The cardinality of the sublattice of closed ideals of operators between certain classical sequence spaces

Abstract

Theorem A and Theorem B of [1] state that for 1<p<∞ the lattice of closed ideals of L(p,c0), L(p,∞) and of L(1,p) are at least of cardinality 2ω. Here we show that the cardinality of the lattice of closed ideals of L(p,c0), L(p,∞) and of L(1,p), is at least 22ω, and thus equal to it.