Square Functions and Variational Estimates for Ritt Operators on L1

Abstract

Let T be a bounded operator. We say T is a Ritt operator if n n Tn-Tn+1<∞. It is know that when T is a positive contraction and a Ritt operator in Lp, 1<p<∞, then for any integer m 1, the square function \[( Σn n2m-1 |Tn(I-T)mf|2 )1/2\] defines a bounded operator LeMX-Vq in Lp. In this work, we extend the theory to the endpoint case p=1, showing that if T is a Ritt operator on L1, then the generalized square function \[Qα,s,mf=( Σn nα |Tn(I-T)mf|s )1/s\] is bounded on L1 for α+1<sm. In the specific setting where T is a convolution operator of the form Tμ=Σk μ(k) Ukf, with μ a probability measure on Z and U the composition operator induced by an invertible, ergodic measure preserving transformation, we provide sufficient conditions on μ under which the square function Q2m-1,2,m is of weak type (1,1), for all integers m 1. We also establish bounds for variational and oscillation norms, nβ Tn(1-T)rv(s) and nβ Tn(1-T)ro(s), for Ritt operators, highlighting endpoint behavior.