void	f01gbc (Integer irevcm, Integer n, Integer m, double b[], Integer pdb, double t, double tr, double b2[], Integer pdb2, double x[], Integer pdx, double y[], Integer pdy, double p[], double r[], double z[], double comm[], Integer icomm[], NagError fail)

The function may be called by the names: f01gbc or nag_matop_real_gen_matrix_actexp_rcomm.

3 Description

e^{t A} B

is computed using the algorithm described in Al–Mohy and Higham (2011) which uses a truncated Taylor series to compute the

e^{t A} B

without explicitly forming

e^{t A}

The algorithm does not explicity need to access the elements of

A

; it only requires the result of matrix multiplications of the form

A X

A^{T} Y

. A reverse communication interface is used, in which control is returned to the calling program whenever a matrix product is required.

4 References

Al–Mohy A H and Higham N J (2011) Computing the action of the matrix exponential, with an application to exponential integrators SIAM J. Sci. Statist. Comput. 33(2) 488-511

Higham N J (2008) Functions of Matrices: Theory and Computation SIAM, Philadelphia, PA, USA

5 Arguments

Note: this function uses reverse communication. Its use involves an initial entry, intermediate exits and re-entries, and a final exit, as indicated by the argument irevcm. Between intermediate exits and re-entries, all arguments other than b2, x, y, p and r must remain unchanged.

1: $irevcm$ – Integer * Input/Output

On initial entry: must be set to

0

On intermediate exit:

irevcm = 1

2

3

4

5

. The calling program must:

(a)if $irevcm = 1$ : evaluate $B_{2} = A B$ , where $B_{2}$ is an $n \times m$ matrix, and store the result in b2;
if $irevcm = 2$ : evaluate $Y = A X$ , where $X$ and $Y$ are $n \times 2$ matrices, and store the result in y;
if $irevcm = 3$ : evaluate $X = A^{T} Y$ and store the result in x;
if $irevcm = 4$ : evaluate $p = A z$ and store the result in p;
if $irevcm = 5$ : evaluate $r = A^{T} z$ and store the result in r.
(b)call f01gbc again with all other parameters unchanged.

On final exit:

irevcm = 0

Note: any values you return to f01gbc as part of the reverse communication procedure should not include floating-point NaN (Not a Number) or infinity values, since these are not handled by f01gbc. If your code inadvertently does return any NaNs or infinities, f01gbc is likely to produce unexpected results.

2: $n$ – Integer Input

On entry:

n

, the order of the matrix

A

Constraint:

n \geq 0

3: $m$ – Integer Input

On entry: the number of columns of the matrix

B

Constraint:

m \geq 0

4: $b [\dim]$ – double Input/Output

Note: the dimension, dim, of the array b must be at least

pdb \times m

The

(i, j)

th element of the matrix

B

is stored in

b [(j - 1) \times pdb + i - 1]

On initial entry: the

n \times m

matrix

B

On intermediate exit: if

irevcm = 1

, contains the

n \times m

matrix

B

On intermediate re-entry: must not be changed.

On final exit: the

n \times m

matrix

e^{t A} B

5: $pdb$ – Integer Input

On entry: the stride separating matrix row elements in the array b.

Constraint:

pdb \geq n

6: $t$ – double Input

On entry: the scalar

t

7: $tr$ – double Input

On entry: the trace of

A

. If this is not available then any number can be supplied (

0.0

is a reasonable default); however, in the trivial case,

n = 1

, the result

e^{tr t} B

is immediately returned in the first row of

B

. See Section 9.

8: $b2 [\dim]$ – double Input/Output

Note: the dimension, dim, of the array b2 must be at least

pdb2 \times m

The

(i, j)

th element of the matrix is stored in

b2 [(j - 1) \times pdb2 + i - 1]

On initial entry: need not be set.

On intermediate re-entry: if

irevcm = 1

, must contain

A B

On final exit: the array is undefined.

9: $pdb2$ – Integer Input

On entry: the stride separating matrix row elements in the array b2.

Constraint:

pdb2 \geq n

10: $x [\dim]$ – double Input/Output

Note: the dimension, dim, of the array x must be at least

pdx \times 2

The

(i, j)

th element of the matrix

X

is stored in

x [(j - 1) \times pdx + i - 1]

On initial entry: need not be set.

On intermediate exit: if

irevcm = 2

, contains the current

n \times 2

matrix

X

On intermediate re-entry: if

irevcm = 3

, must contain

A^{T} Y

On final exit: the array is undefined.

11: $pdx$ – Integer Input

On entry: the stride separating matrix row elements in the array x.

Constraint:

pdx \geq n

12: $y [\dim]$ – double Input/Output

Note: the dimension, dim, of the array y must be at least

pdy \times 2

The

(i, j)

th element of the matrix

Y

is stored in

y [(j - 1) \times pdy + i - 1]

On initial entry: need not be set.

On intermediate exit: if

irevcm = 3

, contains the current

n \times 2

matrix

Y

On intermediate re-entry: if

irevcm = 2

, must contain

A X

On final exit: the array is undefined.

13: $pdy$ – Integer Input

On entry: the stride separating matrix row elements in the array y.

Constraint:

pdy \geq n

14: $p [n]$ – double Input/Output

On initial entry: need not be set.

On intermediate re-entry: if

irevcm = 4

, must contain

A z

On final exit: the array is undefined.

15: $r [n]$ – double Input/Output

On initial entry: need not be set.

On intermediate re-entry: if

irevcm = 5

, must contain

A^{T} z

On final exit: the array is undefined.

16: $z [n]$ – double Input/Output

On initial entry: need not be set.

On intermediate exit: if

irevcm = 4

5

, contains the vector

z

On intermediate re-entry: must not be changed.

On final exit: the array is undefined.

17: $comm [n \times m + 3 \times n + 12]$ – double Communication Array

Note: the dimension, dim, of the array comm must be at least

n \times m + 3 \times n + 12

18: $icomm [2 \times n + 40]$ – Integer Communication Array

19: $fail$ – NagError * Input/Output

The NAG error argument (see Section 7 in the Introduction to the NAG Library CL Interface).

6 Error Indicators and Warnings

NE_ALLOC_FAIL: Dynamic memory allocation failed.
See Section 3.1.2 in the Introduction to the NAG Library CL Interface for further information.
NE_BAD_PARAM: On entry, argument $⟨ value ⟩$ had an illegal value.
NE_INT: On entry, $m = ⟨ value ⟩$ .
Constraint: $m \geq 0$ .

On entry, $n = ⟨ value ⟩$ .
Constraint: $n \geq 0$ .

On initial entry, $irevcm = ⟨ value ⟩$ .
Constraint: $irevcm = 0$ .

On intermediate re-entry, $irevcm = ⟨ value ⟩$ .
Constraint: $irevcm = 1$ , $2$ , $3$ , $4$ or $5$ .
NE_INT_2: On entry, $pdb = ⟨ value ⟩$ and $n = ⟨ value ⟩$ .
Constraint: $pdb \geq n$ .

On entry, $pdb2 = ⟨ value ⟩$ and $n = ⟨ value ⟩$ .
Constraint: $pdb2 \geq n$ .

On entry, $pdx = ⟨ value ⟩$ and $n = ⟨ value ⟩$ .
Constraint: $pdx \geq n$ .

On entry, $pdy = ⟨ value ⟩$ and $n = ⟨ value ⟩$ .
Constraint: $pdy \geq n$ .
NE_INTERNAL_ERROR: An internal error has occurred in this function. Check the function call and any array sizes. If the call is correct then please contact NAG for assistance.
See Section 7.5 in the Introduction to the NAG Library CL Interface for further information.
NE_NO_LICENCE: Your licence key may have expired or may not have been installed correctly.
See Section 8 in the Introduction to the NAG Library CL Interface for further information.
NW_SOME_PRECISION_LOSS: $e^{t A} B$ has been computed using an IEEE double precision Taylor series, although the arithmetic precision is higher than IEEE double precision.

7 Accuracy

For a symmetric matrix

A

(for which

A^{T} = A

) the computed matrix

e^{t A} B

is guaranteed to be close to the exact matrix, that is, the method is forward stable. No such guarantee can be given for non-symmetric matrices. See Section 4 of Al–Mohy and Higham (2011) for details and further discussion.

8 Parallelism and Performance

f01gbc is threaded by NAG for parallel execution in multithreaded implementations of the NAG Library.

Please consult the X06 Chapter Introduction for information on how to control and interrogate the OpenMP environment used within this function. Please also consult the Users' Note for your implementation for any additional implementation-specific information.

9 Further Comments

9.1 Use of $T r (A)$

The elements of

A

are not explicitly required by f01gbc. However, the trace of

A

is used in the preprocessing phase of the algorithm. If

T r (A)

is not available to the calling function then any number can be supplied (

0

is recommended). This will not affect the stability of the algorithm, but it may reduce its efficiency.

9.2 When to use f01gbc

f01gbc is designed to be used when

A

is large and sparse. Whenever a matrix multiplication is required, the function will return control to the calling program so that the multiplication can be done in the most efficient way possible. Note that

e^{t A} B

will not, in general, be sparse even if

A

is sparse.

A

is small and dense then f01gac can be used to compute

e^{t A} B

without the use of a reverse communication interface.

The complex analog of f01gbc is f01hbc.

9.3 Use in Conjunction with NAG Library Functions

To compute

e^{t A} B

, the following skeleton code can normally be used:

do {
f01gbc(&irevcm,n,m,b,tdb,t,tr,b2,tdb2,x,tdx,y,tdy,p,r,z,comm,icomm,&fail);
  if (irevcm == 1) {
    .. Code to compute B2=AB ..
  }
  else if (irevcm == 2){
    .. Code to compute Y=AX ..
  }
  else if (irevcm == 3){
    .. Code to compute X=A^T Y ..
  }
  else if (irevcm == 4){
    .. Code to compute P=AZ ..
  }
  else if (irevcm == 5){
    .. Code to compute R=A^T Z ..
  }
} (while irevcm !=0)

The code used to compute the matrix products will vary depending on the way

A

is stored. If all the elements of

A

are stored explicitly, then f16yac) can be used. If

A

is triangular then f16yfc should be used. If

A

is symmetric, then f16ycc should be used. For sparse

A

stored in coordinate storage format f11xac and f11xec can be used. Alternatively if

A

is stored in compressed column format f11mkc can be used.

10 Example

This example computes

e^{t A} B

, where

A = (\begin{matrix} 0.4 & - 0.2 & 1.3 & 0.6 \\ 0.3 & 0.8 & 1.0 & 1.0 \\ 3.0 & 4.8 & 0.2 & 0.7 \\ 0.5 & 0.0 & - 5.0 & 0.7 \end{matrix}),

B = (\begin{matrix} 0.1 & 1.1 \\ 1.7 & - 0.2 \\ 0.5 & 1.0 \\ 0.4 & - 0.2 \end{matrix}),

and

t = - 0.2 .

f01gb: FL CL CPP AD

NAG CL Interfacef01gbc (real_​gen_​matrix_​actexp_​rcomm)

▸▿ Contents

1 Purpose

2 Specification

3 Description

4 References

5 Arguments

6 Error Indicators and Warnings

7 Accuracy

8 Parallelism and Performance

9 Further Comments

9.1 Use of Tr(A)

9.2 When to use f01gbc

9.3 Use in Conjunction with NAG Library Functions

10 Example

10.1 Program Text

10.2 Program Data

10.3 Program Results

NAG CL Interface
f01gbc (real_gen_matrix_actexp_rcomm)

9.1 Use of $T r (A)$