On projective Banach lattices of the form C(K) and FBL[E]

Abstract

We show that if a Banach lattice is projective, then every bounded sequence that can be mapped by a homomorphism onto the basis of c0 must contain an 1-subsequence. As a consequence, if Banach lattices p or FBL[E] are projective, then p=1 or E has the Schur property, respectively. On the other hand, we show that C(K) is projective whenever K is an absolute neighbourhood retract, answering a question by de Pagter and Wickstead.