On geometric properties of Morrey spaces

Abstract

In this article, we show constructively that Morrey spaces are not uniformly non-1n for any n 2. This result is sharper than those previously obtained in GKSS, MG, which show that Morrey spaces are not uniformly non-square and also not uniformly non-octahedral. We also discuss the n-th James constant C J(n)(X) and the n-th Von Neumann-Jordan constant C NJ(n)(X) for a Banach space X, and obtain that both constants for any Morrey space Mpq(Rd) with 1 p<q<∞ are equal to n.