Publication Date:
2005
abstract:
In this paper, we study several existing notions of well-posedness
for vector optimization problems. We separate them into two
classes and we establish the hierarchical structure of their relationships.
Moreover, we relate vector well-posedness and well-posedness of an appropriate scalarization. This approach allows us to show that, under some compactness assumption, quasiconvex problems are well posed.
for vector optimization problems. We separate them into two
classes and we establish the hierarchical structure of their relationships.
Moreover, we relate vector well-posedness and well-posedness of an appropriate scalarization. This approach allows us to show that, under some compactness assumption, quasiconvex problems are well posed.
Iris type:
1.1 Articolo in rivista
Keywords:
vector optimization; well posedness; scalarization
List of contributors:
Molho, Elena; Miglierina, Enrico; Rocca, Matteo
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