Varga K. Kalantarov scite author profile

Abstract. We investigate the long-term dynamics of the three-dimensional NavierStokes-Voight model of viscoelastic incompressible fluid. Specifically, we derive upper bounds for the number of determining modes for the 3D Navier-Stokes-Voight equations and for the dimension of a global attractor of a semigroup generated by these equations. Viewed from the numerical analysis point of view we consider the Navier-Stokes-Voight model as a non-viscous (inviscid) regularization of the three-dimensional Navier-Stokes equations. Furthermore, we also show that the weak solutions of the Navier-StokesVoight equations converge, in the appropriate norm, to the weak solutions of the inviscid simplified Bardina model, as the viscosity coefficient ν → 0. MSC Classification: 37L30, 35Q35, 35Q30, 35B40

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The occurrence of collapse for quasilinear equations of parabolic and hyperbolic types

Kalantarov¹,

1978

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Smooth attractors for the Brinkman-Forchheimer equations with fast growing nonlinearities

Kalantarov¹,

Zelik²

2012

CPAA

130

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We prove the existence of regular dissipative solutions and global attractors for the 3D Brinkmann-Forchheimer equations with the nonlinearity of an arbitrary polynomial growth rate. In order to obtain this result, we prove the maximal regularity estimate for the corresponding semi-linear stationary Stokes problem using some modification of the nonlinear localization technique. The applications of our results to the Brinkmann-Forchheimer equation with the Navier-Stokes inertial term are also considered.1991 Mathematics Subject Classification. 35B40, 35B41, 35Q35.

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Finite-dimensional attractors for the quasi-linear strongly-damped wave equation

Kalantarov

Zelik

2009

Journal of Differential Equations

100

119

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We present a new method of investigating the so-called quasilinear strongly-damped wave equationsdomains. This method allows us to establish the existence and uniqueness of energy solutions in the case where the growth exponent of the non-linearity φ is less than 6 and f may have arbitrary polynomial growth rate. Moreover, the existence of a finite-dimensional global and exponential attractors for the solution semigroup associated with that equation and their additional regularity are also established. In a particular case φ ≡ 0 which corresponds to the so-called semi-linear strongly-damped wave equation, our result allows to remove the long-standing growth restriction | f (u)| C (1 + |u| 5 ).

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Attractors for Damped Quintic Wave Equations in Bounded Domains

Kalantarov

Savostianov

Zelik

2016

Ann. Henri Poincaré

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