Wavelets on Discrete Fields

A new and simple method is presented to study local scaling properties of measures defined on regular and fractal supports. The method, based on a discrete wavelet analysis (WA), complements the well-known multifractal analysis (MA) extensively used in many physical problems. The present wavelet app

Discrete k-valuations on D D k with a pure transcendental field-extension of 1 degree 1 as residue-field fall apart into two classes. The class containing the discrete valuation induced by the Bernstein filtration is completely determined, using the interplay between its valuations and the Bernstein

Using harmonic analysis on a compact Gelfand pair G, K , we study the continuous wavelet analysis on the homogeneous space GrK. As example we give the wavelet associated with the K-biinvariant Poisson kernel on G. Next, using the previous results, we define and study three types of wavelet packets o