The foundational inequalities of D.L. Burkholder and some of their ramifications

TL;DR

This paper reviews how Burkholder's martingale inequalities influence bounds for singular integral operators like the Hilbert transform and Riesz transforms, highlighting their optimality and connections to other mathematical conjectures.

Contribution

It demonstrates the application of Burkholder's inequalities to obtain near-optimal bounds for specific singular integral operators and explores their relevance to broader mathematical problems.

Findings

Optimal bounds for Hilbert and Riesz transforms established

Connections to Morrey's and Iwaniec's conjectures discussed

Open problems and conjectures outlined

Abstract

This paper present an overview of some of the applications of the martingale inequalities of D.L. Burkholder to $L^p$-bounds for singular integral operators, concentrating on the Hilbert transform, first and second order Riesz transforms, the Beurling-Ahlfors operator and other multipliers obtained by projections (conditional expectations) of transformations of stochastic integrals. While martingale inequalities can be used to prove the boundedness of a wider class of Calder\'on-Zygmund singular integrals, the aim of this paper is to show results which give optimal or near optimal bounds in the norms, hence our restriction to the above operators. Connections of Burkholder's foundational work on sharp martingale inequalities to other areas of mathematics where either the results themselves or techniques to prove them have become of considerable interest in recent years, are discussed. These include the 1952 conjecture of C.B. Morrey on rank-one convex and quasiconvex functions with connections to problems in the calculus of variations and the 1982 conjecture of T. Iwaniec on the $L^p$-norm of the Beurling-Ahlfors operator with connections to problems in the theory of qasiconformal mappings. Open questions, problems and conjectures are listed throughout the paper and copious references are provided.