Construction of wavelet bases with hexagonal symmetry

In this paper, we construct two-dimensional continuous (smooth) Malvar wavelets defined on a hexagon A, which constitute an orthonormal basis of L 2 (A). The method can be generalized to many hexagons.

A construction of orthogonal wavelet bases in \(L_{2}\left(R^{d}\right)\) from a multiresolution analysis is given when the scaling function is skew-symmetric about an integer point. These wavelets are real-valued when the scaling function is real-valued. As an application, orthogonal wavelets gener

We discuss wavelet frames constructed via multiresolution analysis (MRA), with emphasis on tight wavelet frames. In particular, we establish general principles and specific algorithms for constructing framelets and tight framelets, and we show how they can be used for systematic constructions of spl

Bidimensional wavelet bases are constructed by means of McClellan's transformation applied to a pair of one-dimensional biorthogonal wavelet filters. It is shown that under some conditions on the transfer function F(Wl,W2) associated to the McClellan transformation and on the dilation matrix D, it i