Square Functions for Ritt Operators in L1
Abstract
T is a Ritt operator in Lp if n n\|Tn-Tn+1\|<∞. From LeMX-Vq, if T is a positive contraction and a Ritt operator in Lp, 1<p<∞, the square function ( Σn n2m+1 |Tn(I-T)m+1f|2 )1/2 is bounded. We show that if T is a Ritt operator in L1, \[Qα,s,mf=( Σn nα |Tn(I-T)mf|s )1/s\] is bounded L1 when α+1<sm, and examine related questions on variational and oscillation norms.
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