Generalized invariant variational problems

This paper introduces three new operators and presents some of their properties. It defines a new class of variational problems (called Generalized Variational Problems, or GVPs) in terms of these operators and derives Euler-Lagrange equations for this class of problems. It is demonstrated that the

In this paper, by applying new coincidence theorems due to the author, some existence theorems of solutions of abstract generalized variational inequalities and generalized equilibrium problems are proved in generalized convex spaces. These theorems improve and generalize a number of known results i

In this work, we establish some existence theorems for solutions to a new class of generalized vector F-implicit complementarity problems and the corresponding generalized vector F-implicit variational inequality problems in topological vector spaces. No monotonicity or continuity assumption is impo