Uniqueness of a pre-generator for C0-semigroup on a general locally convex vector space
Abstract
The main purpose is to generalize a theorem of Arendt about uniqueness of C0-semigroups from Banach space setting to the general locally convex vector spaces, more precisely, we show that cores are the only domains of uniqueness for C0-semigroups on locally convex spaces. As an application, we find a necessary and sufficient condition for that the mass transport equation has one unique L1(d,dx) weak solution.
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