E. R. Avakov scite author profile

We study the notion of α-covering map with respect to certain subsets in metric spaces. Generalizing results from [1] we use this notion to give some coincidence theorems for pairs of single-valued and multivalued maps one of which is relatively α-covering while the other satisfies the Lipschitz condition. These assertions extend some classical contraction map principles. We define the notion of α-covering multimap at a point and give conditions under which the covering property of a multimap at each interior point of a set implies that it is covering on the whole set. As applications we consider the solvability of a system of inclusions and the existence of a positive trajectory for a semilinear feedback control system. (2000). Primary 54H25; Secondary 47H04, 47H10, 47J05, 49J24, 54E40. Mathematics Subject Classification

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Extremum conditions for smooth problems with equality-type constraints

Avakov¹

1985

USSR Computational Mathematics and Mathematical Physics

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Directional Regularity and Metric Regularity

Arutyunov¹,

Avakov²,

Izmailov³

2007

SIAM J. Optim.

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Necessary conditions for an extremum in a mathematical programming problem

Avakov

Arutyunov

Izmailov

2007

Proc. Steklov Inst. Math.

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Theorems on estimates in the neighborhood of a singular point of a mapping

Avakov

1990

Mathematical Notes of the Academy of Sciences of the USSR

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E. R. Avakov

Locally covering maps in metric spaces and coincidence points

Extremum conditions for smooth problems with equality-type constraints

Directional Regularity and Metric Regularity

Necessary conditions for an extremum in a mathematical programming problem

Theorems on estimates in the neighborhood of a singular point of a mapping

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