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Autori principali: Sussman, Ethan, Wunsch, Jared
Natura: Preprint
Pubblicazione: 2025
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Accesso online:https://arxiv.org/abs/2512.17104
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author Sussman, Ethan
Wunsch, Jared
author_facet Sussman, Ethan
Wunsch, Jared
contents We provide a short proof of the convergence of the Born series on asymptotically conic manifolds, at sufficiently high energy. The potential is allowed to have multiple Coulomb singularities. This is handled using powerful semiclassical estimates recently proven by Hintz for the case of a single dipole (or better) singularity. The potential is also allowed to be long-range, like the actual Coulomb potential $1/r$; long-range potentials are handled using anisotropic semiclassical (sc-) Sobolev spaces. As a consequence of the above estimates, we show the existence of a resonance-free region for Hamiltonians with multiple screened Coulomb singularities.
format Preprint
id arxiv_https___arxiv_org_abs_2512_17104
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle On the convergence of the Born series for Coulomb potentials
Sussman, Ethan
Wunsch, Jared
Mathematical Physics
We provide a short proof of the convergence of the Born series on asymptotically conic manifolds, at sufficiently high energy. The potential is allowed to have multiple Coulomb singularities. This is handled using powerful semiclassical estimates recently proven by Hintz for the case of a single dipole (or better) singularity. The potential is also allowed to be long-range, like the actual Coulomb potential $1/r$; long-range potentials are handled using anisotropic semiclassical (sc-) Sobolev spaces. As a consequence of the above estimates, we show the existence of a resonance-free region for Hamiltonians with multiple screened Coulomb singularities.
title On the convergence of the Born series for Coulomb potentials
topic Mathematical Physics
url https://arxiv.org/abs/2512.17104