19 research outputs found
Doubly nonlocal system with Hardy-Littlewood-Sobolev critical nonlinearity
This article concerns about the existence and multiplicity of weak solutions
for the following nonlinear doubly nonlocal problem with critical nonlinearity
in the sense of Hardy-Littlewood-Sobolev inequality \begin{equation*} \left\{
\begin{split} (-\Delta)^su &= \lambda |u|^{q-2}u +
\left(\int_{\Omega}\frac{|v(y)|^{2^*_\mu}}{|x-y|^\mu}~\mathrm{d}y\right)
|u|^{2^*_\mu-2}u\; \text{in}\; \Omega
(-\Delta)^sv &= \delta |v|^{q-2}v +
\left(\int_{\Om}\frac{|u(y)|^{2^*_\mu}}{|x-y|^\mu}~\mathrm{d}y \right)
|v|^{2^*_\mu-2}v \; \text{in}\; \Omega
u &=v=0\; \text{in}\; \mb R^n\setminus\Omega, \end{split} \right.
\end{equation*} where is a smooth bounded domain in \mb R^n, , , is the well known fractional Laplacian, , is the upper critical
exponent in the Hardy-Littlewood-Sobolev inequality, and
are real parameters. We study the fibering maps
corresponding to the functional associated with and show
that minimization over suitable subsets of Nehari manifold renders the
existence of atleast two non trivial solutions of (P_{\la,\delta}) for
suitable range of \la and .Comment: 37 page