Three nontrivial solutions of boundary value problems for semilinear $\Delta_{\gamma}-$Laplace equation

In this paper, we study the existence of multiple solutions for boundary value problem\begin{equation}\Delta_{\gamma} u+f(x,u)=0 \quad \mbox{ in } \Omega, u=0 on \partial \notag\end{equation}where $\Omega$ is a bounded domain with smooth $\mathbb{R}^N \ (N \ge 2)$ and $\Delta_{\gamma}$ subelliptic operator type $$\Delta_\gamma: =\sum\limits_{j=1}^{N}\partial_{x_j} \left(\gamma_j^2 \partial_{x_j} \right), \partial_{x_j}=\frac{\partial }{\partial x_{j}}, \gamma = (\gamma_1, \gamma_2, ..., \gamma_N), $$the nonlinearity $f(x , \xi)$ subcritical growth may be not satisfy Ambrosetti-Rabinowitz (AR) condition. We establish three nontrivial by using Morse theory.