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Paper detail

Ground States for Nonlocal Schrödinger Type Operators on Locally Compact Abelian Groups

We find classes of nonlocal operators of Schrödinger type on a locally compact noncompact Abelian group $G$, for which there exists a ground state. In particular, such a result is obtained for the case where the principal part of our operator generates a recurrent random walk. Explicit conditions for the existence of a ground state are obtained for the case $G =\mathbb Q_p^n$ where $\mathbb Q_p$ is the field of $p$-adic numbers.

preprint2020arXivOpen access
Anatoly N. KochubeiYuri Kondratiev
math-phmath.FAmath.MP
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Anatoly N. KochubeiYuri Kondratiev

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