Visible to Intel only — GUID: GUID-6E6360FD-4FE6-41C9-9092-BC7A67ED7967
Visible to Intel only — GUID: GUID-6E6360FD-4FE6-41C9-9092-BC7A67ED7967
?hbtrd
Reduces a complex Hermitian band matrix to tridiagonal form.
Syntax
call chbtrd(vect, uplo, n, kd, ab, ldab, d, e, q, ldq, work, info)
call zhbtrd(vect, uplo, n, kd, ab, ldab, d, e, q, ldq, work, info)
call hbtrd(ab [, q] [,vect] [,uplo] [,info])
Include Files
- mkl.fi, lapack.f90
Description
The routine reduces a complex Hermitian band matrix A to symmetric tridiagonal form T by a unitary similarity transformation: A = Q*T*QH. The unitary matrix Q is determined as a product of Givens rotations.
If required, the routine can also form the matrix Q explicitly.
Input Parameters
- vect
-
CHARACTER*1. Must be 'V', 'N', or 'U'.
If vect = 'V', the routine returns the explicit matrix Q.
If vect = 'N', the routine does not return Q.
If vect = 'U', the routine updates matrix X by forming Q*X.
- uplo
-
CHARACTER*1. Must be 'U' or 'L'.
If uplo = 'U', ab stores the upper triangular part of A.
If uplo = 'L', ab stores the lower triangular part of A.
- n
-
INTEGER. The order of the matrix A (n≥ 0).
- kd
-
INTEGER. The number of super- or sub-diagonals in A
(kd≥ 0).
- ab, work
-
COMPLEX for chbtrd
DOUBLE COMPLEX for zhbtrd.
ab(ldab,*) is an array containing either upper or lower triangular part of the matrix A (as specified by uplo) in band storage format.
The second dimension of ab must be at least max(1, n).
work(*) is a workspace array.
The dimension of work must be at least max(1, n).
- q
-
COMPLEX for chbtrd
DOUBLE COMPLEX for zhbtrd.
q(ldq,*) is an array.
If vect = 'U', the q array must contain an n-by-n matrix X.
If vect = 'N' or 'V', the q parameter need not be set.'
- ldab
-
INTEGER. The leading dimension of ab; at least kd+1.
- ldq
-
INTEGER. The leading dimension of q. Constraints:
ldq≥ max(1, n) if vect = 'V' or 'U';
ldq≥ 1 if vect = 'N'.
Output Parameters
- ab
-
On exit, the diagonal elements of the array ab are overwritten by the diagonal elements of the tridiagonal matrix T. If kd > 0, the elements on the first superdiagonal (if uplo = 'U') or the first subdiagonal (if uplo = 'L') are ovewritten by the off-diagonal elements of T. The rest of ab is overwritten by values generated during the reduction.
- d, e
-
REAL for chbtrd
DOUBLE PRECISION for zhbtrd.
Arrays:
d(*) contains the diagonal elements of the matrix T.
The dimension of d must be at least max(1, n).
e(*) contains the off-diagonal elements of T.
The dimension of e must be at least max(1, n-1).
- q
-
If vect = 'N', q is not referenced.
If vect = 'V', q contains the n-by-n matrix Q.
If vect = 'U', q contains the product X* Q.
The second dimension of q must be:
at least max(1, n) if vect = 'V';
at least 1 if vect = 'N'.
- info
-
INTEGER.
If info = 0, the execution is successful.
If info = -i, the ith parameter had an illegal value.
LAPACK 95 Interface Notes
Routines in Fortran 95 interface have fewer arguments in the calling sequence than their FORTRAN 77 counterparts. For general conventions applied to skip redundant or restorable arguments, see LAPACK 95 Interface Conventions.
Specific details for the routine hbtrd interface are the following:
- ab
-
Holds the array A of size (kd+1,n).
- q
-
Holds the matrix Q of size (n,n).
- uplo
-
Must be 'U' or 'L'. The default value is 'U'.
- vect
-
If omitted, this argument is restored based on the presence of argument q as follows: vect = 'V', if q is present, vect = 'N', if q is omitted.
If present, vect must be equal to 'V' or 'U' and the argument q must also be present. Note that there will be an error condition if vect is present and q omitted.
Note that diagonal (d) and off-diagonal (e) elements of the matrix T are omitted because they are kept in the matrix A on exit.
Application Notes
The computed matrix T is exactly similar to a matrix A + E, where ||E||2 = c(n)*ε*||A||2, c(n) is a modestly increasing function of n, and ε is the machine precision. The computed matrix Q differs from an exactly unitary matrix by a matrix E such that ||E||2 = O(ε).
The total number of floating-point operations is approximately 20n2*kd if vect = 'N', with 10n3*(kd-1)/kd additional operations if vect = 'V'.
The real counterpart of this routine is sbtrd.