Cited reference search
Ладыженская О. А., Математические вопросы динамики вязкой несжимаемой жидкости , 2-е изд., Наука, М., 1970
Paper is cited in:
On strong solutions of the differential equations modeling the steady flow of certain incompressible generalized Newtonian fluids M. Bildhauer, M. Fuchs, X. ZhongAlgebra i Analiz , 2006, 18 :2 , 1–23
Estimates of deviation from the exact solutions for some boundary-value problems with incompressibilily condition С. И. РепинAlgebra i Analiz , 2004, 16 :5 , 124–161
Absolute continuity of the spectrum of a periodic Schrödinger operator in a multidimensional cylinder И. Качковский, Н. ФилоновAlgebra i Analiz , 2009, 21 :1 , 133–152
Rescalings at possible singularities of Navier–Stokes equations in half-space G. Seregin, V. ŠverákAlgebra i Analiz , 2013, 25 :5 , 146–172
Justification of the method of averaging for the system of equations with the Navier–Stokes operator in the principal part В. Б. ЛевенштамAlgebra i Analiz , 2014, 26 :1 , 94–127
A posteriori estimates for the stationary Stokes problem in exterior domains D. Pauly, S. RepinAlgebra i Analiz , 2019, 31 :3 , 184–215
Boundary control of a laminar flow of a viscous incompressible fluid in the generalized Couette cell. The asymptotic approach В. В. Гоцуленко, П. И. КогутAvtomat. i Telemekh. , 2007:2 , 63–80
Direct and inverse problems of high-viscosity fluid dynamics А. И. Короткий, И. А. ЦепелевAvtomat. i Telemekh. , 2007:5 , 84–96
Implicit finite difference scheme for barotropic gas equations Г. М. Кобельков, А. Г. СоколовChebyshevskii Sb. , 2017, 18 :3 , 306–317
Infinite-dimensional and finite-dimensional $\varepsilon$ -controllability for a class of fractional order degenerate evolution equations Д. М. Гордиевских, В. Е. Фёдоров, М. М. ТуровChelyab. Fiz.-Mat. Zh. , 2018, 3 :1 , 5–26
Issues of unique solvability and approximate controllability of linear fractional order equations with a Hölderian right-hand side А. С. Авилович, Д. М. Гордиевских, В. Е. ФедоровChelyab. Fiz.-Mat. Zh. , 2020, 5 :1 , 5–21
On some optimal control problem in the Voigt model of the motion of a viscoelastic fluid В. Г. Звягин, М. Ю. КузьминCMFD , 2006, 16 , 38–46
The study of initial-boundary value problems for mathematical models of the motion of Kelvin–Voigt fluids В. Г. Звягин, М. В. ТурбинCMFD , 2009, 31 , 3–144
Flow of a viscous incompressible fluid around a body: boundary-value problems and minimization of the work of a fluid А. В. ФурсиковCMFD , 2010, 37 , 83–130
Topological approximation approach to study of mathematical problems of hydrodynamics В. Г. ЗвягинCMFD , 2012, 46 , 92–119
Small motions and normal oscillations in systems of connected gyrostats Э. И. Батыр, Н. Д. КопачевскийCMFD , 2013, 49 , 5–88
On some problems generated by a sesquilinear form Н. Д. Копачевский, А. Р. ЯкубоваCMFD , 2017, 63 :2 , 278–315
Some free boundary problems arising in rock mechanics А. М. Мейрманов, О. В. Гальцев, О. А. ГальцеваCMFD , 2018, 64 :1 , 98–130
On spectral and evolutional problems generated by a sesquilinear form А. Р. ЯкубоваCMFD , 2020, 66 :2 , 335–371
The problem of the flow of one type of non-Newtonian fluid through the boundary of a multi-connected domain В. Г. Звягин, В. П. ОрловDokl. RAN. Math. Inf. Proc. Upr. , 2023, 510 , 33–38
Variational inequalities, boundary – value problems and optimal control for the Navier – Stokes equations А. Ю. Чеботарев, А. А. Илларионов, Е. В. АмосоваDal'nevost. Mat. Zh. , 2008, 8 :1 , 121–140
The solvability of extremal problems for Poisson equation and Stokes system А. А. ИлларионовDal'nevost. Mat. Zh. , 2008, 8 :2 , 164–170
On the solvability of boundary problems for stationary Navier-Stokes equations А. А. ИлларионовDal'nevost. Mat. Zh. , 2001, 2 :1 , 16–36
Optimal control in non well posed problem for Stokes equations В. А. АнненковDal'nevost. Mat. Zh. , 2003, 4 :1 , 18–26
Stabilization from the boundary of solution for Navier-Stokes system: solvability and justification of numerical simulation А. В. ФурсиковDal'nevost. Mat. Zh. , 2003, 4 :1 , 86–100
On solvability of stationary boundary value problem for the heat and mass transfer equations А. Б. Смышляев, Д. А. ТерешкоDal'nevost. Mat. Zh. , 2004, 5 :1 , 41–52
The solvability of stationary boundary problem for model of the granular medium А. А. Илларионов, А. Ю. ЧеботаревDal'nevost. Mat. Zh. , 2004, 5 :2 , 178–183
The stationary solutions to the two-dimensional Navier–Stokes equation for large fluxes А. А. Илларионов, Л. В. ИлларионоваDal'nevost. Mat. Zh. , 2015, 15 :1 , 61–69
The solvability of the boundary value problem for the system of thermoelasticity equations in space Е. П. СуляндзигаDal'nevost. Mat. Zh. , 2017, 17 :1 , 98–109
On the Stability of a Top with a Cavity Filled with a Viscous Fluid А. Г. Костюченко, А. А. Шкаликов, М. Ю. ЮркинFunktsional. Anal. i Prilozhen. , 1998, 32 :2 , 36–55
The Finite Dimension Property of Small Oscillations of a Top with a Cavity Filled with an Ideal Fluid М. Ю. ЮркинFunktsional. Anal. i Prilozhen. , 1997, 31 :1 , 51–66
Spectral properties of the operator bundles generated by elliptic boundary-value problems in a cone В. А. Козлов, В. Г. МазьяFunktsional. Anal. i Prilozhen. , 1988, 22 :2 , 38–46
Topological index of extremals of multidimensional variational problems Н. А. БобылевFunktsional. Anal. i Prilozhen. , 1986, 20 :2 , 8–13
Normal oscillations of a viscous liquid partly filling an elastic vessel М. Б. ОразовFunktsional. Anal. i Prilozhen. , 1982, 16 :1 , 83–84
The Inhomogeneous Dirichlet Problem for the Stokes System in Lipschitz Domains with Unit Normal Close to VMO В. Г. Мазья, М. Митря, Т. О. ШапошниковаFunktsional. Anal. i Prilozhen. , 2009, 43 :3 , 65–88
On the Spectrum of the Stokes Operator А. А. ИльинFunktsional. Anal. i Prilozhen. , 2009, 43 :4 , 14–25
The weak solvability of an inhomogeneous dynamic problem
for a viscoelastic continuum with memory В. Г. Звягин, В. П. ОрловFunktsional. Anal. i Prilozhen. , 2023, 57 :1 , 93–99
On some finite-difference approximations of Stokes problem П. П. Аристов, Е. В. ЧижонковFundam. Prikl. Mat. , 1995, 1 :3 , 573–580
The Showalter–Sidorov problem as a phenomena of the Sobolev-type equations Г. А. Свиридюк, С. А. ЗагребинаBulletin of Irkutsk State University. Series Mathematics , 2010, 3 :1 , 104–125
Solutions for initial boundary value problems for some degenerate equations systems of fractional order with respect to the time Д. М. Гордиевских, В. Е. ФедоровBulletin of Irkutsk State University. Series Mathematics , 2015, 12 , 12–22
Reconstruction of boundary controls in reaction–convection–diffusion model А. И. Короткий, Ю. В. СтародубцеваIzv. IMI UdGU , 2015:2 , 85–92
Evolution problems in the mechanics of visco-plastic media В. С. КлимовIzv. RAN. Ser. Mat. , 1995, 59 :1 , 139–156
On the asymptotics of the solution to the three-dimensional problem of flow far from streamlined bodies Л. И. СазоновIzv. RAN. Ser. Mat. , 1995, 59 :5 , 173–196
Homogenization of non-stationary Stokes equations with viscosity in a perforated domain Г. В. СандраковIzv. RAN. Ser. Mat. , 1997, 61 :1 , 113–140
Boundary-value problems for general elliptic systems in the plane М. М. СиражудиновIzv. RAN. Ser. Mat. , 1997, 61 :5 , 137–176
Smoothness of solutions of equations describing generalized Newtonian flows and estimates for the dimensions of their attractors О. А. Ладыженская, Г. А. СерёгинIzv. RAN. Ser. Mat. , 1998, 62 :1 , 59–122
The justification of an asymptotic expansion for the solution of the two-dimensional flow problem at small Reynolds numbers Л. И. СазоновIzv. RAN. Ser. Mat. , 2003, 67 :5 , 125–154
The influence of viscosity on oscillations in some linearized problems of hydrodynamics Г. В. СандраковIzv. RAN. Ser. Mat. , 2007, 71 :1 , 101–154
On a boundary value problem for the time-dependent Stokes system with general boundary conditions И. Ш. МогилевскийIzv. Akad. Nauk SSSR Ser. Mat. , 1986, 50 :1 , 37–66
On the alternating directions method for the calculation in cylindrical coordinates of the flow of a viscous incompressible fluid О. А. Ладыженская, В. Я. РивкиндIzv. Akad. Nauk SSSR Ser. Mat. , 1971, 35 :2 , 259–268
Example of nonuniqueness in the Hopf class of weak solutions for the Navier–Stokes equations О. А. ЛадыженскаяIzv. Akad. Nauk SSSR Ser. Mat. , 1969, 33 :1 , 240–247
On the question of nonrigidity in the nonlinear theory of gently sloping shells Л. С. СрубщикIzv. Akad. Nauk SSSR Ser. Mat. , 1972, 36 :4 , 890–909
The three-dimensional stationary flow problem at small Reynolds numbers Л. И. СазоновIzv. RAN. Ser. Mat. , 2011, 75 :6 , 99–128
On the classical solution of the macroscopic model of in-situ leaching of rare metals А. М. МейрмановIzv. RAN. Ser. Mat. , 2022, 86 :4 , 116–161
On weak solvability of fractional models of viscoelastic high order fluid В. Г. Звягин, В. П. ОрловIzv. RAN. Ser. Mat. , 2024, 88 :1 , 58–81
Inverse linear problems for a certain class of degenerate fractional evolution equations В. Е. Федоров, А. В. НагумановаItogi Nauki i Tekhniki. Sovrem. Mat. Pril. Temat. Obz. , 2019, 167 , 97–111
On a condition that ensures hydrodynamic stability and uniqueness of stationary and periodic fluid flows В. Л. ХацкевичItogi Nauki i Tekhniki. Sovrem. Mat. Pril. Temat. Obz. , 2021, 190 , 122–129
On the well-posedness of an inverse problem for a degenerate evolutionary equation with the Dzhrbashyan–Nersesyan fractional derivative М. В. Плеханова, Е. М. ИжбердееваItogi Nauki i Tekhniki. Sovrem. Mat. Pril. Temat. Obz. , 2022, 213 , 80–88
Exact solution of 3d Navier–Stokes equations for potential motions of an incompressible fluid А. В. КоптевItogi Nauki i Tekhniki. Sovrem. Mat. Pril. Temat. Obz. , 2023, 227 , 41–50
Kinetic models and high performance computing Б. Н. Четверушкин, В. И. СавельевKeldysh Institute preprints , 2015 , 079, 31 pp.
On an additive method for nonstationary Navier–Stokes equations В. Н. Абрашин, Н. Г. ЖадаеваIzv. Vyssh. Uchebn. Zaved. Mat. , 2005:1 , 3–9
$L_p$ -estimates for vector fields А. В. Калинин, А. А. КалинкинаIzv. Vyssh. Uchebn. Zaved. Mat. , 2004:3 , 26–35
On the existence of weak stationary solutions of a boundary value problem in the Jeffreys model of the motion of a viscoelastic medium Д. А. ВоротниковIzv. Vyssh. Uchebn. Zaved. Mat. , 2004:9 , 13–17
On strong solutions of an initial-boundary value problem for a regularized model of an incompressible viscoelastic medium В. Т. Дмитриенко, В. Г. ЗвягинIzv. Vyssh. Uchebn. Zaved. Mat. , 2004:9 , 24–40
On a class of difference methods for solving Navier–Stokes equations В. Н. Абрашин, В. М. Волков, А. А. Егоров, Н. Г. ЖадаеваIzv. Vyssh. Uchebn. Zaved. Mat. , 1999:5 , 3–11
Strong solution of certain thermoviscoelastic system В. П. ОрловIzv. Vyssh. Uchebn. Zaved. Mat. , 2010:8 , 51–58
A non-homogeneous regularized problem of dynamics of viscoelastic continuous medium В. П. ОрловIzv. Vyssh. Uchebn. Zaved. Mat. , 2012:8 , 58–64
The existence theorem for a weak solution to initial-boundary value problem for system of equations describing the motion of weak aqueous polymer solutions М. В. Турбин, А. С. УстюжаниноваIzv. Vyssh. Uchebn. Zaved. Mat. , 2019:8 , 62–78
On strong solutions of a fractional nonlinear viscoelastic Voigt-type model В. Г. Звягин, В. П. ОрловIzv. Vyssh. Uchebn. Zaved. Mat. , 2019:12 , 106–111
The optimal feedback control problem for Voigt model with variable density В. Г. Звягин, М. В. ТурбинIzv. Vyssh. Uchebn. Zaved. Mat. , 2020:4 , 93–98
On an initial-boundary value problem which arises in the dynamics of a viscous stratified fluid Д. О. ЦветковIzv. Vyssh. Uchebn. Zaved. Mat. , 2020:8 , 59–73
On a apriori estimates of weak solutions of one nongomogeneous problem of dynamics of viscoelastic medium with memory В. Г. Звягин, В. П. ОрловIzv. Vyssh. Uchebn. Zaved. Mat. , 2021:5 , 43–54
Strong solutions of one model of dynamics of thermoviscoelasticity of a continuous medium with memory В. Г. Звягин, В. П. ОрловIzv. Vyssh. Uchebn. Zaved. Mat. , 2021:6 , 95–101
Solvability of the initial-boundary value problem for the high-order Oldroyd model В. Г. Звягин, В. П. Орлов, М. В. ТурбинIzv. Vyssh. Uchebn. Zaved. Mat. , 2022:7 , 79–85
On Inequalities of the Friedrichs type for Combined Domains Виктор К. АндреевJ. Sib. Fed. Univ. Math. Phys. , 2009, 2 :2 , 146–157
Thermocapillary motion of two viscous liquids in a cylindrical pipe Виктор К. Андреев, Владимир В. КузнецовJ. Sib. Fed. Univ. Math. Phys. , 2010, 3 :4 , 461–474
The numerical approximation of discrete Vlasov–Darwin model based on the optimal reformulation of field equations Л. В. Бородачёв, И. В. Мингалев, О. В. МингалевMatem. Mod. , 2006, 18 :11 , 117–125
Studying the correctness of boundary problems for Navier–Stokes equations in primitive variables П. А. Ананьев, П. К. Волков, А. В. ПереверзевMatem. Mod. , 2004, 16 :7 , 68–76
Finite elements method for boundary problems solution of incompessible liquid regularized solutions in “speeds-pressure” variables П. К. Волков, А. В. ПереверзевMatem. Mod. , 2003, 15 :3 , 15–28
Mathematical model of platelet thrombus formation В. Н. Буравцев, А. И. Лобанов, А. В. УкраинецMatem. Mod. , 2009, 21 :3 , 109–119
Field numerical interpretation in the discrete Darwin model with implicit scheme calculation of particle dynamics Л. В. БородачёвMatem. Mod. , 2005, 17 :9 , 53–59
Resolution limits of continuous media models and their mathematical formulations Б. Н. ЧетверушкинMatem. Mod. , 2012, 24 :11 , 33–52
On calculation of platelet clot growth based on “advection-diffusion” equations Е. А. Погорелова, А. И. ЛобановMatem. Mod. , 2015, 27 :6 , 54–66
On a difference scheme on triangular meshes for gas dynamics equations М. А. ЛожниковMatem. Mod. , 2019, 31 :1 , 3–26
On an Inverse Problem for a Parabolic Equation Д. С. ТкаченкоMat. Zametki , 2004, 75 :5 , 729–743
On the Unique Solvability of an Inverse Problem for Parabolic Equations under a Final Overdetermination Condition В. Л. КамынинMat. Zametki , 2003, 73 :2 , 217–227
Trajectory and Global Attractors of Three-Dimensional Navier–Stokes Systems М. И. Вишик, В. В. ЧепыжовMat. Zametki , 2002, 71 :2 , 194–213
On the asymptotic behavior of the solution of the two-dimensional stationary problem of the flow past a body far from it Л. И. СазоновMat. Zametki , 1999, 65 :2 , 246–253
An operator approach to the study of the Oldroyd hydrodynamic model Т. Я. Азизов, Н. Д. Копачевский, Л. Д. ОрловаMat. Zametki , 1999, 65 :6 , 924–928
A remark on sets of determining elements for reaction-diffusion systems И. Д. ЧуешовMat. Zametki , 1998, 63 :5 , 774–784
The dynamics of a two-component fluid in the presence of capillary forces В. Н. СтаровойтовMat. Zametki , 1997, 62 :2 , 293–305
A regularization method for evolutionary problems in mechanics of visco-plastic media В. С. КлимовMat. Zametki , 1997, 62 :4 , 483–493
Attractors of periodic processes and estimates of their dimension М. И. Вишик, В. В. ЧепыжовMat. Zametki , 1995, 57 :2 , 181–202
Solvability of a boundary problem of motion of an inhomogeneous fluid Н. Н. ФроловMat. Zametki , 1993, 53 :6 , 130–140
The existence and uniqueness of the generalized solution of the inverse problem for the nonlinear nonstationary Navier–Stokes system in the case of integral overdetermination И. А. ВасинMat. Zametki , 1993, 54 :4 , 34–44
On the existence of a stationary symmetric solution of the two-dimensional fluid flow problem Л. И. СазоновMat. Zametki , 1993, 54 :6 , 138–141
On the inverse problem of determining the right-hand side of a parabolic equation under an integral overdetermination condition В. Л. КамынинMat. Zametki , 2005, 77 :4 , 522–534
On the Existence of a Variational Principle
for an Operator Equation with Second Derivative
with Respect to “Time” В. М. Савчин, С. А. БудочкинаMat. Zametki , 2006, 80 :1 , 87–94
On the Strong Solutions of a Regularized Model of a Nonlinear Visco-Elastic Medium В. П. ОрловMat. Zametki , 2008, 84 :2 , 238–253
Blow-Up in Systems with Nonlinear Viscosity Е. В. ЮшковMat. Zametki , 2014, 95 :4 , 615–629
On the Homogenization Principle in a Time-Periodic Problem for the Navier–Stokes Equations with Rapidly Oscillating Mass Force В. Л. ХацкевичMat. Zametki , 2016, 99 :5 , 764–777
Dirichlet Problem for the Stokes Equation В. В. ПухначевMat. Zametki , 2017, 101 :1 , 110–115
On the Closure of Smooth Compactly Supported Functions in Weighted Hölder Spaces К. В. Сидорова (Гагельганс), А. А. ШлапуновMat. Zametki , 2019, 105 :4 , 616–631
The Stationary Navier–Stokes–Boussinesq System with a Regularized Dissipation Function Е. С. БарановскийMat. Zametki , 2024, 115 :5 , 665–678
Theory of functionals that uniquely determine the asymptotic dynamics of infinite-dimensional dissipative systems И. Д. ЧуешовUspekhi Mat. Nauk , 1998, 53 :4 , 77–124
Well-posedness of problems in fluid dynamics (a fluid-dynamical point of view) Р. Х. ЗейтунянUspekhi Mat. Nauk , 1999, 54 :3 , 3–92
The polynomial property of self-adjoint elliptic boundary-value problems and an algebraic description of their attributes С. А. НазаровUspekhi Mat. Nauk , 1999, 54 :5 , 77–142
$L_{3,\infty}$ -solutions of the Navier–Stokes equations and backward uniqueness Л. Искауриаза, Г. А. Серёгин, В. ШверакUspekhi Mat. Nauk , 2003, 58 :2 , 3–44
Sixth problem of the millennium: Navier–Stokes equations, existence and smoothness О. А. ЛадыженскаяUspekhi Mat. Nauk , 2003, 58 :2 , 45–78
Global solubility of the three-dimensional Navier–Stokes equations with uniformly large initial vorticity А. С. Махалов, В. П. НиколаенкоUspekhi Mat. Nauk , 2003, 58 :2 , 79–110
On some unresolved issues in non-linear fluid dynamics К. Р. РаджагопалUspekhi Mat. Nauk , 2003, 58 :2 , 111–122
On estimates of solutions of the non-stationary Stokes problem in anisotropic Sobolev spaces and on estimates for the resolvent of the Stokes operator В. А. СолонниковUspekhi Mat. Nauk , 2003, 58 :2 , 123–156
Topological analysis of the structure of hydrodynamic flows О. В. ТрошкинUspekhi Mat. Nauk , 1988, 43 :4 , 129–158
Spectral and stabilized asymptotic behaviour of solutions of non-linear evolution equations А. В. Бабин, М. И. ВишикUspekhi Mat. Nauk , 1988, 43 :5 , 99–132
Unstable invariant sets of semigroups of non-linear operators and their perturbations А. В. Бабин, М. И. ВишикUspekhi Mat. Nauk , 1986, 41 :4 , 3–34
Boundary equations with projections В. С. РябенькийUspekhi Mat. Nauk , 1985, 40 :2 , 121–149
The life and scientific work of Vladimir Ivanovich Smirnov О. А. ЛадыженскаяUspekhi Mat. Nauk , 1987, 42 :6 , 3–23
On the determination of minimal global attractors for the Navier–Stokes and other partial differential equations О. А. ЛадыженскаяUspekhi Mat. Nauk , 1987, 42 :6 , 25–60
$L_2$ -Theory of the Maxwell operator in arbitrary domains М. Ш. Бирман, М. З. СоломякUspekhi Mat. Nauk , 1987, 42 :6 , 61–76
On the problem of unique solubility of a three-dimensional Navier–Stokes system for almost all initial conditions А. В. ФурсиковUspekhi Mat. Nauk , 1981, 36 :2 , 207–208
Attractors of partial differential evolution equations and estimates of their dimension А. В. Бабин, М. И. ВишикUspekhi Mat. Nauk , 1983, 38 :4 , 133–187
Hyperbolic limit sets of evolutionary equations and the Galerkin method Д. А. КамаевUspekhi Mat. Nauk , 1980, 35 :3 , 188–192
Some mathematical problems of statistical hydromechanics М. И. Вишик, А. И. Комеч, А. В. ФурсиковUspekhi Mat. Nauk , 1979, 34 :5 , 135–210
Asymptotic properties of Leray's solution of the stationary two-dimensional Navier–Stokes equations Г. Ф. Вайнбергер, Д. ГилбаргUspekhi Mat. Nauk , 1974, 29 :2 , 109–122
Functional approach to turbulence Ч. ФояшUspekhi Mat. Nauk , 1974, 29 :2 , 282–313
On $\varepsilon$ -controllability of the Stokes problem with distributed control concentrated on a subdomain А. В. Фурсиков, О. Ю. ЭмануиловUspekhi Mat. Nauk , 1992, 47 :1 , 217–218
On Stokes' formula for the force of resistance Т. Ю. КрасулинаUspekhi Mat. Nauk , 1990, 45 :5 , 191–192
The spectrum of a family of operators in the theory of elasticity С. Г. МихлинUspekhi Mat. Nauk , 1973, 28 :3 , 43–82
Lectures on bifurcations in versal families В. И. АрнольдUspekhi Mat. Nauk , 1972, 27 :5 , 119–184
Partial differential inequalities Ж. Л. ЛионсUspekhi Mat. Nauk , 1971, 26 :2 , 205–263
Orthonormal quaternion frames, Lagrangian evolution equations, and the three-dimensional Euler equations Д. ГиббонUspekhi Mat. Nauk , 2007, 62 :3 , 47–72
Boundary-value problems for partial differential equations in non-smooth domains В. А. Кондратьев, О. А. ОлейникUspekhi Mat. Nauk , 1983, 38 :2 , 3–76
Trajectory attractors of equations of mathematical physics М. И. Вишик, В. В. ЧепыжовUspekhi Mat. Nauk , 2011, 66 :4 , 3–102
Uniform attractors of dynamical processes and non-autonomous equations of mathematical physics В. В. ЧепыжовUspekhi Mat. Nauk , 2013, 68 :2 , 159–196
Dynamical systems approach to models in fluid mechanics Э. ФайрайзлUspekhi Mat. Nauk , 2014, 69 :2 , 149–176
Attractors of equations of non-Newtonian fluid dynamics В. Г. Звягин, С. К. КондратьевUspekhi Mat. Nauk , 2014, 69 :5 , 81–156
The flux problem for the Navier–Stokes equations М. В. Коробков, К. Пилецкас, В. В. Пухначёв, Р. РуссоUspekhi Mat. Nauk , 2014, 69 :6 , 115–176
Liouville-type theorems for the Navier–Stokes equations Г. А. Серёгин, Т. Н. ШилкинUspekhi Mat. Nauk , 2018, 73 :4 , 103–170
Darcy's law in anisothermic porous medium А. М. МейрмановSib. Èlektron. Mat. Izv. , 2007, 4 , 141–154
Mathematical models of a hydraulic shock in a viscous liquid И. В. НекрасоваSib. Èlektron. Mat. Izv. , 2012, 9 , 227–246
Qualitative properties of a mathematical model of a rotating fluid В. С. Белоносов, Т. И. ЗеленякSib. Zh. Ind. Mat. , 2002, 5 :4 , 3–13
A linearized model of the motion of a viscoelastic incompressible Kelvin–Voight fluid of nonzero order Т. Г. Сукачева, М. Н. ДаугаветSib. Zh. Ind. Mat. , 2003, 6 :4 , 111–118
Оптимальное управление разгоном проводящего газа Е. В. АмосоваSib. Zh. Ind. Mat. , 2008, 11 :4 , 5–18
A fundamental solution to the stationary equation for two-velocity hydrodynamics with one pressure Х. Х. Имомназаров, Ш. Х. Имомназаров, М. М. Маматкулов, Е. Г. ЧерныхSib. Zh. Ind. Mat. , 2014, 17 :4 , 60–66
The fundamental solution of the equation in dissipative approximation for the stationary two-velocity hydrodynamics with phase equilibrium pressure
Б. Х. Имомназаров, Ш. Х. Имомназаров, М. М. Маматкулов, Б. Б. ХудайназаровSib. Zh. Ind. Mat. , 2022, 25 :3 , 33–40
Three-dimensional simulation of single- and multiphase flow in roughness microchannels
О. А. Солнышкина, Н. Б. Фаткуллина, А. З. БулатоваSib. Zh. Ind. Mat. , 2023, 26 :2 , 130–141
On extrapolation with respect to a parameter in the perturbed mixed variational problem А. А. Калинкин, Ю. М. ЛаевскийSib. Zh. Vychisl. Mat. , 2005, 8 :4 , 307–323
Modeling of boundary conditions for pressure by fictitious domain method in the incompressible flow problems Ш. С. Смагулов, Н. М. Темирбеков, К. С. КамаубаевSib. Zh. Vychisl. Mat. , 2000, 3 :1 , 57–71
A boundary value problem for one overdetermined stationary system emerging in the two-velocity hydrodynamics М. В. Урев, Х. Х. Имомназаров, Жиан-Ган ТанSib. Zh. Vychisl. Mat. , 2017, 20 :4 , 425–437
On the flow the water under a still stone С. А. НазаровMat. Sb. , 1995, 186 :11 , 75–110
Uniqueness classes for a non-stationary system of Stokes equations in unbounded domains Н. М. Асадуллин, Ф. Х. МукминовMat. Sb. , 1996, 187 :3 , 3–22
Averaging principle for dissipative dynamical systems with rapidly oscillating right-hand sides А. А. ИльинMat. Sb. , 1996, 187 :5 , 15–58
$L_p$ -estimates of the resolvent of the Stokes operator in infinite tubes С. В. Ревина, В. И. ЮдовичMat. Sb. , 1996, 187 :6 , 97–118
Asymptotics of solutions of the stationary Navier–Stokes system of equations in a domain of layer type К. ПилецкасMat. Sb. , 2002, 193 :12 , 69–104
Stabilization of the solution of a two-dimensional system of Navier–Stokes
equations in an unbounded domain with several exits to infinity Н. А. ХисамутдиноваMat. Sb. , 2003, 194 :3 , 83–114
Stabilization of the norm of the solution of a mixed problem
in an unbounded domain
for parabolic equations of orders 4 and 6 Ф. Х. Мукминов, И. М. БиккуловMat. Sb. , 2004, 195 :3 , 115–142
On uniform stabilization of solutions of the exterior problem for the Navier–Stokes equations Ф. Х. МукминовMat. Sb. , 1994, 185 :3 , 41–68
Linear stability of equilibria of a fluid that is a nonconductor of heat В. И. ЮдовичMat. Sb. , 1994, 185 :5 , 139–159
Of the first mixed problem for the system of Navier–Stokes equations in domains with noncompact boundaries Ф. Х. МукминовMat. Sb. , 1993, 184 :4 , 139–160
On decay of a solution of the first mixed problem for the linearized system of Navier–Stokes equations in a domain with noncompact boundary Ф. Х. МукминовMat. Sb. , 1992, 183 :10 , 123–144
The Navier–Stokes and Euler equations on two-dimensional closed manifolds А. А. ИльинMat. Sb. , 1990, 181 :4 , 521–539
Asymptotics as $|x|\to\infty$ of functions lying on an attractor of the two-dimensional Navier–Stokes system in an unbounded plane domian А. В. БабинMat. Sb. , 1991, 182 :12 , 1683–1709
The Euler equations with dissipation А. А. ИльинMat. Sb. , 1991, 182 :12 , 1729–1739
On certain inverse problems for parabolic equations with final and integral observation А. И. Прилепко, А. Б. КостинMat. Sb. , 1992, 183 :4 , 49–68
Convection of a very viscous and non-heat-conductive fluid В. И. ЮдовичMat. Sb. , 2007, 198 :1 , 127–158
On the well-posedness of evolution problems of the mechanics of visco-plastic media В. С. КлимовMat. Sb. (N.S.) , 1988, 179 :3 , 352–363
On the operator of the linearized steady-state Navier–Stokes problem А. Н. КожевниковMat. Sb. (N.S.) , 1984, 167 :1 , 3–18
Solvability of a chain of equations for space-time moments А. В. ФурсиковMat. Sb. (N.S.) , 1984, 167 :3 , 306–331
On the maximum principle for strongly elliptic and parabolic second order systems with constant coefficients В. Г. Мазья, Г. И. КресинMat. Sb. (N.S.) , 1984, 167 :4 , 458–480
Control problems and theorems concerning the unique solvability of a mixed boundary value problem for the three-dimensional Navier–Stokes and Euler equations А. В. ФурсиковMat. Sb. (N.S.) , 1981, 157 :2 , 281–306
On uniqueness of the solution of the chain of moment equations corresponding to the three-dimensional Navier–Stokes system А. В. ФурсиковMat. Sb. (N.S.) , 1987, 176 :4 , 472–495
Asymptotic expansion of moment functions of solutions of nonlinear parabolic equations М. И. Вишик, А. В. ФурсиковMat. Sb. (N.S.) , 1974, 137 :4 , 588–605
Acoustic and filtration properties of a thermoelastic porous medium: Biot's equations of thermo-poroelasticity А. М. МейрмановMat. Sb. , 2008, 199 :3 , 45–68
On convergence of trajectory attractors of the 3D Navier–Stokes-$\alpha$
model as $\alpha$ approaches 0 М. И. Вишик, Э. С. Тити, В. В. ЧепыжовMat. Sb. , 2007, 198 :12 , 3–36
On the existence of a generalized solution
of the conjugation problem for the Navier–Stokes system Л. И. СазоновMat. Sb. , 2007, 198 :12 , 63–86
Blow-up of Oskolkov's system of equations М. О. Корпусов, А. Г. СвешниковMat. Sb. , 2009, 200 :4 , 83–108
Lower bounds for sums of eigenvalues of elliptic operators and systems А. А. ИльинMat. Sb. , 2013, 204 :4 , 103–126
Smooth solutions of the Navier-Stokes equations С. И. ПохожаевMat. Sb. , 2014, 205 :2 , 131–144
Approximating the trajectory attractor of the 3D Navier-Stokes system using various $\alpha$ -models of fluid dynamics В. В. ЧепыжовMat. Sb. , 2016, 207 :4 , 143–172
A one-dimensional model of flow in a junction of thin channels, including arterial trees В. А. Козлов, С. А. НазаровMat. Sb. , 2017, 208 :8 , 56–105
Nguetseng's two-scale convergence method for filtration and seismic acoustic problems in elastic porous media А. М. МейрмановSibirsk. Mat. Zh. , 2007, 48 :3 , 645–667
Monotone mappings and flows of viscous media В. С. КлимовSibirsk. Mat. Zh. , 2004, 45 :6 , 1299–1315
Conditions for existence of a global strong solution to one class of nonlinear evolution equations in Hilbert space М. Отелбаев, А. А. Дурмагамбетов, Е. Н. СейткуловSibirsk. Mat. Zh. , 2008, 49 :3 , 620–634
On a possibility of generalization of the Hopf lemma to the case of the Navier–Stokes system with nonzero flows А. А. ИлларионовSibirsk. Mat. Zh. , 2009, 50 :4 , 831–835
Existence and nonuniqueness of solutions to a functional-differential equation А. И. НоаровSibirsk. Mat. Zh. , 2012, 53 :6 , 1385–1390
Nontrivial solvability of elliptic equations in divergence form with complex coefficients А. И. НоаровSibirsk. Mat. Zh. , 2014, 55 :3 , 573–579
On the Maxwell system under impedance boundary conditions with memory М. В. УревSibirsk. Mat. Zh. , 2014, 55 :3 , 672–689
Quasilinear equations that are not solved for the higher-order time derivative М. В. ПлехановаSibirsk. Mat. Zh. , 2015, 56 :4 , 909–921
Study of degenerate evolution equations with memory by operator semigroup methods В. Е. Федоров, Л. В. БорельSibirsk. Mat. Zh. , 2016, 57 :4 , 899–912
On the asymptotics of the motion of a nonlinear viscous fluid В. Л. ХацкевичSibirsk. Mat. Zh. , 2017, 58 :2 , 430–439
Degenerate linear evolution equations with the Riemann–Liouville fractional derivative В. Е. Федоров, М. В. Плеханова, Р. Р. НажимовSibirsk. Mat. Zh. , 2018, 59 :1 , 171–184
Study of solvability of a thermoviscoelastic model describing the motion of weakly concentrated water solutions of polymers А. В. ЗвягинSibirsk. Mat. Zh. , 2018, 59 :5 , 1066–1085
A Cauchy type problem for a degenerate equation with the Riemann–Liouville derivative in the sectorial case В. Е. Федоров, А. С. АвиловичSibirsk. Mat. Zh. , 2019, 60 :2 , 461–477
Development of the collocations and least squares method В. И. Исаев, В. П. ШапеевTrudy Inst. Mat. i Mekh. UrO RAN , 2008, 14 :1 , 41–60
On solvability of stationary problems of natural thermal convection of a high-viscosity fluid А. И. Короткий, Д. А. КовтуновTrudy Inst. Mat. i Mekh. UrO RAN , 2008, 14 :1 , 61–73
The recovery of parameters of a Navier–Stokes system А. И. КороткийTrudy Inst. Mat. i Mekh. UrO RAN , 2005, 11 :1 , 122–138
Solution of a retrospective inverse problem for a nonlinear evolutionary model А. И. Короткий, И. А. ЦепелевTrudy Inst. Mat. i Mekh. UrO RAN , 2003, 9 :2 , 73–86
Nonlocal solutions of the Cauchy problem in scales of analytic polyalgebras С. С. ТитовTrudy Inst. Mat. i Mekh. UrO RAN , 2003, 9 :2 , 105–128
Optimal boundary control of a system describing thermal convection А. И. Короткий, Д. А. КовтуновTrudy Inst. Mat. i Mekh. UrO RAN , 2010, 16 :1 , 76–101
Solution in weak sense of a boundary value problem describing thermal convection А. И. КороткийTrudy Inst. Mat. i Mekh. UrO RAN , 2010, 16 :2 , 121–132
Optimal control of thermal convection А. И. Короткий, Д. А. КовтуновTrudy Inst. Mat. i Mekh. UrO RAN , 2010, 16 :5 , 103–112
Regular asymptotics of a generalized solution of the stationary Navier–Stokes system С. В. ЗахаровTrudy Inst. Mat. i Mekh. UrO RAN , 2012, 18 :2 , 108–113
Approximation of nonsmooth solutions of a retrospective problem for an advection-diffusion model И. А. ЦепелевTrudy Inst. Mat. i Mekh. UrO RAN , 2012, 18 :2 , 281–290
Asymptotics of a generalized solution of the stationary Navier-Stokes system on a manifold diffeomorphic to a sphere С. В. ЗахаровTrudy Inst. Mat. i Mekh. UrO RAN , 2013, 19 :4 , 119–124
Semilinear degenerate evolution equations and nonlinear systems of hydrodynamic type В. Е. Фёдоров, П. Н. ДавыдовTrudy Inst. Mat. i Mekh. UrO RAN , 2013, 19 :4 , 267–278
Justification of the asymptotics of solutions of the Navier–Stokes system for low Reynolds numbers С. В. ЗахаровTrudy Inst. Mat. i Mekh. UrO RAN , 2014, 20 :2 , 161–167
Direct and inverse boundary value problems for models of stationary reaction-convection-diffusion А. И. Короткий, Ю. В. СтародубцеваTrudy Inst. Mat. i Mekh. UrO RAN , 2014, 20 :3 , 98–113
On some properties of the Navier-Stokes equations Л. И. Рубина, О. Н. УльяновTrudy Inst. Mat. i Mekh. UrO RAN , 2016, 22 :1 , 245–256
Solvability of a mixed boundary value problem for a stationary reaction-convection-diffusion model А. И. Короткий, А. Л. ЛитвиненкоTrudy Inst. Mat. i Mekh. UrO RAN , 2018, 24 :1 , 106–120
Gravitational flow of a two-phase viscous incompressible liquid А. И. Короткий, Ю. В. Стародубцева, И. А. ЦепелевTrudy Inst. Mat. i Mekh. UrO RAN , 2021, 27 :4 , 61–73
Assimilating Data on the Location of the Free Surface of a Fluid Flow to Determine Its Viscosity А. И. Короткий, И. А. Цепелев, А. Т. Исмаил-задеTrudy Inst. Mat. i Mekh. UrO RAN , 2022, 28 :2 , 143–157
Assimilation of Boundary Data for Reconstructing the Absorption Coefficient in a Model of Stationary Reaction–Convection–Diffusion А. И. Короткий, И. А. ЦепелевTrudy Inst. Mat. i Mekh. UrO RAN , 2023, 29 :2 , 87–103
Nonisothermal Filtration and Seismic Acoustics in Porous Soil: Thermoviscoelastic Equations and Lamé Equations А. М. МейрмановTrudy Mat. Inst. Steklova , 2008, 261 , 210–219
On the Navier–Stokes equations: Existence theorems and energy equalities В. В. Жиков, С. Е. ПастуховаTrudy Mat. Inst. Steklova , 2012, 278 , 75–95
Renormalization group in the theory of fully developed turbulence. Problem of the infrared relevant corrections to the Navier–Stokes equation Н. В. Антонов, С. В. Борисенок, В. И. ГиринаTMF , 1996, 107 :1 , 47–63
Some properties of the potential theory operators and and their application to investigation of the basic electro- and magnetostatic equation В. Я. РаевскийTMF , 1994, 100 :3 , 323–331
Soliton in Gravitating Gas: Hoag's Object Г. П. ПронькоTMF , 2006, 146 :1 , 103–114
Nontrivial solutions of the Ginzburg–Landau equations В. С. КлимовTMF , 1982, 50 :3 , 383–389
Statistical thermodynammics of turbulent transport processes Д. Н. ЗубаревTMF , 1982, 53 :1 , 93–107
Spatial dispersion of nonlinearity and stability of multidimensional solitons С. К. ТурицынTMF , 1985, 64 :2 , 226–232
Global solutions of the Navier–Stokes equations in a uniformly rotating space Р. С. СаксTMF , 2010, 162 :2 , 196–215
Equations of the boundary layer for a modified Navier-Stokes system В. Н. Самохин, Г. М. Фадеева, Г. А. ЧечкинTr. Semim. im. I. G. Petrovskogo , 2011, 28 , 329–361
Derivation of equations of seismic and acoustic wave propagation and equations of filtration via homogenization of periodic structures А. М. МейрмановTr. Semim. im. I. G. Petrovskogo , 2009, 27 , 176–234
On some properties of solutions of Navier-Stokes equations with oscillating data Г. В. СандраковTr. Semim. im. I. G. Petrovskogo , 2007, 26 , 310–323
Equations of boundary layer for a generalized newtonian medium near a critical point В. Н. Самохин, Г. А. ЧечкинTr. Semim. im. I. G. Petrovskogo , 2016, 31 , 158–176
Equations of symmetric MHD-boundary layer of viscous fluid with Ladyzhenskaya rheology law Р. Р. Булатова, В. Н. Самохин, Г. А. ЧечкинTr. Semim. im. I. G. Petrovskogo , 2019, 32 , 72–90
Thermal-Convective Instability in a Liquid Layer in a System with Rotating Pivots Б. И. Басок, А. А. Авраменко, В. В. ГоцуленкоTVT , 2011, 49 :6 , 931–936
Cauchy problem for the Navier–Stokes equations, Fourier method Р. С. СаксUfimsk. Mat. Zh. , 2011, 3 :1 , 53–79
Iterative linearization of the evolution Navier–Stokes equations И. И. ГоличевUfimsk. Mat. Zh. , 2012, 4 :4 , 69–78
Solving of spectral problems for curl and Stokes operators Р. С. СаксUfimsk. Mat. Zh. , 2013, 5 :2 , 63–81
Modified gradient fastest descent method for solving linearized non-stationary Navier-Stokes equations И. И. ГоличевUfimsk. Mat. Zh. , 2013, 5 :4 , 60–76
Gradient methods for solving Stokes problem И. И. Голичев, Т. Р. Шарипов, Н. И. ЛучниковаUfimsk. Mat. Zh. , 2016, 8 :2 , 22–38
Dirichlet boundary value problem for equations describing flows of a nonlinear viscoelastic fluid in a bounded domain М. А. Артемов, Ю. Н. БабкинаUfimsk. Mat. Zh. , 2021, 13 :3 , 17–26
Non-uniqueness of a stationary viscous flow in the square lid-driven cavity А. Г. Егоров, А. Н. НуриевKazan. Gos. Univ. Uchen. Zap. Ser. Fiz.-Mat. Nauki , 2009, 151 :3 , 130–143
Linearized model for Kelvin – Voight fluid Е. А. ОмельченкоVestnik Chelyabinsk. Gos. Univ. , 2013:16 , 114–118
Nonlinear inverse problem for the Oskolkov system, linearized in a stationary solution neighborhood Н. Д. Иванова, В. Е. Фёдоров, К. М. КомароваVestnik Chelyabinsk. Gos. Univ. , 2012:15 , 49–70
Nonstationarity linearizes model of dynamics of nonconpressible viscoelastic fluid Т. Г. СукачеваVestnik Chelyabinsk. Gos. Univ. , 2009:11 , 77–83
Фазовое пространство задачи
термоконвекции вязкоупругой несжимаемой жидкости Г. А. Кузнецов, М. М. ЯкуповVestnik Chelyabinsk. Gos. Univ. , 2002:6 , 92–103
Морфология фазового пространства одного класса
полулинейных уравнений типа Соболева Г. А. СвиридюкVestnik Chelyabinsk. Gos. Univ. , 1999:5 , 68–86
О некоторых псевдопараболических системах
уравнений с малым параметром, возникающих при численном
анализе уравнений жидкостей Кельвина–Фойгта А. П. ОсколковVestnik Chelyabinsk. Gos. Univ. , 1999:4 , 155–173
Решение задачи обтекания сферы вязкой жидкостью с оценкой погрешности В. М. БыковVestnik Chelyabinsk. Gos. Univ. , 1994:2 , 135–146
Медленные многообразия одного класса
полулинейных уравнений типа Соболева Г. А. Свиридюк, Т. Г. СукачеваVestnik Chelyabinsk. Gos. Univ. , 1991:1 , 3–19
Using modes of free oscillation of a rotating viscous fluid in the large-scale dinamo Г. М. ВодинчарVestnik KRAUNC. Fiz.-Mat. Nauki , 2013:2 , 33–42
On correlation of two solution classes of Navier–Stokes equation В. Б. ЛевенштамVladikavkaz. Mat. Zh. , 2010, 12 :3 , 56–66
On correlation of two solution classes for Navier–Stokes equations. II В. Б. ЛевенштамVladikavkaz. Mat. Zh. , 2012, 14 :4 , 52–62
Problem on a drift of a rigid body in a viscous fluid В. Н. СтаровойтовVestn. Novosib. Gos. Univ., Ser. Mat. Mekh. Inform. , 2006, 6 :2 , 88–102
Strong solutions of a nonlinear degenerate fractional order evolution equation М. В. ПлехановаSib. J. Pure and Appl. Math. , 2016, 16 :3 , 61–74
Weak and strong convergence of solutions to linearized equations of low compressible fluid Н. А. ГусевVestn. Samar. Gos. Tekhn. Univ., Ser. Fiz.-Mat. Nauki [J. Samara State Tech. Univ., Ser. Phys. Math. Sci.] , 2011, 1() , 47–52
Progective algorithm of boundary value problem for inhomogeneous Lame's equation В. Г. Лежнeв, А. Н. МарковскийVestn. Samar. Gos. Tekhn. Univ., Ser. Fiz.-Mat. Nauki [J. Samara State Tech. Univ., Ser. Phys. Math. Sci.] , 2011, 1() , 236–240
The eigenfunctions of curl, gradient of divergence and Stokes operators. Applications Р. С. СаксVestn. Samar. Gos. Tekhn. Univ., Ser. Fiz.-Mat. Nauki [J. Samara State Tech. Univ., Ser. Phys. Math. Sci.] , 2013, 2() , 131–146
On a mathematical model of non-isothermal creeping flows of a fluid through a given domain А. А. Домнич, Е. С. Барановский, М. А. АртёмовVestn. Samar. Gos. Tekhn. Univ., Ser. Fiz.-Mat. Nauki [J. Samara State Tech. Univ., Ser. Phys. Math. Sci.] , 2019 :3 , 417–429
Sobolev spaces and boundary-value problems for the curl and gradient-of-divergence operators Р. С. СаксVestn. Samar. Gos. Tekhn. Univ., Ser. Fiz.-Mat. Nauki [J. Samara State Tech. Univ., Ser. Phys. Math. Sci.] , 2020 :2 , 249–274
A set of Sobolev spaces and boundary-value problems for the curl and gradient-of-divergence operators Р. С. СаксVestn. Samar. Gos. Tekhn. Univ., Ser. Fiz.-Mat. Nauki [J. Samara State Tech. Univ., Ser. Phys. Math. Sci.] , 2023 :1 , 23–49
Modeling of axisymmetric viscous flows of incompressible fluid by the boundary element method В. А. Якутенок, М. А. Пономарева, А. Е. КузнецоваVestn. Tomsk. Gos. Univ. Mat. Mekh. , 2014:5 , 114–122
Non-Newtonian fluid flow in a lid-driven cavity at low Reynolds numbers М. А. Пономарева, М. П. Филина, В. А. ЯкутенокVestn. Tomsk. Gos. Univ. Mat. Mekh. , 2015:6 , 90–99
Circulatory high-viscosity non-Newtonian fluid flow in a single-screw extruder channel М. А. Пономарева, М. П. Филина, В. А. ЯкутенокVestn. Tomsk. Gos. Univ. Mat. Mekh. , 2016:2 , 97–107
On the solvability of the external Stokes problem И. В. ЗахароваVestnik TVGU. Ser. Prikl. Matem. [Herald of Tver State University. Ser. Appl. Math.] , 2016:1 , 75–92
On the dissipative properties of quasi–hydrodynamic equations in Stokes approximation В. В. Григорьева, Ю. В. ШеретовVestnik TVGU. Ser. Prikl. Matem. [Herald of Tver State University. Ser. Appl. Math.] , 2016:2 , 95–105
Inverse image of precompact sets and regular solutions to the Navier-Stokes equations A. A. Shlapunov, N. N. TarkhanovVestn. Udmurtsk. Univ. Mat. Mekh. Komp. Nauki , 2022, 32 :2 , 278–297
Finite-difference method for solving a multidimensional pseudoparabolic equation with boundary conditions of the third kind М. Х. БештоковVestn. Udmurtsk. Univ. Mat. Mekh. Komp. Nauki , 2022, 32 :4 , 502–527
The optimal control problem for the model of dynamics of weakly viscoelastic fluid Н. А. МанаковаVestn. Yuzhno-Ural. Gos. Un-ta. Ser. Matem. Mekh. Fiz. , 2015, 7 :3 , 22–29
Generalized model of incompressible viscoelastic fluid in the Earth's magnetic field А. О. КондюковVestn. Yuzhno-Ural. Gos. Un-ta. Ser. Matem. Mekh. Fiz. , 2016, 8 :3 , 13–21
Nonclassical equations of mathematical physics. Phase space of semilinear Sobolev type equations Н. А. Манакова, Г. А. СвиридюкVestn. Yuzhno-Ural. Gos. Un-ta. Ser. Matem. Mekh. Fiz. , 2016, 8 :3 , 31–51
The Initial-Finite Problems for Nonclassical Models of Mathematical Physics С. А. ЗагребинаVestnik YuUrGU. Ser. Mat. Model. Progr. , 2013, 6 :2 , 5–24
The Higher-Order Sobolev-Type Models А. А. ЗамышляеваVestnik YuUrGU. Ser. Mat. Model. Progr. , 2014, 7 :2 , 5–28
The thermoconvection problem for the linearizied model of the incompressible viscoelastic fluid of the nonzero order Т. Г. СукачеваVestnik YuUrGU. Ser. Mat. Model. Progr. , 2011:10 , 40–53
The initial-finish problem for the Navier–Stokes linear system С. А. ЗагребинаVestnik YuUrGU. Ser. Mat. Model. Progr. , 2011:7 , 35–39
The thermoconvection problem for the linearizied model of the incompressible viscoelastic fluid Т. Г. СукачеваVestnik YuUrGU. Ser. Mat. Model. Progr. , 2010:5 , 83–93
On a class of Sobolev-type equations T. G. Sukacheva, A. O. KondyukovVestnik YuUrGU. Ser. Mat. Model. Progr. , 2014, 7 :4 , 5–21
Three dimensional flux problem for the Navier–Stokes equations В. В. ПухначевVestnik YuUrGU. Ser. Mat. Model. Progr. , 2015, 8 :2 , 95–104
On the solution properties of boundary problem simulating thermocapillary flow В. К. АндреевVestnik YuUrGU. Ser. Mat. Model. Progr. , 2018, 11 :4 , 31–40
On a constraction of basises in spaces of solenoidal vector-valued fields О. А. ЛадыженскаяZap. Nauchn. Sem. POMI , 2003, 306 , 92–106
Non-uniqueness of the solution to the problem of a motion of a rigid body in a viscous incompressible fluid В. Н. СтаровойтовZap. Nauchn. Sem. POMI , 2003, 306 , 199–209
On some stationary problems of magnetohydrodynamics in multi-connected domains Ш. Сахаев, В. А. СолонниковZap. Nauchn. Sem. POMI , 2011, 397 , 126–149
Dynamical inverse problem for the Lame type system (the BC-method) В. Г. ФоменкоZap. Nauchn. Sem. POMI , 2014, 426 , 218–259
Dynamical inverse problem for the Lame type system (the BC-method) В. Г. ФоменкоZap. Nauchn. Sem. POMI , 2019, 483 , 243–268
Distribution of natural oscillations models in a plate imbedded into absolutely rigid half-space С. А. НазаровZap. Nauchn. Sem. POMI , 2023, 521 , 154–199
Numerical stability analysis of the Taylor–Couette flow in the two-dimensional case О. М. Белоцерковский, В. В. Денисенко, А. В. Конюхов, А. М. Опарин, О. В. Трошкин, В. М. ЧечеткинZh. Vychisl. Mat. Mat. Fiz. , 2009, 49 :4 , 754–768
Wavelet method for solving the unsteady porous-medium flow problem with discontinuous coefficients Э. М. Аббасов, О. А. Дышин, Б. А. СулеймановZh. Vychisl. Mat. Mat. Fiz. , 2008, 48 :12 , 2163–2179
Application of wavelet transforms to the solution of boundary value problems for linear parabolic equations Э. М. Аббасов, О. А. Дышин, Б. А. СулеймановZh. Vychisl. Mat. Mat. Fiz. , 2008, 48 :2 , 264–281
Numerical solution of the nonstationary Stokes system by methods of adjoint-equation theory and optimal control theory В. И. Агошков, Е. А. БотвиновскийZh. Vychisl. Mat. Mat. Fiz. , 2007, 47 :7 , 1192–1207
Numerical study of the basic stationary spherical couette flows at low Reynolds numbers Б. В. Пальцев, А. В. Ставцев, И. И. ЧечельZh. Vychisl. Mat. Mat. Fiz. , 2007, 47 :4 , 693–716
On the theory of periodic layers in incompressible fluid О. В. ТрошкинZh. Vychisl. Mat. Mat. Fiz. , 2007, 47 :4 , 738–744
Study of vortex breakdown in a stratified fluid С. П. КшевецкийZh. Vychisl. Mat. Mat. Fiz. , 2006, 46 :11 , 2081–2098
Second-order accurate method with splitting of boundary conditions for solving the stationary axially symmetric Navier–Stokes problem in spherical gaps Б. В. Пальцев, И. И. ЧечельZh. Vychisl. Mat. Mat. Fiz. , 2005, 45 :12 , 2232–2250
Investigation of an economical finite difference scheme for an unsteady viscous weakly compressible gas flow К. А. Жуков, А. В. ПоповZh. Vychisl. Mat. Mat. Fiz. , 2005, 45 :4 , 701–717
Three-dimensional numerical modeling of the inverse problem of thermal convection А. Т. Исмаил-заде, А. И. Короткий, Б. М. Наймарк, И. А. ЦепелевZh. Vychisl. Mat. Mat. Fiz. , 2003, 43 :4 , 614–626
The solvability of a boundary value problem for time-independent equations of heat and mass transfer under mixed boundary conditions Г. В. Алексеев, А. Б. Смышляев, Д. А. ТерешкоZh. Vychisl. Mat. Mat. Fiz. , 2003, 43 :1 , 66–80
A three-parameter method for solving the Navier–Stokes equations Ю. В. БыченковZh. Vychisl. Mat. Mat. Fiz. , 2002, 42 :9 , 1405–1412
A technique for computing incompressible flows В. Н. Котеров, А. С. Кочерова, В. М. КривцовZh. Vychisl. Mat. Mat. Fiz. , 2002, 42 :4 , 550–558
Numerical simulation of nonlinear internal gravity waves С. П. КшевецкийZh. Vychisl. Mat. Mat. Fiz. , 2001, 41 :12 , 1870–1885
Numerical simulation of three-dimensional viscous flows with gravitational and thermal effects А. Т. Исмаил-заде, А. И. Короткий, Б. М. Наймарк, И. А. ЦепелевZh. Vychisl. Mat. Mat. Fiz. , 2001, 41 :9 , 1399–1415
Asymptotics of solutions to the optimal control problem for time-indepentent Navier–Stokes equations А. А. ИлларионовZh. Vychisl. Mat. Mat. Fiz. , 2001, 41 :7 , 1045–1056
Problems in compressible fluid dynamics with a variable viscosity П. Н. Вабищевич, А. А. СамарскийZh. Vychisl. Mat. Mat. Fiz. , 2000, 40 :12 , 1813–1822
On the time-dependent Stokes problem Г. М. КобельковZh. Vychisl. Mat. Mat. Fiz. , 2000, 40 :12 , 1838–1841
Asymptotic expansion of the solution to the problem of vibrational convection В. Б. ЛевенштамZh. Vychisl. Mat. Mat. Fiz. , 2000, 40 :9 , 1416–1424
Electromagnetostatic operator, its spectral properties, and application to the problem of distribution of eddy currents И. А. ЧегисZh. Vychisl. Mat. Mat. Fiz. , 1998, 38 :12 , 2043–2054
Implementation of a three-dimensional hydrodynamic model for evolution of sedimentary basins А. Т. Исмаил-заде, А. И. Короткий, Б. М. Наймарк, А. П. Суетов, И. А. ЦепелевZh. Vychisl. Mat. Mat. Fiz. , 1998, 38 :7 , 1190–1203
On the unique solvability of an initial-boundary value problem in dynamics of exponentially stratified fluid А. В. ГлушкоZh. Vychisl. Mat. Mat. Fiz. , 1998, 38 :1 , 141–149
The asymptotic behavior of solutions to linearized Navier–Stokes equations В. Л. КамынинZh. Vychisl. Mat. Mat. Fiz. , 1997, 37 :8 , 958–967
An inverse problem of selecting a linearization coefficient for Navier–Stokes equations on the basis of integral overdetermination И. А. ВасинZh. Vychisl. Mat. Mat. Fiz. , 1996, 36 :4 , 86–96
An estimate for the boundaries of the spectrum of a difference operator for problems in quasistationary electrodynamics М. П. ГаланинZh. Vychisl. Mat. Mat. Fiz. , 1996, 36 :3 , 109–116
An initial and boundary value problem for the non-stationary heat-convection equations А. Г. ЗарубинZh. Vychisl. Mat. Mat. Fiz. , 1995, 35 :5 , 728–738
A theorem on the dissipation of energy and exact solutions of a system of quasi-hydrodynamic equations Ю. В. ШеретовZh. Vychisl. Mat. Mat. Fiz. , 1994, 34 :3 , 483–491
On an iterational method for the approximate solution of an initial- and boundary-value problem for the heat-convection equations А. Г. ЗарубинZh. Vychisl. Mat. Mat. Fiz. , 1993, 33 :8 , 1218–1227
An approach to the mathematical modelling of highly heterogeneous flows
of a viscous incompressible fluid В. Л. КамынинZh. Vychisl. Mat. Mat. Fiz. , 1993, 33 :5 , 726–742
On some inverse problems of the dynamics of a viscous incompressible fluid in the case of integral overdetermination И. А. ВасинZh. Vychisl. Mat. Mat. Fiz. , 1992, 32 :7 , 1071–1079
A method for designing algorithms to compute viscous incompressible flows Д. Б. Гуров, Т. Г. ЕлизароваZh. Vychisl. Mat. Mat. Fiz. , 1990, 30 :11 , 1719–1727
The solvability of the three-dimensional inverse problem for the non-linear Navier–Stokes equations И. А. Васин, А. И. ПрилепкоZh. Vychisl. Mat. Mat. Fiz. , 1990, 30 :10 , 1540–1552
Investigation of an equation of electrophysics В. В. Дякин, В. Я. РаевскийZh. Vychisl. Mat. Mat. Fiz. , 1990, 30 :2 , 291–297
Nonlocal overdetermined boundary value problem for stationary Navier–Stokes equations А. А. ИлларионовZh. Vychisl. Mat. Mat. Fiz. , 2008, 48 :6 , 1056–1061
Solution to the stationary problem of glacier dynamics М. Е. Боговский, Л. Мантелло, Х. Яшима-ФужитаZh. Vychisl. Mat. Mat. Fiz. , 2010, 50 :10 , 1827–1839
Additive schemes for certain operator-differential equations П. Н. ВабищевичZh. Vychisl. Mat. Mat. Fiz. , 2010, 50 :12 , 2144–2154
On the development of iterative methods with boundary condition splitting for solving boundary and
initial-boundary value problems for the linearized and nonlinear Navier–Stokes equations Б. В. Пальцев, М. Б. Соловьев, И. И. ЧечельZh. Vychisl. Mat. Mat. Fiz. , 2011, 51 :1 , 74–95
Projection and projection-difference methods for the solution of the Navier–Stokes equations П. В. Виноградова, А. Г. Зарубин, Ю. О. СуэтинаZh. Vychisl. Mat. Mat. Fiz. , 2011, 51 :5 , 898–912
On the structure of steady axisymmetric Navier-Stokes flows with a stream function having multiple local extrema in its definite-sign domains Б. В. Пальцев, М. Б. Соловьев, И. И. ЧечельZh. Vychisl. Mat. Mat. Fiz. , 2013, 53 :11 , 1869–1893
Nonlinear stability of a parabolic velocity profile in a plane periodic channel О. В. ТрошкинZh. Vychisl. Mat. Mat. Fiz. , 2013, 53 :11 , 1903–1922
On the development of a wake vortex in inviscid flow О. М. Белоцерковский, М. С. Белоцерковская, В. В. Денисенко, И. В. Ериклинцев, С. А. Козлов, Е. И. Опарина, О. В. Трошкин, С. В. ФортоваZh. Vychisl. Mat. Mat. Fiz. , 2014, 54 :1 , 164–169
On the eigenfunctions of the Stokes operator in a plane layer with a periodicity condition along it Б. В. ПальцевZh. Vychisl. Mat. Mat. Fiz. , 2014, 54 :2 , 286–297
Inverse problems for stationary Navier–Stokes systems А. Ю. ЧеботаревZh. Vychisl. Mat. Mat. Fiz. , 2014, 54 :3 , 519–528
On a problem in the dynamics of a thermoviscoelastic medium with memory В. П. Орлов, М. И. ПаршинZh. Vychisl. Mat. Mat. Fiz. , 2015, 55 :4 , 653–668
On the short-wave nature of Richtmyer–Meshkov instability М. С. Белоцерковская, О. М. Белоцерковский, В. В. Денисенко, И. В. Ериклинцев, С. А. Козлов, Е. И. Опарина, О. В. ТрошкинZh. Vychisl. Mat. Mat. Fiz. , 2016, 56 :6 , 1093–1103
On the stability of reverse flow vortices О. В. ТрошкинZh. Vychisl. Mat. Mat. Fiz. , 2016, 56 :12 , 2092–2097
Stability theory for a two-dimensional channel О. В. ТрошкинZh. Vychisl. Mat. Mat. Fiz. , 2017, 57 :8 , 1331–1346
Boundary element simulation of axisymmetric viscous creeping flows under gravity in free surface domains М. А. Пономарева, В. А. ЯкутенокZh. Vychisl. Mat. Mat. Fiz. , 2018, 58 :10 , 1675–1693
On regularity of weak solutions to a generalized Voigt model of viscoelasticity В. Г. Звягин, В. П. ОрловZh. Vychisl. Mat. Mat. Fiz. , 2020, 60 :11 , 1933–1949
Vortex phantoms in the stationary Kochin–Yudovich flow problem О. В. ТрошкинZh. Vychisl. Mat. Mat. Fiz. , 2021, 61 :4 , 684–688