Trace and extension theorems for functions of bounded variation
Abstract
In this paper we show that every L1-integrable function on ∂ can be obtained as the trace of a function of bounded variation in whenever is a domain with regular boundary ∂ in a doubling metric measure space. In particular, the trace class of BV() is L1(∂) provided that supports a 1-Poincar\'e inequality. We also construct a bounded linear extension from a Besov class of functions on ∂ to BV().
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