Gert Wanka scite author profile

The series in Vector Optimization contains publications in various fields of optimization with vector-valued objective functions, such as multiobjective optimization, multi criteria decision making, set optimization, vector-valued game theory and border areas to financial mathematics, biosystems, semidefinite programming and multiobjective control theory. Studies of continuous, discrete, combinatorial and stochastic multiobjective models in interesting fields of operations research are also included. The series covers mathematical theory, methods and applications in economics and engineering. These publications being written in English are primarily monographs and multiple author works containing current advances in these fields.

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A weaker regularity condition for subdifferential calculus and Fenchel duality in infinite dimensional spaces

Boţ

Wanka

2006

Nonlinear Analysis: Theory, Methods & Applications

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On strong and total Lagrange duality for convex optimization problems

Boţ

Grad

Wanka

2008

Journal of Mathematical Analysis and Applications

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We give some necessary and sufficient conditions which completely characterize the strong and total Lagrange duality, respectively, for convex optimization problems in separated locally convex spaces. We also prove similar statements for the problems obtained by perturbing the objective functions of the primal problems by arbitrary linear functionals. In the particular case when we deal with convex optimization problems having infinitely many convex inequalities as constraints the conditions we work with turn into the so-called Farkas-Minkowski and locally Farkas-Minkowski conditions for systems of convex inequalities, recently used in the literature. Moreover, we show that our new results extend some existing ones in the literature.

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On the Relations Between Different Dual Problems in Convex Mathematical Programming

Wanka

Boţ

2002

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Regularity Conditions via Quasi-Relative Interior in Convex Programming

Boţ

Csetnek

Wanka³

2008

SIAM J. Optim.

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We give some new regularity conditions for Fenchel duality in separated locally convex vector spaces, written in terms of the notion of quasi interior and quasi-relative interior, respectively. We provide also an example of a convex optimization problem for which the classical generalized interior-point conditions given so far in the literature cannot be applied, while the one given by us is applicable. By using a technique developed by Magnanti, we derive some duality results for the optimization problem with cone constraints and its Lagrange dual problem, and we show that a duality result recently given in the literature for this pair of problems has self-contradictory assumptions.

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Gert Wanka

Duality in Vector Optimization

A weaker regularity condition for subdifferential calculus and Fenchel duality in infinite dimensional spaces

On strong and total Lagrange duality for convex optimization problems

On the Relations Between Different Dual Problems in Convex Mathematical Programming

Regularity Conditions via Quasi-Relative Interior in Convex Programming

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