Title of article :
A class of differential inverse quasi-variational inequalities in finite dimensional spaces
Author/Authors :
Li ، Wei - Chengdu University of Technology , Xiao ، Yi-Bin - University of Electronic Science and Technology of China , Huang ، Nan-Jing - Sichuan University , Cho ، Yeol Je - Gyeongsang National University
Abstract :
In this paper, we introduce and study a class of differential inverse quasi-variational inequalities in finite dimensional Euclidean spaces, which are closely related to the differential variational inequalities. By using two important theorems on differential inclusions, we first prove some existence theorems for Caratheodory weak solutions of the differential inverse quasivariational inequality considered. Then, with the Euler computation method, we construct an Euler time-dependent scheme for solving the differential inverse quasi-variational inequality and prove a convergence result on the Euler time-dependent scheme constructed.
Keywords :
Differential inverse quasi , variational inequality , Caratheodory weak solution , Euler time , stepping scheme
Journal title :
Journal of Nonlinear Science and Applications
Journal title :
Journal of Nonlinear Science and Applications
