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Applicable Analysis
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Volume 99, 2020 - Issue 9
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Articles

On homogenization of the first initial-boundary value problem for periodic hyperbolic systems

Yu. M. MeshkovaChebyshev Laboratory, St. Petersburg State University, St. Petersburg, RussiaCorrespondence[email protected]
ORCID Iconhttps://orcid.org/0000-0002-1045-3332View further author information
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Pages 1528-1563 | Received 07 Jul 2018, Accepted 21 Oct 2018, Published online: 09 Nov 2018

References

  • Bakhvalov NS, Panasenko GP. Homogenization: averaging processes in periodic media. Mathematical problems in mechanics of composite materials. Vol. 36. Dordrecht: Kluwer Acad. Publ. Group; 1989. Math. Appl. (Soviet Ser).
  • Bensoussan A, Lions J-L, Papanicolaou G. Asymptotic analysis for periodic structures, corrected reprint of the 1978 original. Providence: AMS Chelsea Publishing; 2011.
  • Sanchez-Palencia E. Non-homogeneous media and vibration theory. Lecture notes in physics. Berlin: Springer-Verlag; 1980.
  • Zhikov VV, Kozlov SM, Oleĭnik OA. Homogenization of differential operators. Berlin: Springer-Verlag; 1994.
  • Brahim-Otsmane S, Francfort GA, Murat F. Correctors for the homogenization of the wave and heat equations. J Math Pures Appl. 1992;71:197–231.
  • Birman MS, Suslina TA. Second order periodic differential operators. Threshold properties and homogenization. Algebra I Analiz. 2003;15(5):1–108. English transl St. Petersburg Math J. 2004;15(5):639–714.
  • MS Birman, TA Suslina. Homogenization with corrector term for periodic differential operators. Approximation of solutions in the Sobolev class H1(Rd). Algebra I Analiz. 2006;18(6):1–130. English Transl St. Petersburg Math J. 2007;18(6):857–955.
  • Suslina TA. Homogenization in the Sobolev class H1(Rd) for second order periodic elliptic operators with the inclusion of first order terms. Algebra I Analiz. 2010;22(1):108–222. English Transl St. Petersburg Math J. 2011;22(1):81–162.
  • Zhikov VV. On the operator estimates in the homogenization theory. Dokl Ros Akad Nauk. 2005;403(3):305–308. English Transl Dokl Math. 2005;72:535–538.
  • Zhikov VV, Pastukhova SE. On operator estimates for some problems in homogenization theory. Russ J Math Phys. 2005;12(4):515–524.
  • Zhikov VV, Pastukhova SE. Operator estimates in homogenization theory. Uspekhi Matem. Nauk. 2016;71 (429)(3):27–122. English Transl Russian Math Surveys. 2016;71(3):417–511. doi: 10.4213/rm9710
  • Griso G. Error estimate and unfolding for periodic homogenization. Asymptot Anal. 2004;40(3/4):269–286.
  • Griso G. Interior error estimate for periodic homogenization. Anal Appl. 2006;4(1):61–79. doi: 10.1142/S021953050600070X
  • Kenig CE, Lin F, Shen Z. Convergence rates in L2 for elliptic homogenization problems. Arch Rat Mech Anal. 2012;203(3):1009–1036. doi: 10.1007/s00205-011-0469-0
  • Pakhnin MA, Suslina TA. Operator error estimates for homogenization of the elliptic Dirichlet problem in a bounded domain. Algebra I Analiz. 2012;24(6):139–177. English Transl St. Petersburg Math J. 2013;24(6):949–976.
  • Suslina TA. Homogenization of the Dirichlet problem for elliptic systems: L2-operator error estimates. Mathematika. 2013;59(2):463–476. doi: 10.1112/S0025579312001131
  • Suslina TA. Homogenization of the Neumann problem for elliptic systems with periodic coefficients. SIAM J Math Anal. 2013;45(6):3453–3493. doi: 10.1137/120901921
  • Meshkova YM, Suslina TA. Homogenization of the Dirichlet problem for elliptic systems: two-parametric error estimates. arXiv:1702.00550v4; 2017.
  • Xu Q. Convergence rates for general elliptic homogenization problems in Lipschitz domains. SIAM J Math Anal. 2016;48(6):3742–3788. doi: 10.1137/15M1053335
  • Suslina TA. On homogenization of periodic parabolic systems. Funktsional Analiz I Ego Prilozhen. 2004;38(4):86–90. English Transl Funct Anal Appl. 2004;38(4):309–312. doi: 10.4213/faa130
  • Suslina TA. Homogenization of a periodic parabolic Cauchy problem in the Sobolev space H1(Rd). Math Model Nat Phenom. 2010;5(4):390–447. doi: 10.1051/mmnp/20105416
  • Zhikov VV, Pastukhova SE. Estimates of homogenization for a parabolic equation with periodic coefficients. Russ J Math Phys. 2006;13(2):224–237. doi: 10.1134/S1061920806020087
  • Meshkova YM. Homogenization of the Cauchy problem for parabolic systems with periodic coefficients. Algebra I Analiz. 2013;25(6):125–177. English Transl St. Petersburg Math J. 2014;25(6):981–1019.
  • Meshkova YM, Suslina TA. Homogenization of initial boundary value problems for parabolic systems with periodic coefficients. Appl Anal. 2016;95(8):1736–1775. doi: 10.1080/00036811.2015.1068300
  • Meshkova YM, Suslina TA. Homogenization of the first initial boundary-value problem for parabolic systems: operator error estimates. Algebra I Analiz. 2017;29(6):99–158. English Transl St. Petersburg Math J. 2018;29(6):to appear. See arXiv:1801.05035 (2018).
  • Chill R, ter Elst AFM. Weak and strong approximation of semigroups on Hilbert spaces. Integr Equ Oper Theory. 2018;90(9):1–22.
  • Birman MS, Suslina TA. Operator error estimates in the homogenization problem for nonstationary periodic equations. Algebra I Analiz. 2008;20(6):30–107. English Transl St. Petersburg Math J. 2009;20(6):873–928.
  • Dorodnyi MA, Suslina TA. Spectral approach to homogenization of hyperbolic equations with periodic coefficients. J Differ Equ. 2018;264(12):7463–7522. doi: 10.1016/j.jde.2018.02.023
  • Meshkova Y. On operator error estimates for homogenization of hyperbolic systems with periodic coefficients. arXiv:1705.02531; 2017.
  • Brassart M, Lenczner M. A two scale model for the periodic homogenization of the wave equation. J Math Pures Appl. 2010;93(5):474–517. doi: 10.1016/j.matpur.2010.01.002
  • Casado-Diaz J, Couce-Calvo J, Maestre F, et al. Homogenization and correctors for the wave equation with periodic coefficients. Math Models Methods Appl Sci. 2014;24:1343–1388. doi: 10.1142/S0218202514500031
  • Allaire G, Briane M, Vanninathan M. A comparison between two-scale asymptotic expansions and Bloch wave expansions for the homogenization of periodic structures. SeMA J. 2016;73(3):237–259. doi: 10.1007/s40324-016-0067-z
  • Conca C, Orive R, Vanninathan M. On Burnett coefficients in periodic media. J Math Phys. 2006;47(3):032902. doi: 10.1063/1.2179048
  • Conca C, SanMartin J, Balilescu L, Vanninathan M. Optimal bounds on dispersion coefficient in one-dimensional periodic media. Math Models Methods Appl Sci. 2009;19(9):1743–1764. doi: 10.1142/S0218202509003930
  • Cooper S, Savostianov A. Homogenisation with error estimates of attractors for damped semi-linear anisotropic wave equations. arXiv:1804.09947; 2018.
  • Pastukhova SE. On the convergence of hyperbolic semigroups in variable Hilbert spaces. Tr Seminara Im I G Petrovskogo. 2004;24:216–241. English Transl J Math Sci. 2005;127(5):2263–2283.
  • Zhikov VV, Pastukhova SE. On the Trotter-Kato theorem in a variable space. Funktsional Anal I Prilozhen. 2007;41(4):22–29. English Transl Funct Anal Appl. 2007;41(4):264–270. doi: 10.4213/faa2876
  • Birman MS, Suslina TA. Homogenization with corrector term for periodic elliptic differential operators. Algebra I Analiz. 2005;17(6):1–104. English Transl St. Petersburg Math J. 2006;17(6):897–973.
  • McLean W. Strongly elliptic systems and boundary integral equations. Cambridge: Cambridge Univ. Press; 2000.
  • Kondrat'ev VA, Eidel'man SD. About conditions on boundary surface in the theory of elliptic boundary value problems. Dokl Akad Nauk SSSR. 1979;246(4):812–815. English Transl Soviet Math Dokl. 1979;20:261–263.
  • Maz'ya VG, Shaposhnikova TO. Theory of multipliers in spaces of differentiable functions, Vol. 23. NY: Brookling; 1985. Monographs and studies in mathematica.
  • Meshkova YM, Suslina TA. Homogenization of the Dirichlet problem for elliptic and parabolic systems with periodic coefficients. Funktsional. Anal. I Prilozhen. 2017;51(3):87–93. English Transl Funct Anal Appl. 2017;51(3):230–235. doi: 10.4213/faa3492
  • Stein EM. Singular integrals and differentiability properties of functions. Princeton: Princeton University Press; 1970.
  • Rychkov VS. On restrictions and extensions of the Besov and Triebel–Lizorkin spaces with respect to Lipschitz domains. J Lond Math Soc. 1999;60:237–257. doi: 10.1112/S0024610799007723
  • Vilenkin NY, Krein SG. Functional Analysis. Groningen: Wolters-Noordhoff Publishing; 1972.
  • Ladyzhenskaya OA, Ural'tseva NN. Linear and quasilinear elliptic equations. New York – London: Acad Press; 1968.
  • Meshkova YM, Suslina TA. Two-parametric error estimates in homogenization of second order elliptic systems in Rd. Appl Anal. 2016;95(7):1413–1448. doi: 10.1080/00036811.2015.1122758
  • Gradshteyn IS, Ryzhik IM. Table of integrals, series, and products. In: Jeffrey A, Zwillinger D, editors. 7th ed. Burlington: Elsevier; 2007. p. 1108–1117.

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