Jump inequalities via real interpolation
Abstract
Jump inequalities are the r=2 endpoint of L\'epingle's inequality for r-variation of martingales. Extending earlier work by Pisier and Xu we interpret these inequalities in terms of Banach spaces which are real interpolation spaces. This interpretation is used to prove endpoint jump estimates for vector-valued martingales and doubly stochastic operators as well as to pass via sampling from Rd to Zd for jump estimates for Fourier multipliers.
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