Manifolds of continuous BV-functions and vector measure regularity of Banach-Lie groups

Abstract

We construct a smooth Banach manifold BV([a,b], M) whose elements are suitably-defined functions f:[a,b] → M of bounded variation with values in a smooth Banach manifold M which admits a local addition. If the target manifold is a Banach-Lie group G, with Lie algebra g, we obtain a Banach-Lie group BV([a,b], G) with Lie algebra BV([a, b], g). Strengthening known regularity properties of Banach-Lie groups, we construct a smooth evolution map from a Banach space of g-valued vector measures on [0,1] to BV([0,1],G).

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