Abstract
This article investigates the Euler-Maruyama approximation procedure for stochastic differential equations in the framework of G-Browinian motion with non-linear growth and non-Lipschitz conditions. The results are derived by using the Burkholder-Davis-Gundy (in short BDG), Hölder's, Doobs martingale's and Gronwall's inequalities. Subject to non-linear growth condition, it is revealed that the Euler-Maruyama approximate solutions are bounded in
. In view of non-linear growth and non-uniform Lipschitz conditions, we give estimates for the difference between the exact solution
and approximate solutions
of SDEs in the framework of G-Brownian motion.