Hausdorff measure of noncompactness in subspaces of continuous functions of codimension one

We consider some quantities in the space of functions continuous on a bounded interval, which are related to monotonicity of functions. Based on those quantities we construct a few measures of noncompactness in the mentioned function space. Several properties of those measures are established; among

Bilinear isometry, subspaces of continuous functions, generalized peak point ## MSC (2000) 46A55, 46E15 Let A and B be strongly separating linear subspaces of C0(X) and C0(Y ), respectively, and assume that ∂A = ∅ (∂A stands for the set of generalized peak points for A) and ∂B = ∅. Let T : A × B

Let C R (X) denote, as usual, the Banach algebra of all real valued continuous functions on a compact Hausdorff space X endowed with the supremum norm. We present an elementary proof of the following extension result for C R (X): For a given g ∈ C R (X) with zero set Zg and for the n-tuple (f1, . .

In this paper we prove that if A is a strongly separating linear subspace of Ca(X). that is, for every x, y E X there exists f E A such that If(x)l ~ If(!t)l, then the Silov boundary for A exists and is the closure of the Choquet boundary, for A+ If, in addition, we assume that A is a closed subalge