Strongly quasivariational inequalities for fuzzy mappings

In this paper, we prove an existence theorem of solutions and develop the algorithms of approximating solutions for a generalized strongly variational inequality for fuzzy mappings and a generalized strongly complementarity problem for fuzzy mappings by using the projection method.

In this paper, we prove an existence theorem of solutions and develop the algorithms of approximating solutions for a completely generalized strongly variational inequality problem for fuzzy mappings and a completely generalized strongly complementarity problem for fuzzy mappings by using the projec

In this paper, we construct a new iterative algorithm, which includes many known algorithms as special cases to solve variational inequalities and quasivariational inequalities for fuzzy mappings. Further, we prove the convergence of the iterative sequences generated by this algorithm. Our results a

This paper is devoted to study the vector variational inequalities for fuzzy mappings. By using the Fan-Browder fixed point theorem, the selection theorem of Yannelis-Prabhakar 1-13] and the scalarization method of Luc [9, 10], some existence theorems for our inequalities are proved.

In this paper, we consider the vector quasivariational inequalities for fuzzy mappings and obtain some existence theorems for the inequalities. Moreover, we obtain the fuzzy extensions of the well-known Walras theorem, which is an important one in the mathematical economics.