Mathematics – Optimization and Control
Scientific paper
2009-07-31
Mathematics
Optimization and Control
This submission corrects errors from the previous version after referees' comments. Changes are in Proposition 2.4, Propositio
Scientific paper
We propose a new concept of generalized differentiation of set-valued maps that captures the first order information. This concept encompasses the standard notions of Frechet differentiability, strict differentiability, calmness and Lipschitz continuity in single-valued maps, and the Aubin property and Lipschitz continuity in set-valued maps. We present calculus rules, sharpen the relationship between the Aubin property and coderivatives, and study how metric regularity and open covering can be refined to have a directional property similar to our concept of generalized differentiation. Finally, we discuss the relationship between the robust form of generalization differentiation and its one sided counterpart.
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