Fractional $p\&q$ Laplacian Problems in $\mathbb{R}^{N}$ with Critical Growth

Vincenzo Ambrosio

doi:10.4171/zaa/1661

JournalszaaVol. 39, No. 3pp. 289–314

Fractional $p & q$ Laplacian Problems in $R^{N}$ with Critical Growth

Vincenzo Ambrosio
Università Politecnica delle Marche, Ancona, Italy

$Fractional $p\&q$ Laplacian Problems in $\mathbb{R}^{N}$ with Critical Growth cover$

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Abstract

We deal with the following nonlinear problem involving fractional $p & q$ Laplacians:

(- Δ)_{p}^{s} u + (- Δ)_{q}^{s} u + ∣ u ∣^{p - 2} u + ∣ u ∣^{q - 2} u = λh (x) f (u) + ∣ u ∣^{q_{s}^{*} - 2} u in R^{N},

where $s \in (0, 1)$ , $1 < p < q < \frac{N}{s}$ , $q_{s}^{*} = \frac{Nq}{N - s q}$ , $λ > 0$ is a parameter, $h$ is a nontrivial bounded perturbation and $f$ is a superlinear continuous function with subcritical growth. Using suitable variational arguments and concentration-compactness lemma, we prove the existence of a nontrivial non-negative solution for $λ$ sufficiently large.

Cite this article

Vincenzo Ambrosio, Fractional $p & q$ Laplacian Problems in $R^{N}$ with Critical Growth. Z. Anal. Anwend. 39 (2020), no. 3, pp. 289–314

DOI 10.4171/ZAA/1661