Мiшана задача для iнтегро-диференцiальних систем Бусiнеска-Стокса
DOI: http://dx.doi.org/10.30970/vmm.2025.97.103-113
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R. Temam, Navier-Stokes equations: theory and numerical analysis, North-Holland Publ., Amsterdam, New York, Oxford, 1979.
J. Simon, Nonhomogeneous viscous incompressible fluids: existence of velocity, density and preassure, SIAM J. Math. Anal., 21 (1990), no.5, 1093–1117.
J.A. Langa, Real J., Simon J., Existence and regularity of the pressure for the stochastic Navier-Stokes equations, Applied Mathematics and Optimization, 48 (2003), no.3, 195–210.
O.M. Buhrii, Visco-plastic, newtonian, and dilatant fluids: Stokes equations with variable exponent of nonlinearity, Mat. Stud., 49 (2018), no.2, 165–180.
O. Buhrii, N. Buhrii, Nonlocal in time problem for anisotropic parabolic equations with variable exponents of nonlinearities, J. Math. Anal. Appl., 473 (2019), 695–711.
M. Bokalo, O. Buhrii, N. Hryadil, Initial-boundary value problems for nonlinear elliptic- parabolic equations with variable exponents of nonlinearity in unbounded domains without conditions at infinity, Nonl. Anal., 192 (2020), https://doi.org/10.1016/j.na.2019.111700.
J.R. Cannon, E. DiBenedetto, The initial value problem for the Boussinesq equations wi- th data in Lp, In Approximation Methods for Navier-Stokes Problems: Proceedings of the Symposium Held by the International Union of Theoretical and Applied Mechanics (IUTAM) at the University of Paderborn, Berlin, Heidelberg, 1979: Springer, 129–144.
C. Conca, M.A. Rojas-Medar, The initial value problem for the Boussinesq equations in a time-dependent domain, Technical report, Universidad de Chile, (1993), 1–16.
O. Buhrii, M. Khoma On initial-boundary value problem for nonlinear integro-differential Stokes system, Visnyk (Herald) of Lviv Univ. Series Mech.-Math., 85 (2018), 107–119.
M.V. Khoma, O.M. Buhrii, Stokes system with variable exponents of nonlinearity // Bukovi- nian Mathematical Journal, 10 (2022), no.2, 28–42.
O. Kovacik, J. Rakosnık, On spaces Lp(x) and W 1,p(x), Czechoslovak Math. J., 41, (1991) no.116, 592–618.
W. Orlicz, Uber Konjugierte Exponentenfolgen, Studia Mathematica, 3 (1931), 200–211.
S. Antontsev, S. Shmarev, Evolution PDEs with nonstandard growth conditions. Existence, uniqueness, localization, blow-up, Atlantis Studies in Diff. Eq., V.4, Paris: Atlantis Press, 2015.
L. Diening, P. Harjulehto, P. H¨asto¨, M. Ru˙ ˇziˇcka, Lebesgue and Sobolev spaces with variable exponents, Springer, Heidelberg, 2011.
X.-L. Fan, D. Zhao, On the spaces Lp(x)(Ω) and W m,p(x)(Ω), J. Math. Anal. Appl., 263
(2001), 424–446.
Kaltenbach, Pseudo-monotone operator theory for unsteady problems with variable exponents, Lecture Notes in Mathematics, V.2329, Springer Nature Switzerland AG, 2023.
G.P. Galdi, An introduction to the Navier-Stokes initial-boundary value problem, Funda- mental directions in mathematical fluid mechanics, Basel: Birkhauser Basel, 2000.
H. Sohr, The Navier-Stokes equations: an elementary functional analytic approach, Boston, Basel, Berlin: Birkhauser, 2001.
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