@misc{Bednarczuk_Ewa_M._Well_2003, author={Bednarczuk, Ewa M.}, copyright={Creative Commons Attribution BY 4.0 license}, address={Warszawa}, journal={Raport Badawczy = Research Report}, howpublished={online}, year={2003}, publisher={Instytut Badań Systemowych. Polska Akademia Nauk}, publisher={Systems Research Institute. Polish Academy of Sciences}, language={eng}, abstract={In the present paper the concept of strict and strong solutions to vector optimization problems is investigated. When applied to scalar optimization problems, these concepts both reduce to the concept of weak sharp minima due to Poliak and investigated by many authors. The calmness of solutions to parametric vector optimization problems at points which are strict and strong has been proved. In the class of well-posed problems, conditions ensuring Lipschitz and/or Hölder continuity of efficient solutions to parametric vector optimization problems were investigated. It has been proved that in the case where calmness of the solution set-valued mapping S at some solution x0 is of interest it is enough to assume that the solution set is simultaneously. Strict and strong around x0.}, title={Well posedness and lipschitzness of solutions in vector optimization}, type={Text}, URL={http://www.rcin.org.pl/Content/99881/PDF/RB-2003-77.pdf}, keywords={Vector optimization, Optymalizacja wektorowa, Lipschitz continuity, Ciągłość lipschitza}, }