# wavedec2

Multilevel 2-D discrete wavelet transform

## Description

`[`

returns the wavelet decomposition of the matrix `C`

,`S`

] = wavedec2(`X`

,`N`

,`wname`

)`X`

at level
`N`

using the wavelet `wname`

. The output
decomposition structure consists of the wavelet decomposition vector
`C`

and the bookkeeping matrix `S`

, which
contains the number of coefficients by level and orientation.

**Note**

For `gpuArray`

inputs, the supported modes are
`'symh'`

(`'sym'`

) and
`'per'`

. If the input is a `gpuArray`

,
the discrete wavelet transform extension mode used by
`wavedec2`

defaults to `'symh'`

unless the current extension mode is `'per'`

. See the
example Multilevel 2-D Discrete Wavelet Transform on a GPU.

## Examples

## Input Arguments

## Output Arguments

## Algorithms

For images, an algorithm similar to the one-dimensional case is possible for
two-dimensional wavelets and scaling functions obtained from one-dimensional vectors by
tensor product. This kind of two-dimensional DWT leads to a decomposition of
approximation coefficients at level *j* in four components: the
approximation at level *j*+1 and the details in three orientations
(horizontal, vertical, and diagonal).

The chart describes the basic decomposition step for images:

where

— Downsample columns: keep the even-indexed columns.

— Downsample rows: keep the even-indexed rows.

— Convolve with filter

*X*the rows of the entry.— Convolve with filter

*X*the columns of the entry.

and

**Initialization**:
*cA*_{0} = *s*.

So, for *J* = 2, the two-dimensional wavelet tree has the form

## References

[1] Daubechies, Ingrid.
*Ten Lectures on Wavelets*. CBMS-NSF Regional Conference Series
in Applied Mathematics 61. Philadelphia, Pa: Society for Industrial and Applied
Mathematics, 1992.

[2] Mallat, S.G. “A Theory for
Multiresolution Signal Decomposition: The Wavelet Representation.” *IEEE
Transactions on Pattern Analysis and Machine Intelligence* 11, no. 7
(July 1989): 674–93. https://doi.org/10.1109/34.192463.

[3] Meyer, Y. *Wavelets
and Operators*. Translated by D. H. Salinger. Cambridge, UK: Cambridge
University Press, 1995.

## Extended Capabilities

## Version History

**Introduced before R2006a**