U)^C or
*     inv(L)^C*inv(L). There are eight cases.
*
      IF( NISODD ) THEN
*
*        N is odd
*
         IF( NORMALTRANSR ) THEN
*
*           N is odd and TRANSR = 'N'
*
            IF( LOWER ) THEN
*
*              SRPA for LOWER, NORMAL and N is odd ( a(0:n-1,0:N1-1) )
*              T1 -> a(0,0), T2 -> a(0,1), S -> a(N1,0)
*              T1 -> a(0), T2 -> a(n), S -> a(N1)
*
               CALL ZLAUUM( 'L', N1, A( 0 ), N, INFO )
               CALL ZHERK( 'L''C', N1, N2, ONE, A( N1 ), N, ONE,
     $                     A( 0 ), N )
               CALL ZTRMM( 'L''U''N''N', N2, N1, CONE, A( N ), N,
     $                     A( N1 ), N )
               CALL ZLAUUM( 'U', N2, A( N ), N, INFO )
*
            ELSE
*
*              SRPA for UPPER, NORMAL and N is odd ( a(0:n-1,0:N2-1)
*              T1 -> a(N1+1,0), T2 -> a(N1,0), S -> a(0,0)
*              T1 -> a(N2), T2 -> a(N1), S -> a(0)
*
               CALL ZLAUUM( 'L', N1, A( N2 ), N, INFO )
               CALL ZHERK( 'L''N', N1, N2, ONE, A( 0 ), N, ONE,
     $                     A( N2 ), N )
               CALL ZTRMM( 'R''U''C''N', N1, N2, CONE, A( N1 ), N,
     $                     A( 0 ), N )
               CALL ZLAUUM( 'U', N2, A( N1 ), N, INFO )
*
            END IF
*
         ELSE
*
*           N is odd and TRANSR = 'C'
*
            IF( LOWER ) THEN
*
*              SRPA for LOWER, TRANSPOSE, and N is odd
*              T1 -> a(0), T2 -> a(1), S -> a(0+N1*N1)
*
               CALL ZLAUUM( 'U', N1, A( 0 ), N1, INFO )
               CALL ZHERK( 'U''N', N1, N2, ONE, A( N1*N1 ), N1, ONE,
     $                     A( 0 ), N1 )
               CALL ZTRMM( 'R''L''N''N', N1, N2, CONE, A( 1 ), N1,
     $                     A( N1*N1 ), N1 )
               CALL ZLAUUM( 'L', N2, A( 1 ), N1, INFO )
*
            ELSE
*
*              SRPA for UPPER, TRANSPOSE, and N is odd
*              T1 -> a(0+N2*N2), T2 -> a(0+N1*N2), S -> a(0)
*
               CALL ZLAUUM( 'U', N1, A( N2*N2 ), N2, INFO )
               CALL ZHERK( 'U''C', N1, N2, ONE, A( 0 ), N2, ONE,
     $                     A( N2*N2 ), N2 )
               CALL ZTRMM( 'L''L''C''N', N2, N1, CONE, A( N1*N2 ),
     $                     N2, A( 0 ), N2 )
               CALL ZLAUUM( 'L', N2, A( N1*N2 ), N2, INFO )
*
            END IF
*
         END IF
*
      ELSE
*
*        N is even
*
         IF( NORMALTRANSR ) THEN
*
*           N is even and TRANSR = 'N'
*
            IF( LOWER ) THEN
*
*              SRPA for LOWER, NORMAL, and N is even ( a(0:n,0:k-1) )
*              T1 -> a(1,0), T2 -> a(0,0), S -> a(k+1,0)
*              T1 -> a(1), T2 -> a(0), S -> a(k+1)
*
               CALL ZLAUUM( 'L', K, A( 1 ), N+1, INFO )
               CALL ZHERK( 'L''C', K, K, ONE, A( K+1 ), N+1, ONE,
     $                     A( 1 ), N+1 )
               CALL ZTRMM( 'L''U''N''N', K, K, CONE, A( 0 ), N+1,
     $                     A( K+1 ), N+1 )
               CALL ZLAUUM( 'U', K, A( 0 ), N+1, INFO )
*
            ELSE
*
*              SRPA for UPPER, NORMAL, and N is even ( a(0:n,0:k-1) )
*              T1 -> a(k+1,0) ,  T2 -> a(k,0),   S -> a(0,0)
*              T1 -> a(k+1), T2 -> a(k), S -> a(0)
*
               CALL ZLAUUM( 'L', K, A( K+1 ), N+1, INFO )
               CALL ZHERK( 'L''N', K, K, ONE, A( 0 ), N+1, ONE,
     $                     A( K+1 ), N+1 )
               CALL ZTRMM( 'R''U''C''N', K, K, CONE, A( K ), N+1,
     $                     A( 0 ), N+1 )
               CALL ZLAUUM( 'U', K, A( K ), N+1, INFO )
*
            END IF
*
         ELSE
*
*           N is even and TRANSR = 'C'
*
            IF( LOWER ) THEN
*
*              SRPA for LOWER, TRANSPOSE, and N is even (see paper)
*              T1 -> B(0,1), T2 -> B(0,0), S -> B(0,k+1),
*              T1 -> a(0+k), T2 -> a(0+0), S -> a(0+k*(k+1)); lda=k
*
               CALL ZLAUUM( 'U', K, A( K ), K, INFO )
               CALL ZHERK( 'U''N', K, K, ONE, A( K*( K+1 ) ), K, ONE,
     $                     A( K ), K )
               CALL ZTRMM( 'R''L''N''N', K, K, CONE, A( 0 ), K,
     $                     A( K*( K+1 ) ), K )
               CALL ZLAUUM( 'L', K, A( 0 ), K, INFO )
*
            ELSE
*
*              SRPA for UPPER, TRANSPOSE, and N is even (see paper)
*              T1 -> B(0,k+1),     T2 -> B(0,k),   S -> B(0,0),
*              T1 -> a(0+k*(k+1)), T2 -> a(0+k*k), S -> a(0+0)); lda=k
*
               CALL ZLAUUM( 'U', K, A( K*( K+1 ) ), K, INFO )
               CALL ZHERK( 'U''C', K, K, ONE, A( 0 ), K, ONE,
     $                     A( K*( K+1 ) ), K )
               CALL ZTRMM( 'L''L''C''N', K, K, CONE, A( K*K ), K,
     $                     A( 0 ), K )
               CALL ZLAUUM( 'L', K, A( K*K ), K, INFO )
*
            END IF
*
         END IF
*
      END IF
*
      RETURN
*
*     End of ZPFTRI
*
      END