Boris P. Belinskiy scite author profile

Boris P. Belinskiy

5Publications

82Citation Statements Received

45Citation Statements Given

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Affiliations

University of Tennessee at Chattanooga

Publications

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Energy of a string driven by a two-parameter Gaussian noise white in time

Belinskiy

Caithamer

2001

J. Appl. Probab.

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In this paper we consider the stochastic wave equation in one spatial dimension driven by a two-parameter Gaussian noise which is white in time and has general spatial covariance. We give conditions on the spatial covariance of the driving noise sufficient for the string to have finite expected energy and calculate this energy as a function of time. We show that these same conditions on the spatial covariance of the driving noise are also sufficient to guarantee that the energy of the string has a version which is continuous almost surely.

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On Controllability of an Elastic Ring

Avdonin¹,

Belinskiy

Иванов

2009

Appl Math Optim

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Exact Controllability of the Damped Wave Equation

Shubov¹,

Martin²,

Dauer³

et al. 1997

SIAM J. Control Optim.

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Asymptotics of eigenfrequencies and eigenmodes of non‐homogeneous inextensible filament with an end load

Shubov

Belinskiy

Martin

2001

Math Methods in App Sciences

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We consider a class of non‐selfadjoint operators generated by the equation and the boundary conditions, which govern small vibrations of an ideal filament with non‐conservative boundary conditions at one end and a heavy load at the other end. The filament has a non‐constant density and is subject to a viscous damping with a non‐constant damping coefficient. The boundary conditions contain two arbitrary complex parameters. We derive the spectral asymptotics for the aforementioned two‐parameter family of non‐selfadjoint operators. In the forthcoming papers, based on the asymptotical results of the present paper, we will prove the Riesz basis property of the eigenfunctions. The spectral results obtained in the aforementioned papers will allow us to solve boundary and/or distributed controllability problems for the filament using the spectral decomposition method. Copyright © 2001 John Wiley & Sons, Ltd.

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Controllability of a Nonhomogeneous String and Ring under Time Dependent Tension

Avdonin

Belinskiy

Pandolfi

2010

Math. Model. Nat. Phenom.

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Abstract. We study controllability for a nonhomogeneous string and ring under an axial stretching tension that varies with time. We consider the boundary control for a string and distributed control for a ring. For a string, we are looking for a control f (t) ∈ L 2 (0, T ) that drives the state solution to rest. We show that for a ring, two forces are required to achieve controllability. The controllability problem is reduced to a moment problem for the control. We describe the set of initial data which may be driven to rest by the control. The proof is based on an auxiliary basis property result.

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