A variant of the (p) set problem in Orlicz spaces

Abstract

We introduce () -sets as generalizations of (p) -sets. These sets are defined in terms of Orlicz norms. We consider ()-sets when the Matuszewska-Orlicz index of is larger than 2 . When S is a ()-set, we establish an estimate of the size of S [-N,N] where N ∈ N . Next, we construct a (1)-set which is not a (2)-set for any 2 such that u ≥ 1 2(u) / 1(u) = ∞ by using a probabilistic method. With an additional assumption about a subset E of Z, we can construct such a (1)-set contained in E. These statements extend known results on the structure of (p) -sets to ()-sets.

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