当前位置: X-MOL 学术J. Spectr. Theory › 论文详情
Our official English website, www.x-mol.net, welcomes your feedback! (Note: you will need to create a separate account there.)
Heat content estimates for the fractional Schrödinger operator $(-\Delta)^\frac {\alpha}{2} + c1_{\Omega}, c > 0$
Journal of Spectral Theory ( IF 1 ) Pub Date : 2020-05-20 , DOI: 10.4171/jst/306
Luis Acuña Valverde 1
Affiliation  

This paper establishes by employing analytic and probabilistic techniques estimates concerning the heat content for the fractional Schrödinger operator $(-\Delta)^\frac {\alpha}{2} + c1_{\Omega}, c > 0$ with $0 < \alpha \leq 2$ in $\mathbb R^d$, $d \geq 2$ and $\Omega$ a Lebesgue measure set satisfying some regularity conditions.

中文翻译:

分数薛定ding算子$(-\ Delta)^ \ frac {\ alpha} {2} + c1 _ {\ Omega}的热量估计,c> 0 $

本文建立通过使用关于所述分析和概率技术估计热含量压裂{\阿尔法} {2} + C1 _ {\欧米茄},C> 0 $以$ 0 <\ ^ \ -为对分数薛定谔操作者$(\德尔塔) $ \ mathbb R ^ d $,$ d \ geq 2 $和$ \ Omega $中的alpha \ leq 2 $是满足某些规则性条件的Lebesgue度量集。
更新日期:2020-07-20
down
wechat
bug