We introduce a new numerical solution method for semi-infinite optimization problems with convex lower level problems. The method is based on a reformulation of the semi-infinite problem as a Stackelberg game and the use of regularized nonlinear complementarity problem functions. This approach leads to central path conditions for the lower level problems, where for a given path parameter a smooth nonlinear finite optimization problem has to be solved. The solution of the semi-infinite optimization problem then amounts to driving the path parameter to zero.\ud \ud We show convergence properties of the method and give a number of numerical examples from design centering and from robust optimization, where actually so-called generalized semi-i...
Generalized semi-infinite optimization problems (GSIP) are considered. It is investigated how the nu...
This paper reviews the state-of-the-art in the theory of deterministic and uncertain linear semi-inf...
A smooth convex penalty function method for solving a semi-infinite convex programming problem is pr...
We introduce a new numerical solution method for semi-infinite optimization problems with convex low...
In this paper, we analyze the outer approximation property of the algorithm for generalized semi-inf...
International audienceWe focus on convex semi-infinite programs with an infinite number of quadratic...
We focus on convex semi-infinite programs with an infinite number of quadratically parametrized cons...
We present a new reduction-type method for solving semi-infinite programming problems, where the mul...
We study convergence of a semismooth Newton method for generalized semi-infinite programming problem...
AbstractThe paper starts with a simple model and convergence theorem for outer approximation methods...
This note deals with a semi-infinite optimization problem which is defined by infinitely many inequa...
During the last fifteen years we have witnessed an explosive development in the area of optimization...
Semi-infinite programming (SIP) problems can be efficiently solved by reduction type methods. Here, ...
Semi-infinite programming problems can be efficiently solved by reduction type methods. Here, we pre...
This paper reviews the state-of-the-art in the theory of deterministic and uncertain linear semi-inf...
Generalized semi-infinite optimization problems (GSIP) are considered. It is investigated how the nu...
This paper reviews the state-of-the-art in the theory of deterministic and uncertain linear semi-inf...
A smooth convex penalty function method for solving a semi-infinite convex programming problem is pr...
We introduce a new numerical solution method for semi-infinite optimization problems with convex low...
In this paper, we analyze the outer approximation property of the algorithm for generalized semi-inf...
International audienceWe focus on convex semi-infinite programs with an infinite number of quadratic...
We focus on convex semi-infinite programs with an infinite number of quadratically parametrized cons...
We present a new reduction-type method for solving semi-infinite programming problems, where the mul...
We study convergence of a semismooth Newton method for generalized semi-infinite programming problem...
AbstractThe paper starts with a simple model and convergence theorem for outer approximation methods...
This note deals with a semi-infinite optimization problem which is defined by infinitely many inequa...
During the last fifteen years we have witnessed an explosive development in the area of optimization...
Semi-infinite programming (SIP) problems can be efficiently solved by reduction type methods. Here, ...
Semi-infinite programming problems can be efficiently solved by reduction type methods. Here, we pre...
This paper reviews the state-of-the-art in the theory of deterministic and uncertain linear semi-inf...
Generalized semi-infinite optimization problems (GSIP) are considered. It is investigated how the nu...
This paper reviews the state-of-the-art in the theory of deterministic and uncertain linear semi-inf...
A smooth convex penalty function method for solving a semi-infinite convex programming problem is pr...