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On estimates for solutions of systems of convex inequalities inequalities described by convex functions is estimated. As consequences, estimates for the distance from a
Theorems of the Alternative for Systems of Convex InequalitiesSystems of convex inequalities in function spaces are considered. Solvability conditions
Dual approach for a class of implicit convex optimization problemsThe problem of finding a solution to a system of variational inequalities, which can be interpreted
FURTHER IMPROVEMENT OF AN EXTENSION OF HOLDER-TYPE INEQUALITYIn 1995 Pearce and Pecaric proved an extension of Holder's inequality. In this paper we extend
Lah–Ribarič type inequalities for (h, g; m)-convex functions for (h, g; m)-convex functions from which we obtain inequalities of Hermite–Hadamard, Fejér, Giaccardi
On (h, g; m)-Convexity and the Hermite-Hadamard Inequality or exponentially (s, m)-convex functions. Also, the Hermite-Hadamard inequality for an (h, g; m)convex function
More accurate classes of jensen–type inequalities for convex and operator convex functionsMotivated by a recent refinement of the scalar Jensen inequality obtained via linear interpolation
Inequalities of Ando's Type for n-convex Functions will obtain lower and upper bounds for the difference in Ando's inequality and in the Edmundson
Dual approach for a class of implicit convex optimization problemsThe problem of finding a solution to a system of variational inequalities, which can be interpreted
The lagrange multiplier technique for variational inequalitiesFor variational inequalities with the feasible set given by linear or nonlinear convex constraints
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