A unified construction yielding precisely Hilbert and James sequences spaces

Abstract

Following James' approach, we shall define the Banach space J(e) for each vector e=(e1,e2,...,ed) ∈ Rd with e1 0. The construction immediately implies that J(1) coincides with the Hilbert space i2 and that J(1;-1) coincides with the celebrated quasireflexive James space J. The results of this paper show that, up to an isomorphism, there are only the following two possibilities: (i) either J(e) is isomorphic to l2, if e1+e2+...+ed 0 (ii) or J(e) is isomorphic to J. Such a dichotomy also holds for every separable Orlicz sequence space lM.