Principal eigenvalue and positive solutions for Fractional $P-Q$ Laplace operator in quantum field theory

TL;DR

This paper investigates the existence of positive eigenfunctions for a fractional p-q Laplacian operator with indefinite weights, using variational methods and concentration-compactness principles in bounded and unbounded domains.

Contribution

It establishes conditions for positive solutions and eigenvalues of a fractional p-q Laplacian problem, extending spectral theory in quantum field contexts with new variational techniques.

Findings

Existence of a continuous eigenvalue family in ^N when b=0.

Conditions for positive solutions with indefinite weights.

Application of concentration-compactness to overcome lack of compactness.

Abstract

This article deals with the existence and non-existence of positive solutions for the eigenvalue problem driven by nonhomogeneous fractional $p\& q$ Laplacian operator with indefinite weights $$\left(-\Delta_p\right)^{\alpha}u + \left(-\Delta_q\right)^{\beta}u \,= \lambda\left[a(x) \left|u\right|^{p-2}u + b(x) \left|u\right|^{q-2}u \right]\quad\quad\textrm{in $\O$},$$ where $\O$ is a smooth bounded domain in $\R^N$ extended by zero outside. When $\O=\R^N$ and $b\equiv0$, we further show that there exists a continuous family of the eigenvalue if $1<q<p<q^*_\beta=\frac{Nq}{N-q\beta}$ and $0\leq a\in L^{\left(\frac{q_{\beta}^*}{s}\right)'}\left(\R^N\right)\bigcap L^{\infty}\left(\R^N\right)$ with $s$ satisfies $\dfrac{p-t}{p_{\alpha}^*}+ \dfrac{p\left(1-t\right)}{s} =1$, for some $t\in \left(0, \sqrt{\dfrac{p-q}{p}}\right).$ Our approach replies strongly on variational analysis, in which the Mountain pass theorem plays the key role. The main difficulty in this study is that how to establish the Palais-Smale conditions. In particular, in $\R^N$, due to the lack of spatial compactness and the embedding $W^{\alpha, p}\left(\R^N\right) \hookrightarrow W^{\beta, q}\left(\R^N\right)$, we must employ the concentration-compactness principle of P.L. Lions \cite{PLL} to overcome the difficulty.