On Burkholder function for orthogonal martingales and zeros of Legendre polynomials

Abstract

Burkholder obtained a sharp estimate of |W|p via |Z|p, where W is a martingale transform of Z, or, in other words, for martingales W differentially subordinated to martingales Z. His result is that |W|p (p*-1)p|Z|p, where p* = (p, pp-1). What happens if the martingales have an extra property of being orthogonal martingales? This property is an analog (for martingales) of the Cauchy-Riemann equation for functions, and it naturally appears from a problem on singular integrals (see the references at the end of Section~1). We establish here that in this case the constant is quite different. Actually, |W|p (1+zp1-zp)p|Z|p, p 2, where zp is a specific zero of a certain solution of a Legendre ODE. We also prove the sharpness of this estimate. Asymptotically, (1+zp)/(1-zp)=(4j-20+o(1))p, p∞, where j0 is the first positive zero of the Bessel function of zero order. This connection with zeros of special functions (and orthogonal polynomials for p=n(n+1)) is rather unexpected.