Sato-tate Theorems for Mellin Transforms over Finite Fields

Convolution and Equidistribution: Sato-Tate theorems for finite-field Mellin transforms

Sato-tate Theorems for Finite-field Mellin Transforms

as χ varies over all multiplicative characters of k. For each χ, S(χ) is real, and (by Weil) has absolute value at most 2. Evans found empirically that, for large q = #k, these q − 1 sums were approximately equidistributed for the “Sato-Tate measure” (1/2π) √ 4− x2dx on the closed interval [−2, 2], and asked if this equidistribution was provably true. Rudnick had done numerics on the sums T (χ)...

Classical Wavelet Transforms over Finite Fields

This article introduces a systematic study for computational aspects of classical wavelet transforms over finite fields using tools from computational harmonic analysis and also theoretical linear algebra. We present a concrete formulation for the Frobenius norm of the classical wavelet transforms over finite fields. It is shown that each vector defined over a finite field can be represented as...

Convolution and Equidistribution: Sato-tate Theorems for Finite Fields Mellin Trans- Forms

The story of equidistribution in number theory began about a hundred years ago with H. Weyl's paper [18] concerning the distribution of sequences of real numbers modulo 1, and more generally that of points in euclidean space modulo a lattice. The theme of equidistribution has since become one of the most important unifying viewpoints in number theory. Equidistribution statements exist in many a...

New Type Paley–wiener Theorems for the Modified Multidimensional Mellin Transform

New type Paley–Wiener theorems for the modified multidimensional Mellin and inverse Mellin transforms are established. The supports of functions are described in terms of their modified Mellin (or inverse Mellin) transform without passing to the complexification.