8.1 Orthonormal wavelet basis

Intro to digital signal processing Page 1 / 1

An orthonormal wavelet basis is an orthonormal basis of the form

B 2 j 2 2 j t k j k

The function

t

is called the wavelet .

The problem is how to find a function $t$ so that the set $B$ is an orthonormal set.

Haar wavelet

The Haar basis (described by Haar in 1910) is an orthonormalbasis with wavelet $t$

t 1 0 t 1 2 -1 1 2 t 1 0

For the Haar wavelet, it is easy to verify that the set

B

is an orthonormal set ( ).

Notation: $_{j, k} t 2 j 2 2 j t k$ where $j$ is an index of scale and $k$ is an index of location .

If $B$ is an orthonormal set then we have the wavelet series.

x t j

∞ ∞ k ∞ ∞ d j k j , k t

d j k t

∞ ∞ x t j , k t

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Source: OpenStax, Intro to digital signal processing. OpenStax CNX. Jan 22, 2004 Download for free at http://cnx.org/content/col10203/1.4

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