NAG FL Interface
g13ebf (multi_kalman_sqrt_invar)
1
Purpose
g13ebf performs a combined measurement and time update of one iteration of the time-invariant Kalman filter using a square root covariance filter.
2
Specification
Fortran Interface
Subroutine g13ebf ( |
transf, n, m, l, a, lds, b, stq, q, ldq, c, ldm, r, s, k, h, u, tol, iwk, wk, ifail) |
Integer, Intent (In) |
:: |
n, m, l, lds, ldq, ldm |
Integer, Intent (Inout) |
:: |
ifail |
Integer, Intent (Out) |
:: |
iwk(m) |
Real (Kind=nag_wp), Intent (In) |
:: |
q(ldq,*), r(ldm,m), tol |
Real (Kind=nag_wp), Intent (Inout) |
:: |
a(lds,n), b(lds,l), c(ldm,n), s(lds,n), k(lds,m), h(ldm,m), u(lds,*) |
Real (Kind=nag_wp), Intent (Out) |
:: |
wk((n+m)*(n+m+l)) |
Logical, Intent (In) |
:: |
stq |
Character (1), Intent (In) |
:: |
transf |
|
C Header Interface
#include <nag.h>
void |
g13ebf_ (const char *transf, const Integer *n, const Integer *m, const Integer *l, double a[], const Integer *lds, double b[], const logical *stq, const double q[], const Integer *ldq, double c[], const Integer *ldm, const double r[], double s[], double k[], double h[], double u[], const double *tol, Integer iwk[], double wk[], Integer *ifail, const Charlen length_transf) |
|
C++ Header Interface
#include <nag.h> extern "C" {
void |
g13ebf_ (const char *transf, const Integer &n, const Integer &m, const Integer &l, double a[], const Integer &lds, double b[], const logical &stq, const double q[], const Integer &ldq, double c[], const Integer &ldm, const double r[], double s[], double k[], double h[], double u[], const double &tol, Integer iwk[], double wk[], Integer &ifail, const Charlen length_transf) |
}
|
The routine may be called by the names g13ebf or nagf_tsa_multi_kalman_sqrt_invar.
3
Description
The Kalman filter arises from the state space model given by
where
is the state vector of length
at time
,
is the observation vector of length
at time
and
of length
and
of length
are the independent state noise and measurement noise respectively. The matrices
and
are time invariant.
The estimate of
given observations
to
is denoted by
with state covariance matrix
while the estimate of
given observations
to
is denoted by
with covariance matrix
. The update of the estimate,
, from time
to time
is computed in two stages. First, the measurement-update is given by
where
is the Kalman gain matrix. The second stage is the time-update for
, which is given by
where
represents any deterministic control used.
The square root covariance filter algorithm provides a stable method for computing the Kalman gain matrix and the state covariance matrix. The algorithm can be summarised as
where
is an orthogonal transformation triangularizing the left-hand pre-array to produce the right-hand post-array. The triangularization is carried out via Householder transformations exploiting the zero pattern of the pre-array. The relationship between the Kalman gain matrix
and
is given by
In order to exploit the invariant parts of the model to simplify the computation of
the results for the transformed state space
are computed where
is the transformation that reduces the matrix pair
to lower observer Hessenberg form. That is, the matrix
is computed such that the compound matrix
is a lower trapezoidal matrix. Further the matrix
is transformed to
. These transformations need only be computed once at the start of a series, and
g13ebf will, optionally, compute them.
g13ebf returns transformed matrices
,
,
and
, the Cholesky factor of the updated transformed state covariance matrix
(where
) and the matrix
, valid for both transformed and original models, which is used in the computation of the likelihood for the model. Note that the covariance matrices
and
can be time-varying.
4
References
Vanbegin M, van Dooren P and Verhaegen M H G (1989) Algorithm 675: FORTRAN subroutines for computing the square root covariance filter and square root information filter in dense or Hessenberg forms ACM Trans. Math. Software 15 243–256
Verhaegen M H G and van Dooren P (1986) Numerical aspects of different Kalman filter implementations IEEE Trans. Auto. Contr. AC-31 907–917
5
Arguments
-
1:
– Character(1)
Input
-
On entry: indicates whether to transform the input matrix pair
to lower observer Hessenberg form. The transformation will only be required on the first call to
g13ebf.
- The matrices in arrays a and c are transformed to lower observer Hessenberg form and the matrices in b and s are transformed as described in Section 3.
- The matrices in arrays a, c and b should be as returned from a previous call to g13ebf with .
Constraint:
or .
-
2:
– Integer
Input
-
On entry: , the size of the state vector.
Constraint:
.
-
3:
– Integer
Input
-
On entry: , the size of the observation vector.
Constraint:
.
-
4:
– Integer
Input
-
On entry: , the dimension of the state noise.
Constraint:
.
-
5:
– Real (Kind=nag_wp) array
Input/Output
-
On entry: if
, the state transition matrix,
.
If , the transformed matrix as returned by a previous call to g13ebf with .
On exit: if
, the transformed matrix,
, otherwise
a is unchanged.
-
6:
– Integer
Input
-
On entry: the first dimension of the arrays
a,
b,
s,
k and
u as declared in the (sub)program from which
g13ebf is called.
Constraint:
.
-
7:
– Real (Kind=nag_wp) array
Input/Output
-
On entry: if
, the noise coefficient matrix
.
If , the transformed matrix as returned by a previous call to g13ebf with .
On exit: if
, the transformed matrix,
, otherwise
b is unchanged.
-
8:
– Logical
Input
-
On entry: if
, the state noise covariance matrix
is assumed to be the identity matrix. Otherwise the lower triangular Cholesky factor,
, must be provided in
q.
-
9:
– Real (Kind=nag_wp) array
Input
-
Note: the second dimension of the array
q
must be at least
if
.
On entry: if
,
q must contain the lower triangular Cholesky factor of the state noise covariance matrix,
. Otherwise
q is not referenced.
-
10:
– Integer
Input
-
On entry: the first dimension of the array
q as declared in the (sub)program from which
g13ebf is called.
Constraints:
- if , ;
- otherwise .
-
11:
– Real (Kind=nag_wp) array
Input/Output
-
On entry: if
, the measurement coefficient matrix,
.
If , the transformed matrix as returned by a previous call to g13ebf with .
On exit: if
, the transformed matrix,
, otherwise
c is unchanged.
-
12:
– Integer
Input
-
On entry: the first dimension of the arrays
c,
r and
h as declared in the (sub)program from which
g13ebf is called.
Constraint:
.
-
13:
– Real (Kind=nag_wp) array
Input
-
On entry: the lower triangular Cholesky factor of the measurement noise covariance matrix .
-
14:
– Real (Kind=nag_wp) array
Input/Output
-
On entry: if
the lower triangular Cholesky factor of the state covariance matrix,
.
If the lower triangular Cholesky factor of the covariance matrix of the transformed state vector as returned from a previous call to g13ebf with .
On exit: the lower triangular Cholesky factor of the transformed state covariance matrix, .
-
15:
– Real (Kind=nag_wp) array
Output
-
On exit: the Kalman gain matrix for the transformed state vector premultiplied by the state transformed transition matrix, .
-
16:
– Real (Kind=nag_wp) array
Output
-
On exit: the lower triangular matrix .
-
17:
– Real (Kind=nag_wp) array
Output
-
Note: the second dimension of the array
u
must be at least
if
.
On exit: if
the
by
transformation matrix
, otherwise
u is not referenced.
-
18:
– Real (Kind=nag_wp)
Input
-
On entry: the tolerance used to test for the singularity of
. If
, then
is used instead. The inverse of the condition number of
is estimated by a call to
f07tgf. If this estimate is less than
tol then
is assumed to be singular.
Suggested value:
.
Constraint:
.
-
19:
– Integer array
Workspace
-
20:
– Real (Kind=nag_wp) array
Workspace
-
-
21:
– Integer
Input/Output
-
On entry:
ifail must be set to
,
or
to set behaviour on detection of an error; these values have no effect when no error is detected.
A value of causes the printing of an error message and program execution will be halted; otherwise program execution continues. A value of means that an error message is printed while a value of means that it is not.
If halting is not appropriate, the value
or
is recommended. If message printing is undesirable, then the value
is recommended. Otherwise, the value
is recommended.
When the value or is used it is essential to test the value of ifail on exit.
On exit:
unless the routine detects an error or a warning has been flagged (see
Section 6).
6
Error Indicators and Warnings
If on entry
or
, explanatory error messages are output on the current error message unit (as defined by
x04aaf).
Errors or warnings detected by the routine:
-
On entry, .
Constraint: .
On entry, and .
Constraint: .
On entry, .
Constraint: .
On entry, and .
Constraint: .
On entry, and .
Constraint: .
On entry, .
Constraint: .
On entry, .
Constraint: .
On entry, .
Constraint: .
On entry, .
Constraint: or .
-
The matrix is singular.
An unexpected error has been triggered by this routine. Please
contact
NAG.
See
Section 7 in the Introduction to the NAG Library FL Interface for further information.
Your licence key may have expired or may not have been installed correctly.
See
Section 8 in the Introduction to the NAG Library FL Interface for further information.
Dynamic memory allocation failed.
See
Section 9 in the Introduction to the NAG Library FL Interface for further information.
7
Accuracy
The use of the square root algorithm improves the stability of the computations as compared with the direct coding of the Kalman filter. The accuracy will depend on the model.
8
Parallelism and Performance
g13ebf is threaded by NAG for parallel execution in multithreaded implementations of the NAG Library.
g13ebf makes calls to BLAS and/or LAPACK routines, which may be threaded within the vendor library used by this implementation. Consult the documentation for the vendor library for further information.
Please consult the
X06 Chapter Introduction for information on how to control and interrogate the OpenMP environment used within this routine. Please also consult the
Users' Note for your implementation for any additional implementation-specific information.
For models with time-varying
and
,
g13eaf can be used.
The initial estimate of the transformed state vector can be computed from the estimate of the original state vector
, say, by premultiplying it by
as returned by
g13ebf with
; that is,
. The estimate of the transformed state vector
can be computed from the previous value
by
where
are the independent one-step prediction residuals for both the transformed and original model. The estimate of the original state vector can be computed from the transformed state vector as
. The required matrix-vector multiplications can be performed by
f06paf.
If
and
are independent multivariate Normal variates then the log-likelihood for observations
is given by
where
is a constant.
The Cholesky factors of the covariance matrices can be computed using
f07fdf.
Note that the model
can be specified either with
b set to the identity matrix and
and the matrix
input in
q or with
and
b set to
.
The algorithm requires
operations and is backward stable (see
Verhaegen and van Dooren (1986)). The transformation to lower observer Hessenberg form requires
operations.
10
Example
This example first inputs the number of updates to be computed and the problem sizes. The initial state vector and the Cholesky factor of the state covariance matrix are input followed by the model matrices
and optionally
(the Cholesky factors of the covariance matrices being input). At the first update the matrices are transformed using the
option and the initial value of the state vector is transformed. At each update the observed values are input and the residuals are computed and printed and the estimate of the transformed state vector,
, and the deviance are updated. The deviance is
ignoring the constant. After the final update the estimate of the state vector is computed from the transformed state vector and the state covariance matrix is computed from
s and these are printed along with the value of the deviance.
The data is for a two-dimensional time series to which a VARMA
has been fitted. For the specification of a VARMA model as a state space model see the
G13 Chapter Introduction. The means of the two series are included as additional states that do not change over time. The initial value of
,
, is the solution to
10.1
Program Text
10.2
Program Data
10.3
Program Results