Characterizations of fractional operators via integral transforms

TL;DR

This paper characterizes fractional operators using integral transforms, extending classical axiomatic results to multiple variables and non-smooth contexts with new proofs and weaker assumptions.

Contribution

It provides necessary axioms for fractional operators, extends characterizations to several variables, and introduces alternative proofs with weakened continuity assumptions.

Findings

Established necessity of axioms for Riemann-Liouville integral

Extended characterization to multiple variables using Titchmarsh theorem

Provided alternative proofs with weaker continuity assumptions

Abstract

In 1972, J. S. Lew established a reasonable conjecture regarding an axiomatic characterization for the one-dimensional Riemann-Liouville integral. This conjecture was proved by Cartwright and McMullen in 1978. After that, little further work has been done on this topic, except some extensions for the Stieltjes case in one and several variables. In this paper, we prove the necessity of the axioms established in the conjecture of J. S. Lew using the Cauchy functional equation and Hamel bases. In addition, we give a proof for the characterization in several variables by employing Titchmarsh theorem, as a natural extension of the approach of Cartwright and McMullen. We also provide an alternative version and proof in one and several variables with Laplace transforms and the Cauchy functional equation, weakening parts of the continuity assumption. We show a similar result for the Riesz potential in terms of the Fourier transform. Finally, we illustrate how the theory can be used for characterization in the context of fractional calculus with respect to a non-smooth integrator, based on transmutation and measures.