A study on the dual of C(X) with the topology of (strong) uniform convergence on a bornology

Abstract

This article begins by deriving a measure-theoretic decomposition of continuous linear functionals on C(X), the space of all real-valued continuous functions on a metric space (X, d), equipped with the topology τB of uniform convergence on a bornology B. We characterize the bornologies for which (C(X), τB)*=(C(X), τBs)*, where τBs represents the topology of strong uniform convergence on B. Furthermore, we examine the normability of τucb, the topology of uniform convergence on bounded subsets, on (C(X), τB)*, and explore its relationship with the operator norm topology. Finally, we derive a topology on measures that shares a connection with (C(X), τB)* when endowed with τucb.

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