In this article, we introduce a new stochastic process called the sub-fractional G-Brownian motion, which serves as an intermediate between the G-Brownian motion and the fractional G-Brownian motion. Although the sub-fractional GG-Brownian motion shares some properties with the fractional GG-Brownian motion, it features nonstationary increments. We then examine key characteristics of the process, such as self-similarity, H\"{o}lder continuity, and long-range dependence. Additionally, we propose a method for simulating sample paths of sub-fractional G-Brownian motion and conclude by simulating linear stochastic differential equations driven by sub-fractional G-Brownian motion.