On a class of critical double phase problems

@article{Farkas2022OnAC,
  title={On a class of critical double phase problems},
  author={Csaba Farkas and Alessio Fiscella and Patrick Winkert},
  journal={Journal of Mathematical Analysis and Applications},
  year={2022}
}

References

SHOWING 1-10 OF 51 REFERENCES

On a class of critical (p, q)-Laplacian problems

We obtain nontrivial solutions of a critical (p, q)-Laplacian problem in a bounded domain. In addition to the usual difficulty of the loss of compactness associated with problems involving critical

MULTIPLE SOLUTIONS FOR THE p&q-LAPLACIAN PROBLEM WITH CRITICAL EXPONENT

Multiplicity Results for an Anisotropic Equation with Subcritical or Critical Growth

Abstract In this work we show some multiplicity results for the anisotropic equation where Ω ⊂ℝN is a bounded smooth domain, 1 < p1 ≤ p2 ≤ . . . ≤ pN and λ is a positive parameter. Using genus

An existence result for singular Finsler double phase problems

Regularity for Double Phase Variational Problems

AbstractWe prove sharp regularity theorems for minimisers of a class of variational integrals whose integrand switches between two different types of degenerate elliptic phases, according to the zero

Parametric superlinear double phase problems with singular term and critical growth on the boundary

In this paper, we study quasilinear elliptic equations driven by the double phase operator along with a reaction that has a singular and a parametric superlinear term and with a nonlinear Neumann

Existence and multiplicity results for Kirchhoff type problems on a double phase setting

In this paper, we study two classes of Kirchhoff type problems set on a double phase framework. That is, the functional space where finding solutions coincides with the Musielak-Orlicz-Sobolev space

Multiplicity of solutions for elliptic problems with critical exponent or with a nonsymmetric term

We study the existence of solutions for the following nonlinear degenerate elliptic problems in a bounded domain Q c RN -div(1Vulp-2Vu) = lulp -2U + AUIq2 2u, A > O, where p* is the critical Sobolev

Existence and multiplicity results for double phase problem

...