Positive solutions to a fractional equation with singular nonlinearity

In this paper, we study the positive solutions to the following singular and non local elliptic problem posed in a bounded and smooth domain Ω⊂RN, N>2s:(Pλ){(−Δ)su=λ(K(x)u−δ+f(u)) in Ωu>0 in Ωu≡0 in RN\Ω. Here 00 and f:R+→R+ is a positive C2 function. K:Ω→R+ is a Hölder continuous function in...

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Bibliographic Details
Published in:Journal of Differential Equations 2018-08, Vol.265 (4), p.1191-1226
Main Authors: Adimurthi, Giacomoni, Jacques, Santra, Sanjiban
Format: Article
Language:English
Subjects:
Mathematics
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Summary:In this paper, we study the positive solutions to the following singular and non local elliptic problem posed in a bounded and smooth domain Ω⊂RN, N>2s:(Pλ){(−Δ)su=λ(K(x)u−δ+f(u)) in Ωu>0 in Ωu≡0 in RN\Ω. Here 00 and f:R+→R+ is a positive C2 function. K:Ω→R+ is a Hölder continuous function in Ω which behave as dist(x,∂Ω)−β near the boundary with 0≤β0 and for λ> small enough, we prove the existence of solutions to (Pλ). Next, for a suitable range of values of δ, we show the existence of an unbounded connected branch of solutions to (Pλ) emanating from the trivial solution at λ=0. For a certain class of nonlinearities f, we derive a global multiplicity result that extends results proved in [2]. To establish the results, we prove new properties which are of independent interest and deal with the behavior and Hölder regularity of solutions to (Pλ).
ISSN:0022-0396
1090-2732
DOI:10.1016/j.jde.2018.03.023