A new generalization of the Yannelis–Prabhakar equilibrium existence theorem for abstract economies

In this paper, two new existence theorems of maximal elements for H-majorized correspondences are established in a kind of nonparacompact H-spaces. As applications, the existence problems of equilibrium for abstract economies are studied. Our theorems improve and generalize some recent results in th

Deriving the behavior of a network from its structure is of interest and has been studied. In this work, we find a new condition on the nodes of a network for obtaining some relation between the network structure and its ability to have a positive equilibrium. This condition replaces the concept of

In this paper, by using particular techniques, two existence theorems of solutions for generalized quasi-variational inequalities, a minimax theorem, and a section theorem in the spaces without linear structure are established; and finally, a new coincidence theorem in locally convex spaces is obtai

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