Complementations in C(K,X) and ∞(X)

Abstract

We investigate the geometry of C(K,X) and ∞(X) spaces through complemented subspaces of the form (i∈ Xi)c0. Concerning the geometry of C(K,X) spaces we extend some results of D. Alspach and E. M. Galego from AlspachGalego. On ∞-sums of Banach spaces we prove that if ∞(X) has a complemented subspace isomorphic to c0(Y), then, for some n ∈ N, Xn has a subspace isomorphic to c0(Y). We further prove the following: (1) If C(K) c0(C(K)) and C(L) c0(C(L)) and ∞(C(K)) ∞(C(L)), then K and L have the same cardinality. (2) If K1 and K2 are infinite metric compacta, then ∞(C(K1)) ∞(C(K2)) if and only if C(K1) is isomorphic to C(K2).