Garik Petrosyan scite author profile

Garik Petrosyan

5Publications

53Citation Statements Received

15Citation Statements Given

How they've been cited

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Affiliations

Voronezh State Pedagogical University, Voronezh State University of Engineering Technologies, National Polytechnic University of Armenia

Publications

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On semilinear fractional order differential inclusions in Banach spaces

Kamenskiĭ¹,

Obukhovskiĭ²,

Petrosyan³

et al. 2017

FPT-RO

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Abstract. We are considering the Cauchy problem for a semilinear fractional differential inclusion in a Banach space. By using the fixed point theory for condensing multivalued maps, we prove the local and global theorems of the existence of mild solutions to this problem. We verify the compactness of the solutions set and its continuous dependence on parameters and initial data. We demonstrate also the application of the averaging principle to the investigation of the continuous dependence of the solutions set on a parameter in the case when the right-hand side of the inclusion is rapidly oscillating. Key Words and Phrases: Fractional differential inclusion, semilinear differential inclusion, Cauchy problem, continuous dependence of solutions, averaging principle, fixed point, multivalued map, condensing map, measure of noncompactness.

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Existence and approximation of solutions to nonlocal boundary value problems for fractional differential inclusions

Kamenskiĭ

Obukhovskiĭ

Petrosyan

et al. 2019

Fixed Point Theory Appl

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Boundary value problems for semilinear differential inclusions of fractional order in a Banach space

Kamenskiĭ

Obukhovskiĭ

Petrosyan

et al. 2017

Applicable Analysis

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On approximate solutions for a class of semilinear fractional-order differential equations in Banach spaces

Kamenskiĭ

Obukhovskiĭ

Petrosyan

et al. 2017

Fixed Point Theory Appl

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We apply the topological degree theory for condensing maps to study approximation of solutions to a fractional-order semilinear differential equation in a Banach space. We assume that the linear part of the equation is a closed unbounded generator of a C 0 -semigroup. We also suppose that the nonlinearity satisfies a regularity condition expressed in terms of the Hausdorff measure of noncompactness. We justify the scheme of semidiscretization of the Cauchy problem for a differential equation of a given type and evaluate the topological index of the solution set. This makes it possible to obtain a result on the approximation of solutions to the problem. Primary 34A45; secondary 34A08; 34G20; 47H08; 47H10; 47H11 MSC:

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On a Periodic Boundary Value Problem for a Fractional–Order Semilinear Functional Differential Inclusions in a Banach Space

et al. 2019

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We consider the periodic boundary value problem (PBVP) for a semilinear fractional-order delayed functional differential inclusion in a Banach space. We introduce and study a multivalued integral operator whose fixed points coincide with mild solutions of our problem. On that base, we prove the main existence result (Theorem ). We present an example dealing with existence of a trajectory for a time-fractional diffusion type feedback control system with a delay satisfying periodic boundary value condition.

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Garik Petrosyan

On semilinear fractional order differential inclusions in Banach spaces

Existence and approximation of solutions to nonlocal boundary value problems for fractional differential inclusions

Boundary value problems for semilinear differential inclusions of fractional order in a Banach space

On approximate solutions for a class of semilinear fractional-order differential equations in Banach spaces

On a Periodic Boundary Value Problem for a Fractional–Order Semilinear Functional Differential Inclusions in a Banach Space

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