Abstract
The attainability problem with “asymptotic constraints” is considered. Concrete variants of this problem arise in control theory. Namely, we can consider the problem about construction and investigation of attainability domain under perturbation of traditional constraints (boundary and immediate conditions; phase constraints). The natural asymptotic analog of the usual attainability domain is attraction set, for representation of which, the Warga generalized controls can be applied. More exactly, for this, attainability domain in the class of generalized controls is constructed. This approach is similar to methods for optimal control theory (we keep in mind approximate and generalized controls of J. Warga). But, in the case of attainability problem, essential difficulties arise. Namely, here it should be constructed whole set of limits corresponding to different variants of all more precise realization of usual solutions in the sense of constraints validity. Moreover, typically, the above-mentioned control problems are infinite-dimensional. Real possibility for investigation of the arising limit sets is connected with extension of control space. For control problems with geometric constraints on the choice of programmed controls, procedure of this extensions was realized (for extremal problems) by J. Warga. More complicated situation arises in theory of impulse control. It is useful to note that, for investigation of the problem about constraints validity, it is natural to apply asymptotic approach realized in part of perturbation of standard constraints. And what is more, we can essentially generalize self notion of constraints: namely, we can consider arbitrary systems of conditions defined in terms of nonempty families of sets in the space of usual controls. Thus, constraints of asymptotic character arise.
Highlights
We fix a nonempty set E elements of which play the role of usual solutions
If a subset E0 of E is given, image = h1 ( E0 ) {h (e) : e ∈ E0} of E0 can be considered as attainable set or analog of attainability domain in control theory
( ) h1 ( E0 ) = cl h1 ( E0 ), t of h1 ( E0 ) is a natural generalization: we assume realization of points of H “in a limit” under precise validity of constraints connected with the set E0
Summary
We consider general attainability problem in a topological space (TS). For this, we fix a nonempty set E elements of which play the role of usual solutions (sometimes, it is logical to consider elements of E as controls). III,IV of monograph [2]) This approach assumes the natural spreading on attainability problems. The given intersection is interpreted as attraction set (AS) This construction can be considered as natural analog of the Warga approach for extremal problems We discuss the choice of nets ( xα ) in the set E We consider such nets as asymptotic regimes. For a net ( xα ) in E, under every Σ ∈ , the condition xα ∈ Σ is fulfilled starting from a certain index, we consider ( xα ) as admissible asymptotic regime. AS defined by the convergence of nets (that is, by asymptotic regimes) coincides with intersection of all sets h1 (Σ), Σ ∈ f. We note that filters can be used instead of nets (see [4])
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