In multi objective optimization problems several objective functions have to be minimized simultaneously. In this work, we present a new computational method for the numerical solution of the linearly constrained, convex multi objective optimization problem. We propose some technique to find joint decreasing direction for unconstrained and linearly constrained case as well. Based on these results we introduce a method using subdivision technique to approximate the whole Pareto-optimal set of the linearly constrained, convex multi objective optimization problem. Finally, we illustrate computations of our algorithm by solving the Markowitz-model on real data
This thesis contains several contributions to the theory of optimality conditions in single- and mul...
We propose a new approach to convex nonlinear multiobjective optimization that captures the geometry...
This paper studies the constrained multiobjective optimization problem of finding Pareto critical po...
In multi objective optimization problems several objective functions have to be minimized simultaneo...
Abstract: The Pareto set of a multiobjective optimization problem consists of the solutions for whic...
Multiobjective mixed integer convex optimization refers to mathematical programming problems where m...
In this paper a notion of descent direction for a vector function defined on a box is introduced. Th...
We consider problems with multiple linear objectives and linear constraints and use adjustable robus...
We study optimization problems with multiple objectives. Such problems are pervasive across many div...
In this paper, a reduced interior-point (RIP) algorithm is introduced to generate a Pareto optimal f...
Abstract. In multidisciplinary optimization a designer solves a problem where there are different cr...
Real-world applications of multi-objective optimization often involve numerous objective functions. ...
In this paper we consider a problem, called convex projection, of projecting a convex set onto a su...
Multiple objective optimization involves the simultaneous optimization of more than one, possibly co...
AbstractA method is presented for generating a well-distributed Pareto set in nonlinear multiobjecti...
This thesis contains several contributions to the theory of optimality conditions in single- and mul...
We propose a new approach to convex nonlinear multiobjective optimization that captures the geometry...
This paper studies the constrained multiobjective optimization problem of finding Pareto critical po...
In multi objective optimization problems several objective functions have to be minimized simultaneo...
Abstract: The Pareto set of a multiobjective optimization problem consists of the solutions for whic...
Multiobjective mixed integer convex optimization refers to mathematical programming problems where m...
In this paper a notion of descent direction for a vector function defined on a box is introduced. Th...
We consider problems with multiple linear objectives and linear constraints and use adjustable robus...
We study optimization problems with multiple objectives. Such problems are pervasive across many div...
In this paper, a reduced interior-point (RIP) algorithm is introduced to generate a Pareto optimal f...
Abstract. In multidisciplinary optimization a designer solves a problem where there are different cr...
Real-world applications of multi-objective optimization often involve numerous objective functions. ...
In this paper we consider a problem, called convex projection, of projecting a convex set onto a su...
Multiple objective optimization involves the simultaneous optimization of more than one, possibly co...
AbstractA method is presented for generating a well-distributed Pareto set in nonlinear multiobjecti...
This thesis contains several contributions to the theory of optimality conditions in single- and mul...
We propose a new approach to convex nonlinear multiobjective optimization that captures the geometry...
This paper studies the constrained multiobjective optimization problem of finding Pareto critical po...