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A class of combined relaxation methods for decomposable variational inequalitiesCombined relaxation methods are convergent to a solution of variational inequality problems under
A scalarization approach for vector variational inequalities with applications an equivalence result between weak and strong solutions of set-valued vector variational inequalities and suggest
A new method of solving plane-strain boundary value problems for the double slip and rotation model. The Mohr–Coulomb yield criterion is adopted. An analogy between the solutions for this model and classical
Iterative solution methods for variational inequalities with nonlinear main operator and constraints to gradient of solution to the finite element approximation of a variational inequality with nonlinear main operator and constraints
Combined relaxation methods for generalized monotone variational inequalitiesThe paper is devoted to the combined relaxation approach to constructing solution methods
The proximal point method for nonmonotone variational inequalities is based on the assumption that the dual variational inequality is solvable. Then the solutions set may
Adiabatic modes of a smoothly irregular waveguide: zero approximation of vector theory nontrivial solution provided its determinant is zero. The authors consider an example of the construction
States with minimum dispersion of measured observables are solutions of the nonlinear equation. Their approximate numerical solutions are searched by conditional
On the solvability of an evolution variational inequality with a nonlocal space operatorBy using semidiscretization and penalty methods, we prove the existence of a generalized solution
Approximation of Variational Eigenvalue ProblemsA variational eigenvalue problem in an infinite-dimensional Hilbert space is approximated by a
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