Searching for just a few words should be enough to get started. If you need to make more complex queries, use the tips below to guide you.
Article type: Research Article
Authors: Shapiro, Jacob; *
Affiliations: Department of Mathematics, University of Dayton, Dayton, OH 45469-2316, USA
Correspondence: [*] Corresponding author. E-mail: [email protected].
Abstract: We consider, for h,E>0, resolvent estimates for the semiclassical Schrödinger operator −h2Δ+V−E. Near infinity, the potential takes the form V=VL+VS, where VL is a long range potential which is Lipschitz with respect to the radial variable, while VS=O(|x|−1(log|x|)−ρ) for some ρ>1. Near the origin, |V| may behave like |x|−β, provided 0⩽β<2(3−1). We find that, for any ρ˜>1, there are C,h0>0 such that we have a resolvent bound of the form exp(Ch−2(log(h−1))1+ρ˜) for all h∈(0,h0]. The h-dependence of the bound improves if VS decays at a faster rate toward infinity.
Keywords: Resolvent estimate, Schrödinger operator, short range potential
DOI: 10.3233/ASY-231872
Journal: Asymptotic Analysis, vol. 136, no. 3-4, pp. 157-180, 2024
IOS Press, Inc.
6751 Tepper Drive
Clifton, VA 20124
USA
Tel: +1 703 830 6300
Fax: +1 703 830 2300
[email protected]
For editorial issues, like the status of your submitted paper or proposals, write to [email protected]
IOS Press
Nieuwe Hemweg 6B
1013 BG Amsterdam
The Netherlands
Tel: +31 20 688 3355
Fax: +31 20 687 0091
[email protected]
For editorial issues, permissions, book requests, submissions and proceedings, contact the Amsterdam office [email protected]
Inspirees International (China Office)
Ciyunsi Beili 207(CapitaLand), Bld 1, 7-901
100025, Beijing
China
Free service line: 400 661 8717
Fax: +86 10 8446 7947
[email protected]
For editorial issues, like the status of your submitted paper or proposals, write to [email protected]
如果您在出版方面需要帮助或有任何建, 件至: [email protected]