Classification of positive solutions of critical anisotropic Sobolev equation without the finite volume constraint

Abstract

In this paper, we classify all positive solutions of the critical anisotropic Sobolev equation equation0.1 -Hpu = up*-1, \ \ x∈ Rn equation without the finite volume constraint for n ≥ 3 and pn() < p < n, where p* = npn-p denotes the critical Sobolev exponent, -Hp=-div(Hp-1(·)∇ H(·)) denotes the anisotropic p-Laplace operator and = λ ∈ Rn\\1 ≤ i, j ≤ n\||2(∇2ijHp()) p(p-1)Hp()\. By employing a novel approach based on invariant tensors technique, and using a Kato-type inequality, we prove that the positive solutions of 0.1 can be classified for pn() ≤ p < n, where pn() depends explicitly on . This result removes the finite volume assumption on the classification of critical anisotropic p-Laplace equation which was obtained by Ciraolo-Figalli-Roncoroni in the literature CFR. In particular, this results capture the precise dependence of critical exponents p on both n and .

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