Localized locally convex topologies

Abstract

Motivated by ill-posed PDEs such as div (v) = F we study locally convex topologies TC on real vector spaces X that are a ``localized'' version of a locally convex topology T to members of a family C of convex subsets of X. The distributions F arising as div (v) are expected to be the members of the dual of well-chosen X with respect to an appropriate localized topology TC. In this work, the emphasis is on studying the functional analytic properties of TC, according to those of T and C. For instance, we show that in all foreseen applications, TC is sequential but none of Fr\'echet-Urysohn, barrelled, and bornological. These awkward phenomena are illustrated explicitly on a specific example corresponding to the distributional divergence of continuous vector fields in Rm. We also show that, essentially, TC is semireflexive if and only if members of C are T-compact. This leads to an abstract existence theorem, thereby establishing a general scheme for characterizing those F such that div (v) = F for various classes of regularity of v, various classes of domains, and various boundary conditions.

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