 The Gompertz virus disease has been a major concern in agriculture production due to its rapid spreading nature. Mathematical models have been developed to study the dynamics of such diseases, with the most common being the Gompertz maker model. In this paper, a new mathematical model was proposed and analyzed for the dynamics of Gompertz virus disease. It was shown that the model exhibits permanent and global exponential stability, as well as a sufficient condition for the existence of at least one positive solution satisfying certain conditions. Numerical simulations were used to verify the theoretical results. This article was authored by Lin Junwang, Aitinshi, and Yuxiang Xie.