Oblique derivative problem for elliptic second-order semi-linear equations in a domain with a conical boundary point

Date

2018-03-14

Authors

Bodzioch, Mariusz
Borsuk, Mikhail

Journal Title

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Volume Title

Publisher

Texas State University, Department of Mathematics

Abstract

This article concerns the oblique boundary value problem for elliptic semi-linear equations in a domain with a conical point on the boundary. We investigate the asymptotic behavior of strong solutions near a boundary conical point. New regularity theorems are established under the least possible assumptions on the equation coefficients. The investigation of asymptotic properties of solutions can be used to obtain new solvability theorems. The results obtained in this paper are extensions of our previous results to a wider class of elliptic equations.

Description

Keywords

Elliptic equations, Oblique problem, Conical points

Citation

Bodzioch, M., & Borsuk, M. (2018). Oblique derivative problem for elliptic second-order semi-linear equations in a domain with a conical boundary point. <i>Electronic Journal of Differential Equations, 2018</i>(69), pp. 1-20.

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Attribution 4.0 International

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