Set-Valued Mappings and Differential Inclusions

This chapter includes the necessary background on further developments in the theory of hybrid systems. It first presents the notion of convergence for a sequence of sets and how it generalizes the notion of convergence of a sequence of points. The chapter then deals with set-valued mappings and their continuity properties. Given a set-valued mapping M : ℝᵐ ⇉ ℝⁿ, the chapter defines the range of M as the set rgeM = {‎y ∈ ℝⁿ : Ǝx ∈ ℝᵐ such that y ∈ M(x)}‎; and the graph of M as the set gphM = {‎(x,y) ∈ ℝᵐ × ℝⁿ : y ∈ M(x)}‎. The chapter also specializes some of the concepts, such as graphical convergence, to hybrid arcs and provides further details in such a setting. Finally, the chapter discusses differential inclusions.

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Single-Valued Representation of Set-Valued Mappings II; Application to Differential Inclusions

SIAM Journal on Control and Optimization ◽

10.1137/0321038 ◽

1983 ◽

Vol 21 (4) ◽

pp. 641-651 ◽

Cited By ~ 7

Author(s):

A. D. Ioffe

Keyword(s):

Differential Inclusions ◽

Set Valued Mappings

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A fixed point theorem for generalized contractive type set-valued mappings with application to nonlinear fractional differential inclusions

Filomat ◽

10.2298/fil1815361s ◽

2018 ◽

Vol 32 (15) ◽

pp. 5361-5370

Author(s):

Zeinab Soltani

Keyword(s):

Fixed Point ◽

Fixed Point Theorem ◽

Differential Inclusion ◽

Point Theorem ◽

Differential Inclusions ◽

Existence Of Solution ◽

Fractional Differential Inclusions ◽

Contractive Type ◽

Fractional Differential ◽

Set Valued Mappings

In this paper, we present some fixed point results for set-valued mappings of contractive type by using the concept of ?-distance. As an application, we prove the existence of solution of nonlinear fractional differential inclusion.

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Optimal control of higher order differential inclusions with functional constraints

ESAIM Control Optimisation and Calculus of Variations ◽

10.1051/cocv/2019018 ◽

2020 ◽

Vol 26 ◽

pp. 37 ◽

Cited By ~ 3

Author(s):

Elimhan N. Mahmudov

Keyword(s):

Optimal Control ◽

Optimality Conditions ◽

Differential Inclusion ◽

Differential Inclusions ◽

Higher Order ◽

Second Order ◽

Sufficient Optimality Conditions ◽

Functional Constraints ◽

Complementary Slackness ◽

Complementary Slackness Conditions

The present paper studies the Mayer problem with higher order evolution differential inclusions and functional constraints of optimal control theory (PFC); to this end first we use an interesting auxiliary problem with second order discrete-time and discrete approximate inclusions (PFD). Are proved necessary and sufficient conditions incorporating the Euler–Lagrange inclusion, the Hamiltonian inclusion, the transversality and complementary slackness conditions. The basic concept of obtaining optimal conditions is locally adjoint mappings and equivalence results. Then combining these results and passing to the limit in the discrete approximations we establish new sufficient optimality conditions for second order continuous-time evolution inclusions. This approach and results make a bridge between optimal control problem with higher order differential inclusion (PFC) and constrained mathematical programming problems in finite-dimensional spaces. Formulation of the transversality and complementary slackness conditions for second order differential inclusions play a substantial role in the next investigations without which it is hardly ever possible to get any optimality conditions; consequently, these results are generalized to the problem with an arbitrary higher order differential inclusion. Furthermore, application of these results is demonstrated by solving some semilinear problem with second and third order differential inclusions.

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Conditions of Weak Practical Stability of Differential Inclusions with Impulse Impact

Journal of Automation and Information Sciences ◽

10.1615/jautomatinfscien.v43.i11.60 ◽

2011 ◽

Vol 43 (11) ◽

pp. 57-65

Author(s):

Ya.N. Linder ◽

Vladimir V. Pichkur

Keyword(s):

Differential Inclusions ◽

Practical Stability

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Retrospective-Prospective Differential Inclusions and Their Control by the Differential Connection Tensors of Their Evolutions: The Trendometer

Complex Systems ◽

10.25088/complexsystems.23.2.117 ◽

2014 ◽

Vol 23 (2) ◽

pp. 117-158 ◽

Cited By ~ 1

Author(s):

Jean-Pierre Aubin ◽

Luxi Chen ◽

Olivier Dordan ◽

◽

Keyword(s):

Differential Inclusions

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R-Regularity of Set-Valued Mappings Under the Relaxed Constant Positive Linear Dependence Constraint Qualification with Applications to Parametric and Bilevel Optimization

Set-Valued and Variational Analysis ◽

10.1007/s11228-021-00578-0 ◽

2021 ◽

Author(s):

Patrick Mehlitz ◽

Leonid I. Minchenko

Keyword(s):

Linear Dependence ◽

Constraint Qualification ◽

Parametric Optimization ◽

Optimization Problems ◽

Sufficient Conditions ◽

Bilevel Optimization ◽

Regularity Property ◽

Constant Rank Constraint Qualification ◽

Existence Criterion ◽

Set Valued Mappings

AbstractThe presence of Lipschitzian properties for solution mappings associated with nonlinear parametric optimization problems is desirable in the context of, e.g., stability analysis or bilevel optimization. An example of such a Lipschitzian property for set-valued mappings, whose graph is the solution set of a system of nonlinear inequalities and equations, is R-regularity. Based on the so-called relaxed constant positive linear dependence constraint qualification, we provide a criterion ensuring the presence of the R-regularity property. In this regard, our analysis generalizes earlier results of that type which exploited the stronger Mangasarian–Fromovitz or constant rank constraint qualification. Afterwards, we apply our findings in order to derive new sufficient conditions which guarantee the presence of R-regularity for solution mappings in parametric optimization. Finally, our results are used to derive an existence criterion for solutions in pessimistic bilevel optimization and a sufficient condition for the presence of the so-called partial calmness property in optimistic bilevel optimization.

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On a Class of Differential Variational Inequalities in Infinite-Dimensional Spaces

Mathematics ◽

10.3390/math9030266 ◽

2021 ◽

Vol 9 (3) ◽

pp. 266 ◽

Cited By ~ 1

Author(s):

Savin Treanţă

Keyword(s):

Optimal Control ◽

Variational Inequality ◽

Variational Inequalities ◽

Optimal Control Theory ◽

Infinite Dimensional ◽

Nash Games ◽

New Class ◽

Set Valued Mappings ◽

Differential Variational Inequalities ◽

Theoretical Developments

A new class of differential variational inequalities (DVIs), governed by a variational inequality and an evolution equation formulated in infinite-dimensional spaces, is investigated in this paper. More precisely, based on Browder’s result, optimal control theory, measurability of set-valued mappings and the theory of semigroups, we establish that the solution set of DVI is nonempty and compact. In addition, the theoretical developments are accompanied by an application to differential Nash games.

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Nonlocal fractional semilinear differential inclusions with noninstantaneous impulses and of order α ∈ (1, 2)

International Journal of Nonlinear Sciences and Numerical Simulation ◽

10.1515/ijnsns-2019-0179 ◽

2020 ◽

Vol 0 (0) ◽

Author(s):

JinRong Wang ◽

Ahmed G. Ibrahim ◽

Donal O’Regan ◽

Adel A. Elmandouh

Keyword(s):

Differential Inclusions ◽

Mild Solutions ◽

Multivalued Function ◽

Linear Operators ◽

Solution Set ◽

Cosine Family ◽

Bounded Linear Operators ◽

Bounded Linear ◽

Noninstantaneous Impulses

AbstractIn this paper, we establish the existence of mild solutions for nonlocal fractional semilinear differential inclusions with noninstantaneous impulses of order α ∈ (1,2) and generated by a cosine family of bounded linear operators. Moreover, we show the compactness of the solution set. We consider both the case when the values of the multivalued function are convex and nonconvex. Examples are given to illustrate the theory.

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