Multiplicity and concentration of nontrivial solutions for the generalized extensible beam equations (1812.03043v1)

Abstract: In this paper, we study a class of generalized extensible beam equations with a superlinear nonlinearity \begin{equation*} \left{ \begin{array}{ll} \Delta ^{2}u-M\left( \Vert \nabla u\Vert {L^{2}}^{2}\right) \Delta u+\lambda V(x) u=f( x,u) & \text{ in }\mathbb{R}^{N}, \ u\in H^{2}(\mathbb{R}^{N}), & \end{array}% \right. \end{equation*}% where $N\geq 3$, $M(t) =at^{\delta }+b$ with $a,\delta >0$ and $b\in \mathbb{% R}$, $\lambda >0$ is a parameter, $V\in C(\mathbb{R}^{N},\mathbb{R})$ and $% f\in C(\mathbb{R}^{N}\times \mathbb{R},\mathbb{R}).$ Unlike most other papers on this problem, we allow the constant $b$ to be nonpositive, which has the physical significance. Under some suitable assumptions on $V(x)$ and $f(x,u)$, when $a$ is small and $\lambda$ is large enough, we prove the existence of two nontrivial solutions $u{a,\lambda }^{(1)}$ and $% u_{a,\lambda }^{(2)}$, one of which will blow up as the nonlocal term vanishes. Moreover, $u_{a,\lambda }^{(1)}\rightarrow u_{\infty}^{(1)}$ and $% u_{a,\lambda }^{(2)}\rightarrow u_{\infty}^{(2)}$ strongly in $H^{2}(\mathbb{% R}^{N})$ as $\lambda\rightarrow\infty$, where $u_{\infty}^{(1)}\neq u_{\infty}^{(2)}\in H_{0}^{2}(\Omega )$ are two nontrivial solutions of Dirichlet BVPs on the bounded domain $\Omega$. It is worth noting that the regularity of weak solutions $u_{\infty}^{(i)}(i=1,2)$ here is explored. Finally, the nonexistence of nontrivial solutions is also obtained for $a$ large enough.