Sorin-Mihai Grad, Oleg Wilfer, Gert Wanka: Duality and epsilon-optimality conditions for multi-composed optimization problems with applications to fractional and entropy optimization
- Author(s):
-
Sorin-Mihai Grad
Oleg Wilfer
Gert Wanka
- Title:
-
Sorin-Mihai Grad, Oleg Wilfer, Gert Wanka: Duality and epsilon-optimality conditions for multi-composed optimization problems with applications to fractional and entropy optimization
- Electronic source:
-
application/pdf
- Preprint series:
- Technische Universität Chemnitz, Fakultät für Mathematik (Germany). Preprint 04, 2016
- Mathematics Subject Classification:
-
49N15
[]
90C25 []
90C46 []
- Abstract:
- We introduce a closedness type regularity condition that characterizes the stable strong duality for convex constrained optimization problems with multi-composed objective functions and guarantees a formula for the epsilon-subdifferential of a multi-composed function, that is employed for delivering necessary and sufficient epsilon-optimality conditions that characterize $\varepsilon$-optimality solutions to multi-composed optimization problems. As a byproduct, a formula of the conjugate function of a multi-composed function is provided under a regularity condition weaker than known in the literature. We also present two possible applications of our investigations in fractional programming and entropy optimization, respectively.
- Keywords:
-
convex functions,
composed functions,
regularity conditions,
conjugate functions,
fractional programming,
entropy optimization
- Language:
- English
- Publication time:
- 7/2016
