Alexander Zlotnik
Orcid: 0000-0003-2440-2816Affiliations:
- National Research University Higher School of Economics, Moscow, Russia
According to our database1,
Alexander Zlotnik
authored at least 31 papers
between 2001 and 2024.
Collaborative distances:
Collaborative distances:
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Online presence:
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on zbmath.org
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on scopus.com
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on orcid.org
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Bibliography
2024
On properties of a semi-explicit in time fourth-order vector compact scheme for the multidimensional acoustic wave equation.
CoRR, 2024
2023
Remarks on the model of quasi-homogeneous binary mixtures with the NASG equations of state.
Appl. Math. Lett., December, 2023
On Construction and Properties of Compact 4th Order Finite-Difference Schemes for the Variable Coefficient Wave Equation.
J. Sci. Comput., April, 2023
On Regularized Systems of Equations for Gas Mixture Dynamics with New Regularizing Velocities and Diffusion Fluxes.
Entropy, January, 2023
On a Doubly Reduced Model for Dynamics of Heterogeneous Mixtures of Stiffened Gases, its Regularizations and their Implementations.
CoRR, 2023
2022
Entropy Correct Spatial Discretizations for 1D Regularized Systems of Equations for Gas Mixture Dynamics.
Symmetry, 2022
Appl. Math. Comput., 2022
2021
On Conditions for L2-Dissipativity of an Explicit Finite-Difference Scheme for Linearized 2D and 3D Barotropic Gas Dynamics System of Equations with Regularizations.
Symmetry, 2021
Math. Model. Anal., 2021
Correction to the Paper: An Energy Dissipative Spatial Discretization for the Regularized Compressible Navier-stokes-cahn-hilliard System of Equations (in Math. Model. Anal., 25(1): 110-129, https: //doi.org/10.3846/MMA.2020.10577).
Math. Model. Anal., 2021
On a New Spatial Discretization for a Regularized 3D Compressible Isothermal Navier-Stokes-Cahn-Hilliard System of Equations with Boundary Conditions.
J. Sci. Comput., 2021
On properties of an explicit in time fourth-order vector compact scheme for the multidimensional wave equation.
CoRR, 2021
On Properties of Compact 4th order Finite-Difference Schemes for the Variable Coefficient Wave Equation.
CoRR, 2021
A compact higher-order finite-difference scheme for the wave equation can be strongly non-dissipative on non-uniform meshes.
Appl. Math. Lett., 2021
2020
An Energy dissipative Spatial discretization for the Regularized compressible Navier-Stokes-Cahn-Hilliard System of equations.
Math. Model. Anal., 2020
L2-dissipativity of the linearized explicit finite-difference scheme with a kinetic regularization for 2D and 3D gas dynamics system of equations.
Appl. Math. Lett., 2020
2019
On L2-dissipativity of linearized explicit finite-difference schemes with a regularization on a non-uniform spatial mesh for the 1D gas dynamics equations.
Appl. Math. Lett., 2019
2018
Practical error Analysis for the three-Level Bilinear FEM and finite-difference Scheme for the 1D wave equation with non-smooth Data.
Math. Model. Anal., 2018
A "converse" stability condition is necessary for a compact higher order scheme on non-uniform meshes for the time-dependent Schrödinger equation.
Appl. Math. Lett., 2018
Appl. Math. Lett., 2018
2015
The High Order Method with Discrete TBCs for Solving the Cauchy Problem for the 1D Schrödinger Equation.
Comput. Methods Appl. Math., 2015
On a splitting higher-order scheme with discrete transparent boundary conditions for the Schrödinger equation in a semi-infinite parallelepiped.
Appl. Math. Comput., 2015
2014
Error Estimates of the Crank-Nicolson-Polylinear FEM with the Discrete TBC for the Generalized Schrödinger Equation in an Unbounded Parallelepiped.
Proceedings of the Finite Difference Methods, Theory and Applications, 2014
2013
A Family of Finite-Difference Schemes with Discrete Transparent Boundary Conditions for a Parabolic Equation on the Half-Axis.
Comput. Methods Appl. Math., 2013
Splitting in Potential Finite-Difference Schemes with Discrete Transparent Boundary Conditions for the Time-Dependent Schrödinger Equation.
Proceedings of the Numerical Mathematics and Advanced Applications - ENUMATH 2013, 2013
2009
Error Bounds for Finite Element Methods with Generalized Cubic Splines for a 4-th Order Ordinary Differential Equation with Nonsmooth Data.
Comput. Methods Appl. Math., 2009
On one semidiscrete Galerkin method for a generalized time-dependent 2D Schrödinger equation.
Appl. Math. Lett., 2009
2005
Stabilization and stability for the spherically symmetric Navier-Stokes-Poisson system.
Appl. Math. Lett., 2005
2003
Stress and heat flux stabilization for viscous compressible medium equations with a nonmonotone state function.
Appl. Math. Lett., 2003
2001
Remark on the stabilization of a viscous barotropic medium with a nonmonotonic equation of state.
Appl. Math. Lett., 2001