Boundedness and concentration of random singular integrals defined by wavelet summability kernels
Abstract
We use Cram\'er-Chernoff type estimates in order to study the Calder\'on-Zygmund structure of the kernels ΣI∈DaI(ω)I(x)I(y) where aI are subgaussian independent random variables and \I: I∈D\ is a wavelet basis where D are the dyadic intervals in R. We consider both, the cases of standard smooth wavelets and the case of the Haar wavelet.
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