Isolated singularities for elliptic equations with convolution terms in a punctured ball

Abstract

The purpose of this article is two-fold. First, we investigate the inequality - u+V(x) u≥ f in B1\0\⊂ RN , N ≥ 2, where f∈ L1loc(B1). If V≥ 0 is radially symmetric, we provide optimal conditions for which any solution 0≤ u∈ C2(B1\0\) of the above inequality satisfies u, u, V(x)u∈ L1loc(B1). This extends a result of H. Brezis and P.-L. Lions (1982), originally established for constant potentials V. Second, we investigate the equation - u + λ V(x) u = (Kα, β * up) uq B1 \0\, where 0≤ V∈ C0, ( B1\0\), 0<<1, λ, p, q>0 and Kα, β(x) = |x|-αβ2e|x|, 0 ≤ α < N, β ∈ R. For N ≥ 3, we establish sharp conditions on the exponents α, β, p, q under which singular solutions exist and exhibit the asymptotic behavior u(x) |x|2-N near the origin. For N = 2, we provide a classification of the existence and boundedness of solutions based on the local behavior of the potential V(x) near the origin.

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