A new approach to transport equations associated to a regular field: trace results and well-posedness

Abstract

We generalize known results on transport equations associated to a Lipschitz field F on some subspace of RN endowed with some general space measure μ. We provide a new definition of both the transport operator and the trace measures over the incoming and outgoing parts of ∂ generalizing known results from the literature. We also prove the well-posedness of some suitable boundary-value transport problems and describe in full generality the generator of the transport semigroup with no-incoming boundary conditions.

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