NAG Toolbox: nag_sum_fft_real_sine_simple (c06ra)

Purpose

Syntax

Description

References

Parameters

Compulsory Input Parameters

1:     $\mathrm{m}$ – int64int32nag_int scalar

$m$, the number of sequences to be transformed.

Constraint: $\mathbf{m}\ge 1$.

2:     $\mathrm{n}$ – int64int32nag_int scalar

One more than the number of real values in each sequence, i.e., the number of values in each sequence is $n-1$.

Constraint: $\mathbf{n}\ge 1$.

3:     $\mathrm{x}\left(\mathbf{m}\times \left(\mathbf{n}+2\right)\right)$ – double array

the data must be stored in x as if in a two-dimensional array of dimension $\left(1:\mathbf{m},1:\mathbf{n}+2\right)$; each of the $m$ sequences is stored in a row of the array. In other words, if the $n-1$ data values of the $\mathit{p}$th sequence to be transformed are denoted by $x_{\mathit{j}}^{\mathit{p}}$, for $\mathit{j}=1,2,\dots ,n-1$ and $\mathit{p}=1,2,\dots ,m$, then the first $m\left(n-1\right)$ elements of the array x must contain the values

$$x_1^1,x_1^2,\dots ,x_1^m,x_2^1,x_2^2,\dots ,x_2^m,\dots ,x_{n-1}^1,x_{n-1}^2,\dots ,x_{n-1}^m\text{.}$$

The $n$th to $\left(n+2\right)$th elements of each row $x_n^{\mathit{p}},\dots ,x_{n+2}^{\mathit{p}}$, for $\mathit{p}=1,2,\dots ,m$, are required as workspace. These $3m$ elements may contain arbitrary values as they are set to zero by the function.

Optional Input Parameters

None.

Output Parameters

1:     $\mathrm{x}\left(\mathbf{m}\times \left(\mathbf{n}+2\right)\right)$ – double array

the $m$ Fourier sine transforms stored as if in a two-dimensional array of dimension $\left(1:\mathbf{m},1:\mathbf{n}+2\right)$. Each of the $m$ transforms is stored in a row of the array, overwriting the corresponding original sequence. If the $\left(n-1\right)$ components of the $p$th Fourier sine transform are denoted by ${\hat{x}}_{\mathit{k}}^{\mathit{p}}$, for $\mathit{k}=1,2,\dots ,n-1$ and $\mathit{p}=1,2,\dots ,m$, then the $m\left(n+2\right)$ elements of the array x contain the values

$${\hat{x}}_1^1,{\hat{x}}_1^2,\dots ,{\hat{x}}_1^m,{\hat{x}}_2^1,{\hat{x}}_2^2,\dots ,{\hat{x}}_2^m,\dots ,{\hat{x}}_{n-1}^1,{\hat{x}}_{n-1}^2,\dots ,{\hat{x}}_{n-1}^m,0,0,\dots ,0\left(3m\text{ times}\right)\text{.}$$

2:     $\mathrm{ifail}$ – int64int32nag_int scalar

$\mathbf{ifail}=\mathbf{0}$ unless the function detects an error (see Error Indicators and Warnings).

Error Indicators and Warnings

   $\mathbf{ifail}=1$

On entry,

$\mathbf{m}<1$.

   $\mathbf{ifail}=2$

On entry,

$\mathbf{n}<1$.

   $\mathbf{ifail}=3$

An unexpected error has occurred in an internal call. Check all function calls and array dimensions. Seek expert help.

   $\mathbf{ifail}=-99$

An unexpected error has been triggered by this routine. Please contact NAG.

   $\mathbf{ifail}=-399$

Your licence key may have expired or may not have been installed correctly.

   $\mathbf{ifail}=-999$

Dynamic memory allocation failed.

Accuracy

Further Comments

Example

Open in the MATLAB editor: c06ra_example

function c06ra_example


fprintf('c06ra example results\n\n');

% Discrete sine transform of 3 sequences of length 5
m = int64(3);
n = int64(6);
x = zeros(m,n+2);
x(1:m,1:n-1) = [0.6772  0.1138  0.6751  0.6362  0.1424;
                0.2983  0.1181  0.7255  0.8638  0.8723;
                0.0644  0.6037  0.6430  0.0428  0.4815];

[xt, ifail] = c06ra(m, n, x);

disp('X under discrete sine transform:');
y = reshape(xt(1:m*(n-1)),m,n-1);
disp(y);

% Reconstruct using same transform
[xr, ifail] = c06ra(m, n, xt);

disp('X reconstructed under second sine transform:');
y = reshape(x(1:m*(n-1)),m,n-1);
disp(y);

c06ra example results

X under discrete sine transform:
    1.0014    0.0062    0.0834    0.5286    0.2514
    1.2477   -0.6599    0.2570    0.0859    0.2658
    0.8521    0.0719   -0.0561   -0.4890    0.2056

X reconstructed under second sine transform:
    0.6772    0.1138    0.6751    0.6362    0.1424
    0.2983    0.1181    0.7255    0.8638    0.8723
    0.0644    0.6037    0.6430    0.0428    0.4815