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SUBROUTINE <a name="DPTTS2.1"></a><a href="dptts2.f.html#DPTTS2.1">DPTTS2</a>( N, NRHS, D, E, B, LDB )
<span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> -- LAPACK routine (version 3.1) --
</span><span class="comment">*</span><span class="comment"> Univ. of Tennessee, Univ. of California Berkeley and NAG Ltd..
</span><span class="comment">*</span><span class="comment"> November 2006
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> .. Scalar Arguments ..
</span> INTEGER LDB, N, NRHS
<span class="comment">*</span><span class="comment"> ..
</span><span class="comment">*</span><span class="comment"> .. Array Arguments ..
</span> DOUBLE PRECISION B( LDB, * ), D( * ), E( * )
<span class="comment">*</span><span class="comment"> ..
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> Purpose
</span><span class="comment">*</span><span class="comment"> =======
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> <a name="DPTTS2.17"></a><a href="dptts2.f.html#DPTTS2.1">DPTTS2</a> solves a tridiagonal system of the form
</span><span class="comment">*</span><span class="comment"> A * X = B
</span><span class="comment">*</span><span class="comment"> using the L*D*L' factorization of A computed by <a name="DPTTRF.19"></a><a href="dpttrf.f.html#DPTTRF.1">DPTTRF</a>. D is a
</span><span class="comment">*</span><span class="comment"> diagonal matrix specified in the vector D, L is a unit bidiagonal
</span><span class="comment">*</span><span class="comment"> matrix whose subdiagonal is specified in the vector E, and X and B
</span><span class="comment">*</span><span class="comment"> are N by NRHS matrices.
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> Arguments
</span><span class="comment">*</span><span class="comment"> =========
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> N (input) INTEGER
</span><span class="comment">*</span><span class="comment"> The order of the tridiagonal matrix A. N >= 0.
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> NRHS (input) INTEGER
</span><span class="comment">*</span><span class="comment"> The number of right hand sides, i.e., the number of columns
</span><span class="comment">*</span><span class="comment"> of the matrix B. NRHS >= 0.
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> D (input) DOUBLE PRECISION array, dimension (N)
</span><span class="comment">*</span><span class="comment"> The n diagonal elements of the diagonal matrix D from the
</span><span class="comment">*</span><span class="comment"> L*D*L' factorization of A.
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> E (input) DOUBLE PRECISION array, dimension (N-1)
</span><span class="comment">*</span><span class="comment"> The (n-1) subdiagonal elements of the unit bidiagonal factor
</span><span class="comment">*</span><span class="comment"> L from the L*D*L' factorization of A. E can also be regarded
</span><span class="comment">*</span><span class="comment"> as the superdiagonal of the unit bidiagonal factor U from the
</span><span class="comment">*</span><span class="comment"> factorization A = U'*D*U.
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> B (input/output) DOUBLE PRECISION array, dimension (LDB,NRHS)
</span><span class="comment">*</span><span class="comment"> On entry, the right hand side vectors B for the system of
</span><span class="comment">*</span><span class="comment"> linear equations.
</span><span class="comment">*</span><span class="comment"> On exit, the solution vectors, X.
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> LDB (input) INTEGER
</span><span class="comment">*</span><span class="comment"> The leading dimension of the array B. LDB >= max(1,N).
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> =====================================================================
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> .. Local Scalars ..
</span> INTEGER I, J
<span class="comment">*</span><span class="comment"> ..
</span><span class="comment">*</span><span class="comment"> .. External Subroutines ..
</span> EXTERNAL DSCAL
<span class="comment">*</span><span class="comment"> ..
</span><span class="comment">*</span><span class="comment"> .. Executable Statements ..
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> Quick return if possible
</span><span class="comment">*</span><span class="comment">
</span> IF( N.LE.1 ) THEN
IF( N.EQ.1 )
$ CALL DSCAL( NRHS, 1.D0 / D( 1 ), B, LDB )
RETURN
END IF
<span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> Solve A * X = B using the factorization A = L*D*L',
</span><span class="comment">*</span><span class="comment"> overwriting each right hand side vector with its solution.
</span><span class="comment">*</span><span class="comment">
</span> DO 30 J = 1, NRHS
<span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> Solve L * x = b.
</span><span class="comment">*</span><span class="comment">
</span> DO 10 I = 2, N
B( I, J ) = B( I, J ) - B( I-1, J )*E( I-1 )
10 CONTINUE
<span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> Solve D * L' * x = b.
</span><span class="comment">*</span><span class="comment">
</span> B( N, J ) = B( N, J ) / D( N )
DO 20 I = N - 1, 1, -1
B( I, J ) = B( I, J ) / D( I ) - B( I+1, J )*E( I )
20 CONTINUE
30 CONTINUE
<span class="comment">*</span><span class="comment">
</span> RETURN
<span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> End of <a name="DPTTS2.91"></a><a href="dptts2.f.html#DPTTS2.1">DPTTS2</a>
</span><span class="comment">*</span><span class="comment">
</span> END
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