A Choquard type equation with a singular absorption nonlinearity in two dimension
Abstract
In this article, we show the existence of a nonnegative solution to the singular problem ( P) posed in a bounded domain in R2 (see below). We achieve this by approximating the singular function u-β(u) by a function l(u) which pointwisely converges to -uβ(u) as 0. Using variational techniques, the perturbed equation - u+l(u)= (F(u(y))|x-y|μdy)f(u(x)) is shown to have a solution u ∈ H01() when the parameter >0 is small enough. Letting 0 and proving a pointwise gradient estimate, we show that the solution u converges to a nontrivial nonnegative solution of the original problem ( P).
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