Double q-Analytic q-Hermite Binomial Formula and q-Traveling Waves

TL;DR

This paper introduces double q-analytic functions derived from q-Hermite polynomials, providing a q-analogue of traveling waves and solving the associated q-wave equation with initial value problems.

Contribution

It develops a new class of double q-analytic functions and applies them to model q-analogues of traveling waves, including solving the q-wave equation.

Findings

Introduction of double q-analytic functions.

Representation of q-analogue traveling waves.

Solution of the q-wave equation IVP.

Abstract

Motivated by derivation of the Dirac type delta-function for quantum states in Fock-Bargmann representation, we find q-binomial expansion in terms of q-Hermite polynomials, analytic in two complex arguments. Based on this representation, we introduce a new class of complex functions of two complex arguments, which we call the double q-analytic functions. The real version of these functions describe the q-analogue of traveling waves, which is not preserving the shape during evolution as the usual traveling wave. For corresponding q-wave equation we solve IVP in the q-D'Alembert form.