English

Polyharmonic Kirchhoff type equations with singular exponential nonlinearities

Analysis of PDEs 2016-04-04 v1

Abstract

\noi In this article, we study the existence of non-negative solutions of the following polyharmonic Kirchhoff type problem with critical singular exponential nolinearity {M(Ωmunmdx)Δnmmu=f(x,u)xα  in  \Om,u=u==m1u=0on\Om, \quad \left\{ \begin{array}{lr} \quad -M\left(\displaystyle\int_\Omega |\nabla^m u|^{\frac{n}{m}}dx\right)\Delta_{\frac{n}{m}}^{m} u = \frac{f(x,u)}{|x|^\alpha} \; \text{in}\; \Om{,} \quad \quad u = \nabla u=\cdot\cdot\cdot= {\nabla}^{m-1} u=0 \quad \text{on} \quad \partial \Om{,} \end{array} \right. where \Om\mbRn\Om\subset \mb R^n is a bounded domain with smooth boundary, n2m2n\geq 2m\geq 2 and f(x,u)f(x,u) behaves like eunnme^{|u|^{\frac{n}{n-m}}} as u\ra|u|\ra\infty. Using mountain pass structure and {the} concentration compactness principle, we show the existence of a nontrivial solution. %{OR}\\ In the later part of the paper, we also discuss the above problem with convex-concave type sign changing nonlinearity. Using {the} Nehari manifold technique, we show the existence and multiplicity of non-negative solutions. \medskip

Keywords

Cite

@article{arxiv.1604.00155,
  title  = {Polyharmonic Kirchhoff type equations with singular exponential nonlinearities},
  author = {Pawan Kumar Mishra and Sarika Goyal and K. Sreenadh},
  journal= {arXiv preprint arXiv:1604.00155},
  year   = {2016}
}

Comments

Communications in pure and applied analysis (2016)

R2 v1 2026-06-22T13:23:04.381Z