On one variant of strongly nonlinear Gagliardo–Nirenberg inequality involving Laplace operator with application to nonlinear elliptic problems

Tomasz Choczewski; Agnieszka Kalamajska

doi:10.4171/rlm/856

JournalsrlmVol. 30, No. 3pp. 479–496

On one variant of strongly nonlinear Gagliardo–Nirenberg inequality involving Laplace operator with application to nonlinear elliptic problems

Tomasz Choczewski
University of Warsaw, Poland
Agnieszka Kalamajska
University of Warsaw, Poland and Polish Academy of Sciences, Warsaw, Poland

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Abstract

We obtain the inequality

\int_{Ω} ∣\nabla u (x) ∣^{p} h (u (x)) d x \leq C (n, p) \int_{Ω} (∣Δ u (x) ∣∣ T_{h, C} (u (x)) ∣)^{p} h (u (x)) d x,

where $Ω \subset R^{n}$ is a bounded Lipschitz domain, $u \in W_{loc}^{2, 1} (Ω)$ is positive and obeys some additional assumptions, $Δ u$ is the Laplace operator, $T_{h, C} (\cdot)$ is certain transformation of the continuous function $h (\cdot)$ . We also explain how to apply such inequality to deduce regularity for solutions of nonlinear eigenvalue problems of elliptic type for degenerated PDEs, with the illustration within the model of electrostatic micromechanical systems (MEMS).

Cite this article

Tomasz Choczewski, Agnieszka Kalamajska, On one variant of strongly nonlinear Gagliardo–Nirenberg inequality involving Laplace operator with application to nonlinear elliptic problems. Atti Accad. Naz. Lincei Cl. Sci. Fis. Mat. Natur. 30 (2019), no. 3, pp. 479–496

DOI 10.4171/RLM/856