Existence of multiple solutions for a singular and quasilinear equation

K. Saoudi; M. Kratou

doi:10.1080/17476933.2014.981169

Back

Existence of multiple solutions for a singular and quasilinear equation

Journal article

Peer reviewed

Existence of multiple solutions for a singular and quasilinear equation

K. Saoudi and M. Kratou

Complex variables and elliptic equations, Vol.60(7), pp.893-925

03/07/2015

DOI: https://doi.org/10.1080/17476933.2014.981169

Abstract

multiplicity

N-Laplacian equation

singular equation

variational methods

In this paper, we study the following singular elliptic problem: where be a bounded smooth domain, denotes the -Laplace operator, is a parameter and is a constant. We require to satisfy assumptions (g1)-(g2) and to satisfy assumptions (h1)-(h4) in Section 1. We employ variational methods in order to show the existence of such that admits at least two solutions for all one solution for and no solution for all

Metrics

1 Record Views

Details

Title: Existence of multiple solutions for a singular and quasilinear equation
Creators - without role: K. Saoudi - Imam Abdulrahman Bin Faisal University
M. Kratou - Imam Abdulrahman Bin Faisal University
Publication Details: Complex variables and elliptic equations, Vol.60(7), pp.893-925
Publisher: Taylor & Francis
Identifiers: 9915831208331
Academic Unit: Imam Abdulrahman Bin Faisal University
Language: English
Resource Type: Journal article