AbstractLet H be a real Hilbert space, A : H → H a self-adjoint continuous linear operator. Given a variational inequality related to A, we construct a Lipschitz continuously differentiable function F:H→R so that the critical points of F are the solutions of the variational inequality
Abstract. In this paper we study the existence of nontrivial solutions for a variational inequality ...
Abstract We know that variational inequality problem is very important in the nonlinear analysis. Th...
AbstractThis research provides sufficient conditions for Lipschitz continuity and directional differ...
AbstractLet H be a real Hilbert space, A : H → H a self-adjoint continuous linear operator. Given a ...
Let T: K → H be a mapping from a nonempty closed convex subset K of a finite-dimensional Hilbert spa...
Let be a nonlinear mapping from a nonempty closed invex subset of an infinite-dimensional Hilbert...
Abstract. In this paper, we introduce a new iterative scheme to investigate the problem of finding a...
AbstractFor a family of functionals in a Banach space, which are possibly non-smooth and depend also...
Let E be a real Hilbert space, λ∈R, F∈C~2(E×R, R). Suppose that the gradientD_xF(x,λ) of F is A(λ)x+...
International audienceIn this paper we show that a linear variational inequality over an infinite di...
AbstractIt is well known that the absolute value map on the self-adjoint operators on an infinite di...
Let T: K → H be a nonlinear mapping from a nonempty closed invex subset K of an infinite-dimensional...
AbstractIn this paper, we consider some applications of variational inequalities to nonlinear analys...
Abstract. We prove that if f is a real valued lower semicontinuous function on a Banach space X and ...
AbstractThis paper contains some general existence theorems for critical points of a continuously di...
Abstract. In this paper we study the existence of nontrivial solutions for a variational inequality ...
Abstract We know that variational inequality problem is very important in the nonlinear analysis. Th...
AbstractThis research provides sufficient conditions for Lipschitz continuity and directional differ...
AbstractLet H be a real Hilbert space, A : H → H a self-adjoint continuous linear operator. Given a ...
Let T: K → H be a mapping from a nonempty closed convex subset K of a finite-dimensional Hilbert spa...
Let be a nonlinear mapping from a nonempty closed invex subset of an infinite-dimensional Hilbert...
Abstract. In this paper, we introduce a new iterative scheme to investigate the problem of finding a...
AbstractFor a family of functionals in a Banach space, which are possibly non-smooth and depend also...
Let E be a real Hilbert space, λ∈R, F∈C~2(E×R, R). Suppose that the gradientD_xF(x,λ) of F is A(λ)x+...
International audienceIn this paper we show that a linear variational inequality over an infinite di...
AbstractIt is well known that the absolute value map on the self-adjoint operators on an infinite di...
Let T: K → H be a nonlinear mapping from a nonempty closed invex subset K of an infinite-dimensional...
AbstractIn this paper, we consider some applications of variational inequalities to nonlinear analys...
Abstract. We prove that if f is a real valued lower semicontinuous function on a Banach space X and ...
AbstractThis paper contains some general existence theorems for critical points of a continuously di...
Abstract. In this paper we study the existence of nontrivial solutions for a variational inequality ...
Abstract We know that variational inequality problem is very important in the nonlinear analysis. Th...
AbstractThis research provides sufficient conditions for Lipschitz continuity and directional differ...
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