F06SJF (ZTRSV) (PDF version)
F06 Chapter Contents
F06 Chapter Introduction
NAG Library Manual
NAG Library Routine Document
F06SJF (ZTRSV)
Note:
before using this routine, please read the Users' Note for your implementation to check the interpretation of
bold italicised
terms and other implementation-dependent details.
▸
▿
Contents
1
Purpose
2
Specification
3
Description
4
References
5
Parameters
6
Error Indicators and Warnings
7
Accuracy
8
Parallelism and Performance
9
Further Comments
10
Example
1 Purpose
F06SJF (ZTRSV) solves a complex triangular system of equations with a single right hand side.
2 Specification
SUBROUTINE F06SJF (
UPLO
,
TRANS
,
DIAG
,
N
,
A
,
LDA
,
X
,
INCX
)
INTEGER
N, LDA, INCX
COMPLEX (KIND=nag_wp)
A(LDA,*), X(*)
CHARACTER(1)
UPLO, TRANS, DIAG
The routine may be called by its BLAS name
ztrsv
.
3 Description
F06SJF (ZTRSV) performs one of the matrix-vector operations
x
←
A
-
1
x
,
x
←
A
-
T
x
or
x
←
A
-
H
x
,
where
A
is an
n
by
n
complex triangular matrix, and
x
is an
n
-element complex vector.
A
-
T
denotes
A
T
-
1
or equivalently
A
-
1
T
;
A
-
H
denotes
A
H
-
1
or equivalently
A
-
1
H
.
No test for singularity or near-singularity of
A
is included in this routine. Such tests must be performed before calling this routine.
4 References
None.
5 Parameters
1:
UPLO
– CHARACTER(1)
Input
On entry
: specifies whether
A
is upper or lower triangular.
UPLO
=
'U'
A
is upper triangular.
UPLO
=
'L'
A
is lower triangular.
Constraint
:
UPLO
=
'U'
or
'L'
.
2:
TRANS
– CHARACTER(1)
Input
On entry
: specifies the operation to be performed.
TRANS
=
'N'
x
←
A
-
1
x
.
TRANS
=
'T'
x
←
A
-
T
x
.
TRANS
=
'C'
x
←
A
-
H
x
.
Constraint
:
TRANS
=
'N'
,
'T'
or
'C'
.
3:
DIAG
– CHARACTER(1)
Input
On entry
: specifies whether
A
has nonunit or unit diagonal elements.
DIAG
=
'N'
The diagonal elements are stored explicitly.
DIAG
=
'U'
The diagonal elements are assumed to be
1
, and are not referenced.
Constraint
:
DIAG
=
'N'
or
'U'
.
4:
N
– INTEGER
Input
On entry
:
n
, the order of the matrix
A
.
Constraint
:
N
≥
0
.
5:
A
LDA
*
– COMPLEX (KIND=nag_wp) array
Input
Note:
the second dimension of the array
A
must be at least
N
.
On entry
: the
n
by
n
triangular matrix
A
.
If
UPLO
=
'U'
,
A
is upper triangular and the elements of the array below the diagonal are not referenced.
If
UPLO
=
'L'
,
A
is lower triangular and the elements of the array above the diagonal are not referenced.
If
DIAG
=
'U'
, the diagonal elements of
A
are assumed to be
1
, and are not referenced.
6:
LDA
– INTEGER
Input
On entry
: the first dimension of the array
A
as declared in the (sub)program from which F06SJF (ZTRSV) is called.
Constraint
:
LDA
≥
max
1
,
N
.
7:
X
*
– COMPLEX (KIND=nag_wp) array
Input/Output
Note:
the dimension of the array
X
must be at least
max
1
,
1
+
N
-
1
×
INCX
.
On entry
: the vector
x
.
If
INCX
>
0
,
x
i
must be stored in
X
1
+
i
–
1
×
INCX
, for
i
=
1
,
2
,
…
,
N
.
If
INCX
<
0
,
x
i
must be stored in
X
1
–
N
–
i
×
INCX
, for
i
=
1
,
2
,
…
,
N
.
On exit
: the updated vector
x
stored in the array elements used to supply the original vector
x
.
8:
INCX
– INTEGER
Input
On entry
: the increment in the subscripts of
X
between successive elements of
x
.
Constraint
:
INCX
≠
0
.
6 Error Indicators and Warnings
None.
7 Accuracy
Not applicable.
8 Parallelism and Performance
Not applicable.
9 Further Comments
None.
10 Example
None.
F06SJF (ZTRSV) (PDF version)
F06 Chapter Contents
F06 Chapter Introduction
NAG Library Manual
© The Numerical Algorithms Group Ltd, Oxford, UK. 2015