Characterizations of norm--parallelism in spaces of continuous functions

Abstract

In this paper, we consider the characterization of norm--parallelism problem in some classical Banach spaces. In particular, for two continuous functions f, g on a compact Hausdorff space K, we show that f is norm--parallel to g if and only if there exists a probability measure (i.e. positive and of full measure equal to 1) μ with its support contained in the norm attaining set \x∈ K: \, |f(x)| = \|f\|\ such that |∫K f(x)g(x)dμ(x)| = \|f\|\,\|g\|.