On positive solutions of critical semilinear equations involving the Logarithmic Laplacian
Abstract
In this paper, we classify the solutions of the critical semilinear problem involving the logarithmic Laplacian (E) L u= k u u, u≥0 \ in\ \ Rn, where k∈(0,+∞), L is the logarithmic Laplacian in Rn with n∈N, and s s=0 if s=0. When k=4n, problem (E) only has the solutions with the form u x,t(x)=βn (tt2+|x- x|2))n2 for any t>0, x∈Rn, where n∈N, βn=2 n2 e n2( n2) >0. When k∈(0,+∞)\ 4n\, problem (E) has no any positive solution.
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