S. E. Zhelezovskii scite author profile

S. E. Zhelezovskii

5Publications

29Citation Statements Received

7Citation Statements Given

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Affiliations

Saratov State Socio-Economic University, Kazan Federal University, Far-Eastern Academy of Public Service

Publications

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On error estimates in the Galerkin method for hyperbolic equations

Zhelezovskii

2005

Sib Math J

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We consider the Cauchy problem in a Hilbert space for a second-order abstract quasilinear hyperbolic equation with variable operator coefficients and nonsmooth (but Bochner integrable) free term. For this problem, we establish an a priori energy error estimate for the semidiscrete Galerkin method with an arbitrary choice of projection subspaces. Also, we establish some results on existence and uniqueness of an exact weak solution. We give an explicit error estimate for the finite element method and the Galerkin method in Mikhlin form.Keywords: second-order hyperbolic equation, the Galerkin method, error estimate, weak solution, existence and uniqueness of a solution, finite element method

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On the justification of the Galerkin method for hyperbolic equations

Zhelezovskii

2007

Diff Equat

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On the smoothness of solutions of an abstract coupled thermoelasticity problem

Zhelezovskii

2010

Comput. Math. and Math. Phys.

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Error Estimates for Schemes of the Projection-Difference Method for Quasilinear Hyperbolic Equations

Zhelezovskii

2004

Differential Equations

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Error estimates in the projection-difference method for a hyperbolic-parabolic system of abstract differential equations

Zhelezovskii

2010

Numer. Analys. Appl.

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S. E. Zhelezovskii

On error estimates in the Galerkin method for hyperbolic equations

On the justification of the Galerkin method for hyperbolic equations

On the smoothness of solutions of an abstract coupled thermoelasticity problem

Error Estimates for Schemes of the Projection-Difference Method for Quasilinear Hyperbolic Equations

Error estimates in the projection-difference method for a hyperbolic-parabolic system of abstract differential equations

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