Variational framework and Lewy-Stampacchia type estimates for nonlocal   operators on Heisenberg group

Divya Goel; Vicentiu D. Radulescu; K. Sreenadh

arXiv:2012.15602·math.AP·January 1, 2021

Variational framework and Lewy-Stampacchia type estimates for nonlocal operators on Heisenberg group

Divya Goel, Vicentiu D. Radulescu, K. Sreenadh

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TL;DR

This paper develops a variational framework and establishes Lewy-Stampacchia estimates for nonlocal operators on the Heisenberg group, contributing to the understanding of solutions to related integro-differential equations.

Contribution

It introduces a novel variational approach and derives Lewy-Stampacchia estimates for nonlocal operators on the Heisenberg group, advancing the analysis of such equations.

Findings

01

Existence of solutions for nonlocal equations on the Heisenberg group

02

Derivation of Lewy-Stampacchia type estimates

03

Development of a variational framework for these operators

Abstract

The aim of this article is to derive some Lewy-Stampacchia estimates and existence of solutions for equations driven by a nonlocal integro-differential operator on the Heisenberg group.

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Taxonomy

TopicsDifferential Equations and Boundary Problems · Advanced Mathematical Modeling in Engineering · Numerical methods in inverse problems