Multiparameter extensions of the Christ-Kiselev maximal theorem: strong variational bounds
Abstract
For a linear operator T bounded from Lp(Y) to Lq(X), the Christ-Kiselev theorem gives Lp Lq bounds for the maximal function T* associated to filtrations on Y. This result has been extended by establishing bounds for the maximal function associated to a product of filtrations, also known as the multiparameter extension of the Christ-Kiselev theorem. In this note, we strengthen the multiparameter theorem by proving the r-variational bounds for the multiparameter trunctations when r>p. Furthermore, we replace T by a multilinear operator to obtain a strong variational, multilinear, multiparameter extension of the Christ-Kiselev theorem.
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