Stability analysis for parametric vector optimization problems
Order-Lipschitzian properties of multifunctions with applications to stability of efficient points
On weak sharp minima in vector optimization with applications to parametric problems
Interview with Professor Stefan Rolewicz and Danuta Przeworska-Rolewicz
Dedicatio
On lower Lipschitz continuity of minimal points
In this paper we investigate the lower Lipschitz continuity of minimal points of an arbitrary set A depending upon a parameter u . Our results are formulated with the help of the modulus of minimality. The crucial requirement which allows us to derive sufficient conditions for lower Lipschitz continuity of minimal points is that the modulus of minimality is at least linear. The obtained results can be directly applied to stability analysis of vector optimization problems.
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