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An Overview on Singular Nonlinear Elliptic Boundary Value Problems

In: Applications of Nonlinear Analysis

Author

Listed:
  • Francesca Faraci

    (University of Catania)

  • George Smyrlis

    (National Technical University of Athens)

Abstract

We give a survey of old and recent results concerning existence and multiplicity of positive solutions (classical or weak) to nonlinear elliptic equations with singular nonlinear terms of the form − Δ p u = f ( x , u ) + u − γ , in Ω u > 0 , in Ω u = 0 , on ∂ Ω , $$\displaystyle \left \{ \begin {array}{ll} -\varDelta _p u= f(x,u)+ u^{-\gamma }, & \mbox{ in }\ \varOmega \\ u>0, & \mbox{ in }\ \varOmega \\ u=0, & \mbox{ on }\ \partial \ \varOmega , \end {array} \right . $$ where Ω is a bounded domain in ℝ N $$\mathbb {R}^N$$ (N ≥ 2) with sufficiently smooth boundary ∂Ω, Δ p u = div(|∇u|p−2∇u) (1 0. In some cases and in order to control more carefully the nonlinearity, we need to multiply the singular term u −γ or f(⋅, u) by positive parameters. The main difficulty which arises in the study of such problems is the lack of differentiability of the corresponding energy functional which represents an obstacle to the application of classical critical point theory.

Suggested Citation

  • Francesca Faraci & George Smyrlis, 2018. "An Overview on Singular Nonlinear Elliptic Boundary Value Problems," Springer Optimization and Its Applications, in: Themistocles M. Rassias (ed.), Applications of Nonlinear Analysis, pages 305-334, Springer.
  • Handle: RePEc:spr:spochp:978-3-319-89815-5_10
    DOI: 10.1007/978-3-319-89815-5_10
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