A generalized conservation property for the heat semigroup on weighted manifolds
J Masamune, M Schmidt - Mathematische annalen, 2020 - Springer
Mathematische annalen, 2020•Springer
In this text we study a generalized conservation property for the heat semigroup generated
by a Schrödinger operator with nonnegative potential on a weighted manifold. We establish
Khasminskii's criterion for the generalized conservation property and discuss several
applications.
by a Schrödinger operator with nonnegative potential on a weighted manifold. We establish
Khasminskii's criterion for the generalized conservation property and discuss several
applications.
Abstract
In this text we study a generalized conservation property for the heat semigroup generated by a Schrödinger operator with nonnegative potential on a weighted manifold. We establish Khasminskii’s criterion for the generalized conservation property and discuss several applications.
Springer
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