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version 1.1, 2018/05/29 14:54:04
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version 1.2, 2020/05/21 21:46:11
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| *> ZSYTRF_AA_2STAGE computes the factorization of a complex symmetric matrix A |
*> ZSYTRF_AA_2STAGE computes the factorization of a complex symmetric matrix A |
| *> using the Aasen's algorithm. The form of the factorization is |
*> using the Aasen's algorithm. The form of the factorization is |
| *> |
*> |
| *> A = U*T*U**T or A = L*T*L**T |
*> A = U**T*T*U or A = L*T*L**T |
| *> |
*> |
| *> where U (or L) is a product of permutation and unit upper (lower) |
*> where U (or L) is a product of permutation and unit upper (lower) |
| *> triangular matrices, and T is a complex symmetric band matrix with the |
*> triangular matrices, and T is a complex symmetric band matrix with the |
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| *> |
*> |
| *> \param[in] LTB |
*> \param[in] LTB |
| *> \verbatim |
*> \verbatim |
| |
*> LTB is INTEGER |
| *> The size of the array TB. LTB >= 4*N, internally |
*> The size of the array TB. LTB >= 4*N, internally |
| *> used to select NB such that LTB >= (3*NB+1)*N. |
*> used to select NB such that LTB >= (3*NB+1)*N. |
| *> |
*> |
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| *> |
*> |
| *> \param[out] IPIV2 |
*> \param[out] IPIV2 |
| *> \verbatim |
*> \verbatim |
| *> IPIV is INTEGER array, dimension (N) |
*> IPIV2 is INTEGER array, dimension (N) |
| *> On exit, it contains the details of the interchanges, i.e., |
*> On exit, it contains the details of the interchanges, i.e., |
| *> the row and column k of T were interchanged with the |
*> the row and column k of T were interchanged with the |
| *> row and column IPIV(k). |
*> row and column IPIV(k). |
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| *> |
*> |
| *> \param[in] LWORK |
*> \param[in] LWORK |
| *> \verbatim |
*> \verbatim |
| |
*> LWORK is INTEGER |
| *> The size of WORK. LWORK >= N, internally used to select NB |
*> The size of WORK. LWORK >= N, internally used to select NB |
| *> such that LWORK >= N*NB. |
*> such that LWORK >= N*NB. |
| *> |
*> |
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| IF( UPPER ) THEN |
IF( UPPER ) THEN |
| * |
* |
| * ..................................................... |
* ..................................................... |
| * Factorize A as L*D*L**T using the upper triangle of A |
* Factorize A as U**T*D*U using the upper triangle of A |
| * ..................................................... |
* ..................................................... |
| * |
* |
| DO J = 0, NT-1 |
DO J = 0, NT-1 |
|
Line 446 c END IF
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Line 448 c END IF
|
| * > Apply pivots to previous columns of L |
* > Apply pivots to previous columns of L |
| CALL ZSWAP( K-1, A( (J+1)*NB+1, I1 ), 1, |
CALL ZSWAP( K-1, A( (J+1)*NB+1, I1 ), 1, |
| $ A( (J+1)*NB+1, I2 ), 1 ) |
$ A( (J+1)*NB+1, I2 ), 1 ) |
| * > Swap A(I1+1:M, I1) with A(I2, I1+1:M) |
* > Swap A(I1+1:M, I1) with A(I2, I1+1:M) |
| CALL ZSWAP( I2-I1-1, A( I1, I1+1 ), LDA, |
IF( I2.GT.(I1+1) ) |
| $ A( I1+1, I2 ), 1 ) |
$ CALL ZSWAP( I2-I1-1, A( I1, I1+1 ), LDA, |
| |
$ A( I1+1, I2 ), 1 ) |
| * > Swap A(I2+1:M, I1) with A(I2+1:M, I2) |
* > Swap A(I2+1:M, I1) with A(I2+1:M, I2) |
| CALL ZSWAP( N-I2, A( I1, I2+1 ), LDA, |
IF( I2.LT.N ) |
| $ A( I2, I2+1 ), LDA ) |
$ CALL ZSWAP( N-I2, A( I1, I2+1 ), LDA, |
| |
$ A( I2, I2+1 ), LDA ) |
| * > Swap A(I1, I1) with A(I2, I2) |
* > Swap A(I1, I1) with A(I2, I2) |
| PIV = A( I1, I1 ) |
PIV = A( I1, I1 ) |
| A( I1, I1 ) = A( I2, I2 ) |
A( I1, I1 ) = A( I2, I2 ) |
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Line 635 c END IF
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Line 639 c END IF
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| CALL ZSWAP( K-1, A( I1, (J+1)*NB+1 ), LDA, |
CALL ZSWAP( K-1, A( I1, (J+1)*NB+1 ), LDA, |
| $ A( I2, (J+1)*NB+1 ), LDA ) |
$ A( I2, (J+1)*NB+1 ), LDA ) |
| * > Swap A(I1+1:M, I1) with A(I2, I1+1:M) |
* > Swap A(I1+1:M, I1) with A(I2, I1+1:M) |
| CALL ZSWAP( I2-I1-1, A( I1+1, I1 ), 1, |
IF( I2.GT.(I1+1) ) |
| $ A( I2, I1+1 ), LDA ) |
$ CALL ZSWAP( I2-I1-1, A( I1+1, I1 ), 1, |
| |
$ A( I2, I1+1 ), LDA ) |
| * > Swap A(I2+1:M, I1) with A(I2+1:M, I2) |
* > Swap A(I2+1:M, I1) with A(I2+1:M, I2) |
| CALL ZSWAP( N-I2, A( I2+1, I1 ), 1, |
IF( I2.LT.N ) |
| $ A( I2+1, I2 ), 1 ) |
$ CALL ZSWAP( N-I2, A( I2+1, I1 ), 1, |
| |
$ A( I2+1, I2 ), 1 ) |
| * > Swap A(I1, I1) with A(I2, I2) |
* > Swap A(I1, I1) with A(I2, I2) |
| PIV = A( I1, I1 ) |
PIV = A( I1, I1 ) |
| A( I1, I1 ) = A( I2, I2 ) |
A( I1, I1 ) = A( I2, I2 ) |
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Line 663 c $ (J+1)*NB+1,
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Line 669 c $ (J+1)*NB+1,
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| * Factor the band matrix |
* Factor the band matrix |
| CALL ZGBTRF( N, N, NB, NB, TB, LDTB, IPIV2, INFO ) |
CALL ZGBTRF( N, N, NB, NB, TB, LDTB, IPIV2, INFO ) |
| * |
* |
| |
RETURN |
| |
* |
| * End of ZSYTRF_AA_2STAGE |
* End of ZSYTRF_AA_2STAGE |
| * |
* |
| END |
END |
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