2,447 research outputs found
Generalized vector variational inequalities over countable product of sets
In this paper, we consider vector variational inequalities with set-valued mappings over countable product sets in a real Banach space setting. By employing concepts of relative pseudomonotonicity, we establish several existence results for generalized vector variational inequalities and for systems of generalized vector variational inequalities. These results strengthen previous existence results which were based on the usual monotonicity type assumptions. © 2004 Kluwer Academic Publishers. Printed in the Netherlands
Fuzzy games with a countable space of actions and applications to systems of generalized quasi-variational inequalities
In this paper, we introduce an abstract fuzzy economy (generalized fuzzy
game) model with a countable space of actions and we study the existence of the
fuzzy equilibrium. As applications, two types of results are obtained. The
first ones concern the existence of the solutions for systems of generalized
quasi-variational inequalities with random fuzzy mappings which we define. The
last ones are new random fixed point theorems for correspondences with values
in complete countable metric spaces.Comment: 18 page
Lattice-like operations and isotone projection sets
By using some lattice-like operations which constitute extensions of ones
introduced by M. S. Gowda, R. Sznajder and J. Tao for self-dual cones, a new
perspective is gained on the subject of isotonicity of the metric projection
onto the closed convex sets. The results of this paper are wide range
generalizations of some results of the authors obtained for self-dual cones.
The aim of the subsequent investigations is to put into evidence some closed
convex sets for which the metric projection is isotonic with respect the order
relation which give rise to the above mentioned lattice-like operations. The
topic is related to variational inequalities where the isotonicity of the
metric projection is an important technical tool. For Euclidean sublattices
this approach was considered by G. Isac and respectively by H. Nishimura and E.
A. Ok.Comment: Proofs of Theorem 1 and Corollary 4 have been corrected. arXiv admin
note: substantial text overlap with arXiv:1210.232
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