Quadratic-Phase Dunkl Transform: Fundamental properties, translation operators, convolution product and HUP

TL;DR

This paper introduces the quadratic-phase Dunkl transform, explores its fundamental properties, related operators, and establishes a new uncertainty principle, unifying and extending several known integral transforms.

Contribution

It defines a new quadratic-phase Dunkl transform, proves its core properties, and connects it to existing transforms, also establishing a novel uncertainty principle.

Findings

The quadratic-phase Dunkl transform generalizes many known transforms.

Fundamental properties like reversibility and Parseval's formula are established.

A new Heisenberg-type uncertainty principle is proved.

Abstract

In this paper, we introduce and study the quadratic-phase Dunkl transform, a novel integral transform on the real line parameterized by five real numbers $(a, b, c, d, e)$ and a multiplicity parameter $\mu\geq -1/2$. We define the transform and establish its fundamental properties, including continuity, a Riemann--Lebesgue lemma, linearity, scaling, and most importantly, a reversibility theorem and an associated Parseval formula. We show that this novel quadratic-phase integral type transform generalizes a wide class of known transforms, such as the quadratic-phase Fourier-Bessel transform, the quadratic-phase Fourier transform, the linear canonical Dunkl transform, the fractional Dunkl transform, and the classical Dunkl transform, by choosing the appropriate specialization of its parameters. Furthermore, we introduce and investigate a corresponding quadratic-phase Dunkl translation operator and a convolution structure, proving their basic properties and a Young's inequality. Finally, we establish a new Heisenberg-type uncertainty principle for the quadratic-phase Dunkl transform, which extends the classical uncertainty principle for a large class of integral type transforms.