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On strong quasistability of a vector problem on substitutions
Authors: V.A.Emelichev, V.G.Pakhilka
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Abstract
A type of the stability of the Pareto, Smale, and Slater sets for a problem of minimizing linear forms over an arbitrary set of substitutions of the symmetric group is investigated. This type of stability assumes that at least one substitution preserves corresponding efficiency for "small" independent perturbations of coefficients of the linear forms. Quantitative bounds of such a type of stability are found.V.A.Emelichev, V.G.Pakhilka,
Belorussian State University
Ave. F.Skoriny, 4,
Minsk 220050 Belarus
e-mail:
Belorussian State University
Ave. F.Skoriny, 4,
Minsk 220050 Belarus
e-mail:
Fulltext
– 0.16 Mb
Contents
- Two railway circuits: a universal circuit and an NP-difficult one
- Small Universal Circular Post Machines
- The system of molecular-genetic triggers as self-organizing computing system
- On strong quasistability of a vector problem on substitutions
- A generalization of the optimality for multicriterion problems
