MAD Families of Projections on l2 and Real-Valued Functions on Omega

Abstract

Two sets are said to be almost disjoint if their intersection is finite. Almost disjoint subsets of [omega]omega and omegaomega have been studied for quite some time. In particular, the cardinal invariants a and ae, defined to be the minimum cardinality of a maximal infinite almost disjoint family of [omega]omega and omegaomega respectively, are known to be consistently less than continuum. Here we examine analogs for functions in Romega and projections on l2, showing that they too can be consistently less than continuum.