Abstract
In this paper, we consider a class of randomly h-eta-maximal monotone mappings and a class of generalized nonlinear mixed random variational-like inclusions for random fuzzy mappings and define an iterative algorithm for finding approximate solutions for the elms of variational inclusions. By using the random resolvent operator of randomly h-eta-maximal monotone mappings, we establish the approximate solutions obtained by our algorithm converge to the exact solutions of the generalized nonlinear mixed random variational-like inclusions for random fuzzy mappings.