Resumen de Energy and Morse index of solutions of Yamabe type problems on thin annuli
Mohameden Ould Ahmedou, M. Ben Ayed, Filomena Pacella, Khalil El Mehdi
In this paper we consider the following Yamabe type family of problem $(P_\e) : \quad -\D u_\e = u_\e ^{\frac{n+2}{n-2}}, \, \, u_\e > 0$ in $A_\e$, $u_\e =0$ on $\partial A_\e$, where $A_\e$ is an annulus-shaped domain of $\R^n$, $n\geq 3$, which becomes thinner when $\e\to 0$. We show that for every solution $u_{\e}$, the energy $\int_{A_{\e}} \, |\n u_{\e}|^2$, as well as the Morse index tends to infinity as $\e\to 0$. Such a result is proved through a fine blow-up analysis of some appropriate scalings of solutions whose limiting profiles are regular as well as singular solutions of some elliptic problem on $\R^n$, a half space or an infinite strip. Our argument involves also a Liouville-type theorem for regular solutions on the infinite strip.
