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General numerical methods
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Lagrange interpolation and the Newton–Cotes formulas on a Bakhvalov mesh in the presence of a boundary layer
A. I. Zadorin, N. A. Zadorin
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355–366 |
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Monotone schemes of conditional approximation and arbitrary order of accuracy for the transport equation
P. P. Matus, B. D. Utebaev
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367–380 |
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Optimal control
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Optimal control problems for complex heat transfer equations with Fresnel matching conditions
A. Yu. Chebotarev
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381–390 |
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Partial Differential Equations
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Smooth solution of the second initial-boundary value problem for a model parabolic system in a semibounded nonsmooth domain on the plane
E. A. Baderko, A. A. Stasenko
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391–402 |
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On normal modes of a waveguide
O. K. Kroytor, M. D. Malykh, L. A. Sevastyanov
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403–420 |
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Quadrature formula for a double layer potential in the case of the Helmholtz equation
P. A. Krutitskii, I. O. Reznichenko
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421–436 |
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The Avalos–Triggiani problem for the linear Oskolkov system and a system of wave equations
G. A. Sviridyuk, T. G. Sukacheva
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437–441 |
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Monotone decomposition of the Cauchy problem for a hyperbolic equation based on transport equations
G. I. Shishkin, L. P. Shishkina
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442–450 |
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Mathematical physics
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Features of numerical reconstruction of a boundary condition in an inverse problem for a reaction–diffusion–advection equation with data on the position of a reaction front
R. L. Argun, A. V. Gorbachev, D. V. Lukyanenko, M. A. Shishlenin
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451–461 |
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Cauchy problem for a new aggregation–fragmentation model in the case of equal reaction rate constants
Ya. G. Batishcheva
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462–477 |
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Integral representation of the solution to the nonstationary Lamb problem in the case of a limiting Poisson ratio
H. H. Ilyasov, A. V. Kravtsov, Al. V. Kravtsov, S. V. Kuznetsov
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478–487 |
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Semi-implicit and semidiscrete difference schemes for solving a nonstationary kinetic equation of thermal radiative transfer and energy equation
N. Ya. Moiseev, V. M. Shmakov
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488–498 |
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A version of closing the system of moment equations of an arbitrary order
Yu. A. Nikitchenko
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499–520 |
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Computer science
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Modeling flexible manipulators without inverting their mass matrices
H. A. Gevorgyan
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521–528 |
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