Factoring the Sobolev embedding operator

Abstract

The paper studies the factorization and summing properties of the Sobolev embedding operator. We propose two different approaches. One shows that the Sobolev embedding operator S:W1,1(T2) L2(T2) factorises through the identical embedding _2 for some Young function with Matuszewska-Orlicz index 1. Proof of this fact is based on two results of independent interest. First, a necessary and sufficient conditions on a Young function and weight for boundedness of the embedding of the Sobolev space W1,1(T2) into Besov-Orlicz space B,1(T2). Second, a generalization of the Marcinkiewicz sampling theorem to the context of Orlicz spaces. Another approach is based on the extrapolation of (p,1)-summing norm.

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