Symmetric finite representability of p-spaces in rearrangement invariant spaces on (0,∞)

Abstract

For a separable rearrangement invariant space X on (0,∞) of fundamental type we identify the set of all p∈ [1,∞] such that p is finitely represented in X in such a way that the unit basis vectors of p (c0 if p=∞) correspond to pairwise disjoint and equimeasurable functions. This characterization hinges upon a description of the set of approximate eigenvalues of the doubling operator x(t) x(t/2) in X. We prove that this set is surprisingly simple: depending on the values of some dilation indices of such a space, it is either an interval or a union of two intervals. We apply these results to the Lorentz and Orlicz spaces.