Least energy solutions for affine $p$-Laplace equations involving subcritical and critical nonlinearities

Abstract: The paper is concerned with Lane-Emden and Brezis-Nirenberg problems involving the affine $p$-laplace nonlocal operator $\Delta_p^{\cal A}$, which has been introduced in \cite{HJM5} driven by the affine $L^p$ energy ${\cal E}{p,\Omega}$ from convex geometry due to Lutwak, Yang and Zhang \cite{LYZ2}. We are particularly interested in the existence and nonexistence of positive $C^1$ solutions of least energy type. Part of the main difficulties are caused by the absence of convexity of ${\cal E}{p,\Omega}$ and by the comparison ${\cal E}{p,\Omega}(u) \leq \Vert u \Vert{W^{1,p}_0(\Omega)}$ generally strict.