A characterization of p-spaces symmetrically finitely represented in symmetric sequence spaces

Abstract

For a separable symmetric sequence space X of fundamental type we identify the set F(X) of all p∈ [1,∞] such that p is block finitely represented in the unit vector basis \ek\k=1∞ of X in such a way that the unit basis vectors of p (c0 if p=∞) correspond to pairwise disjoint blocks of \ek\ with the same ordered distribution. It turns out that F(X) coincides with the set of approximate eigenvalues of the operator (xk) Σk=2∞ x[k/2]ek in X. In turn, we establish that the latter set is the interval [2αX,2βX], where αX and βX are the Boyd indices of X. As an application, we find the set F(X) for arbitrary Lorentz and separable sequence Orlicz spaces.