Rademacher functions in Morrey spaces

Abstract

The Rademacher functions are investigated in the Morrey spaces M(p,w) on [0,1] for 1 p <∞ and weight w being a quasi-concave function. They span l2 space in M(p,w) if and only if the weight w is smaller than the function log2-1/2(2/t) on (0,1). Moreover, if 1 < p < ∞ the Rademacher sunspace Rp is complemented in M(p,w) if and only if it is isomorphic to l2. However, the Rademacher subspace is not complemented in M(1,w) for any quasi-concave weight w. In the last part of the paper geometric structure of Rademacher subspaces in Morrey spaces M(p,w) is described. It turns out that for any infinite-dimensional subspace X of Rp the following alternative holds: either X is isomorphic to l2 or X contains a subspace which is isomorphic to c0 and is complemented in Rp.