On asymptotic behavior of Battle–Lemarié scaling functions and wavelets

We study the asymptotic form as p r ϱ of the Daubechies orthogonal minimum phase filter h p [n], scaling function f p (t), and wavelet w p (t). Kateb and Lemarie ´calculated the leading term in the phase of the frequency response leads us to a problem in stationary phase, for an oscillatory integra

The wavelet expansion has proven to be an efficient method in the approximation of functions [2][3][4][5], thus pro-In this paper, the continuous operator is discretized into matrix forms by Galerkin's procedure, using periodic Battle-Lemarie waveviding an effective approach to the solution of integ

In this paper, the relationship between the filter coefficients and the scaling and wavelet functions of the Discrete Wavelet Transform is presented and exemplified from a practical point-of-view. The explanations complement the wavelet theory, that is well documented in the literature, being import