Josefson-Nissenzweig property for Cp-spaces

Abstract

The famous Rosenthal-Lacey theorem asserts that for each infinite compact space K the Banach space C(K) admits a quotient which is either a copy of c0 or 2. The aim of the paper is to study a natural variant of this result for the space Cp(K) of continuous real-valued maps on K with the pointwise topology. Following famous Josefson-Nissenzweig theorem for infinite-dimensional Banach spaces we introduce a corresponding property (called Josefson-Nissenzweig property, briefly, the JNP) for Cp-spaces. We prove: For a Tychonoff space X the space Cp(X) satisfies the JNP if and only if Cp(X) has a quotient isomorphic to c0 (with the product topology of RN) if and only if Cp(X) contains a complemented subspace, isomorphic to c0. For a pseudocompact space X the space Cp(X) has the JNP if and only if Cp(X) has a complemented metrizable infinite-dimensional subspace. This applies to show that for a Tychonoff space X the space Cp(X) has a complemented subspace isomorphic to R N or c0 if and only if X is not pseudocompact or Cp(X) has the JNP. The space Cp(βN) contains a subspace isomorphic to c0 and admits a quotient isomorphic to ∞ but fails to have a quotient isomorphic to c0. An example of a compact space K without infinite convergent sequences with Cp(K) containing a complemented subspace isomorphic to c0 is constructed.