Abstract
We study the asymptotic behavior of solutions and eigenelements of boundary-value problems with rapidly alternating type of boundary conditions in the domain \(\Omega \subset \mathbb{R}^n \). The density, which depends on a small parameter ɛ, is of the order of O(1) outside small inclusions, where the density is of the order of \(O((\varepsilon \delta )^{ - m} )\). These domains, i.e., concentrated masses of diameter \(O(\varepsilon \delta )\), are located near the boundary at distances of the order of \(O(\delta )\) from each other, where \(\delta = \delta (\varepsilon ) \to 0\). We pose the Dirichlet condition (respectively, the Neumann condition) on the parts of the boundary \(\partial \Omega \) that are tangent (respectively, lying outside) the concentrated masses. We estimate the deviations of the solutions of the limit (averaged) problems from the solutions of the original problems in the norm of the Sobolev space \(W_2^1 \) for \(m < 2\).
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REFERENCES
A. N. Krylov, “On some di.erential equations of mathematical physics used in technical problems,” Annals of Nikolaev Nautical Academy [in Russian ] (1913), no.2., 325–348.
A. N. Tikhonov and A. A. Samarskii, Equations of Mathematical Physics [in Russian], Nauka, Moscow, 1972.
E. Sanchez-Palencia, “Perturbation of eigenvalues in thermoelasticity and vibration f a system with concentrated masses,” in:Trends and Application of Pure Math.to Mechanics, Lecture Notes in Physics, vol. 195, Springer-Verlag, Berlin, 1984, pp. 346–368.
O. A. Oleinik, Lectures on Partial Differential Equations [in Russian ], Moskov.Gos.Univ., Moscow, 1976.
O. A. Oleinik, “On natural vibrations of b dies with concentrated masses,” in:Modern Problems of Applied Mathematics and Mathematical Physics [in Russian ], Nauka, Moscow, 1988, pp.101–128.
O. A. Oleinik, “On the spectra f some singularly perturbed operators,” Uspekhi Mat.Nauk [Russian Math.Surveys ], 42 (1987), no. 3, 221–222.
O. A. Oleinik, “Homogenization problems in elasticity.Spectrum of singularly perturbed operators,” in:Lecture Notes Series,vol. 122, Cambridge University Press, Cambridge, 1987, pp.188–205.
O. A. Oleinik, “On frequencies of natural vibrations of b dies with concentrated masses,” in:Functional and Numerical Methods of Mathematical Physics [in Russian ], Naukova Dumka, Kiev, 1988, pp.165–171.
Yu. D. Golovatyi, Spectral Properties of Vibrating Systems with Additional Masses [in Russian], Cand. Sci.(Phys.–Math.)Dissertation, Moskov.Gos.Univ., Moscow, 1988.
Yu. D. Golovatyi, S. A. Nazarov, O. A. Oleinik, and T. S. Soboleva, “On natural vibrations of a string with an additional mass,” Sibirsk.Mat.Zh. [Siberian Math.J.], 29 (1988), no. 5, 71–91.
O. A. Oleinik and T. S. Soboleva, “On natural vibrations of an inhomogeneous string with nitely many additional masses,” UsekhiMat.Nauk [Russian Math.Surveys ], 43 (1988), no. 4, 187–188.
Yu. D. Golovatyi, “On natural vibrations and natural frequencies of an elastic rod with an additional mass,” UsekhiMat.Nauk [Russian Math.Surveys ], 43 (1988), no. 4, 173–174.
Yu. D. Golovatyi, “On natural vibrations and natural frequencies of a xed plate with an additional mass,” UsekhiMat.Nauk [Russian Math.Surveys ], 43 (1988), no. 5, 185–186.
Yu. D. Golovatyi, “The Neumann spectral problem for the Laplace operator with singularly perturbed density,” UsekhiMat.Nauk [Russian Math.Surveys ], 45 (1990), no. 4, 147–148.
S. A. Nazarov, “On a Sanchez-Palencia problem with Neumann b undary conditions,” Izv.Vyssh. Uchebn.Zaved.Mat. [Soviet Math.(Iz.VUZ )] (1989), no. 11, 60–66.
N. U. Rakhmanov, On Natural Vibrations of Systems with Concentrated Masses [in Russian], Cand. Sci.(Phys.–Math.)Dissertation, Moskov.Gos.Univ., Moscow, 1991.
Yu. D. Golovatyi, S. A. Nazarov, and O. A. Oleinik, “Asymptotics of eigenvalues and eigenfunctions in problems of vibrations of a medium with singularly perturbed density,”Uspekhi Mat.Nauk [Russian Math.Surveys], 43 (1988), no. 5, 189–190.
Yu. D. Golovatyi, S. A. Nazarov, and O. A. Oleinik, “Asymptotic expansions f eigenvalues and eigenfunctions in problems of vibrations of a medium with concentrated perturbations,” Trudy Mat. Inst.Steklov [Proc.Steklov Inst.Math.], 192 (1990), 42–60.
É. Sanchez-Palensia and H. Tchatat, “Vibration de systèmes 'elastiques avec des masses concentrées,” Rend.Sem.Mat.Univ.e Politecnico di Torino,42 (1984), no. 3, 43–63.
C. Leal and J. Sanchez-Hubert, “Perturbation of the eigenvalue of a membrane with a concentrated mass,” Quart.Appl.Math., 47 (1989), no.1, 93–103.
M. Lob and E. Pérez, “Asymptotic behavior of the vibrations of a b dy having many concentrated masses near the b undary,”C.R.Acad.Sci.Paris.Sér.II, 314 (1992), 13–18.
M. Lob and E. Pérez, “On vibrations of a b dy with many concentrated masses near the b undary,” Math.Models and Methods in Appl.Sci., 3 (1993), no.2, 249–273.
M. Lob and E. Pérez, “Vibrations of a b dy with many concentrated masses near the boundary:high frequency vibrations,” in:Spectral Analysis of Complex Structures, Hermann, Paris, 1995,pp. 85–101.
M. Lob and E. Pérez, “Vibrations of a membrane with many concentrated masses near the b undary,” Math.Models and Methods in Appl.Sci., 5 (1995), no.5, 565–585.
M. Lob and E. Pérez, “High frequency vibrations in a sti.problem,”Math.Models and Methods in Appl.Sci.,7 (1997), no. 2, 291–311.
M. Lob and E. Pérez, “A skin e.ect for systems with many concentrated masses,” C.R.Acad.Sci. Paris.Sér.Iib, 327 (1999), 771–776.
D. Gómez, M. Lobo, and E. Pérez, “On the eigenfunctions associated with the high frequencies in systems with a concentrated mass,” J.Math.Pures Appl., 78 (1999), 841–865.
M. Lob and E. Pérez, “The skin e.ect in vibrating systems with many concentrated masses,” Math. Methods Appl.Sci., 24 (2001), no.1, 59–80.
O. A. Oleinik, J. Sanchez-Hubert, and G. A. Yosifan, “On vibration f a membrane with concentrated masses,” Bull.Sci.Math., 115 (1991), no.1, 1–27.
J. Sanchez-Hubert and É. Sanchez-Palencia, Vibration and Coupling of Continuous System.Asymptotic Methods,Springer-Verlag, Berlin–Heidelberg,1989.
J. Sanchez-Hubert, “Perturbation des valeurs propres pour des systèmes avec masse concentrée,” C.R. Acad.Sci.Paris Ser.II Mec.Phys.Chim.Sci.Univers Sci.Terre, 309 (1989), no. 6, 507–510.
E. I. Doronina and G. A. Chechkin, “On natural vibrations of a b dy with many nonperiodically located concentrated masses,” Trudy Mat.Inst.Steklov [Proc.Steklov Inst.Math.], 236 (2002), 158–166.
V. Rybalko, “Vibration f elastic systems with a large number of tiny heavy inclusions,” Asymptotic Analysis, 32 (2002), no. 1, 27–62.
M. E. Peres, G. A. Chechkin, and E. I. Yablokova (Doronina), “On natural vibrations of a b dy with “light ”concentrated masses n the surface,” Uspekhi Mat.Nauk [Russian Math.Surveys], 57 (2002), no. 6, 195–196.
G. A. Chechkin, “On vibrations of b dies with concentrated masses l cated on the boundary,” Uspekhi Mat.Nauk [Russian Math.Surveys], 50 (1995), no. 4, 105–106.
G. A. Chechkin, “Averaging of b undary-value problems with singular perturbation of b undary conditions,” Mat.Sb. [Russian Acad.Sci.Sb.Math.], 184 (1993), no. 6, 99–150.
K. Iosida, Functional Analysis, Springer-Verlag, New York, 1965.
R. R. Gadyloshin and G. A. Chechkin, “Boundary-value problem for the Laplacian with rapidly alternating type f boundary conditions in a multidimensional domain,” Sibirsk.Mat.Zh. [Siberian Math.J.], 40 (1999), no. 2, 271–287.
V. A. Kondratiev and O. A. Oleinik, “On the near-in nity asymptotics of solutions with nite Dirichlet integral for second-order elliptic equations,” in:Trudy Sem.Petrovsk. [in Russian], vol. 12, Moskov. Gos.Univ., Moscow, 1987, pp.149–163.
V. A. Kondratiev and O. A. Oleinik, “Asymptotic properties of an elasticity system,”in: Proceedings of the International Conference “Application of Multiple Scaling in Mechanics,”Masson,Paris,1987, pp.188–205.
O. A. Oleinik, G. A. Iosif'yan, and A. S. Shamaev, Mathematical Problems in the Theory of Strongly Inhomogeneous Elastic Media [in Russian ], Moskov.Gos.Univ., Moscow, 1990.
O. A. Oleinik and G. A. Chechkin, “On b undary-value problems for elliptic equations with rapidly alternating type f boundary conditions,” UsekhiMat.Nauk [Russian Math.Surveys], 48 (1993), no. 6, 163–164.
O. A. Oleinik and G. A. Chechkin, On Asymptotics of Solutions and Eigenvalues of an Elliptic Problem with Rapidly Alternating Type of Boundary Conditions,International Center for Theoretical Physics, SMR 719/4,Trieste, 1993.
O. A. Oleinik and G. A. Chechkin, “On a problem f boundary averaging for an elasticity system,” UsekhiMat.Nauk [Russian Math.Surveys], 49 (1994), no. 4, 114.
O. A. Oleinik and G. A. Chechkin, “Solutions and eigenvalues of the boundary value problems with rapidly alternating boundary conditions for the system of elasticity.,” Rend.Lincei Math.Appl.(9), 7 (1996), no. 1, 5–15.
S. Agmon, A. Douglis, and L. Nirenberg, Estimates near the Boundary for Solutions of Elliptic Partial Differential Equations Satisfying General Boundary Conditions,New York, 1959.
O. A. Ladyzhenskaya, Boundary-Value Problems in Mathematical Physics [in Russian ], Nauka, Moscow, 1973.
S. L. Sobolev, Some Applications of Functional Analysis in Mathematical Physics [in Russian], Nauka, Moscow, 1988.
S. L. Sobolev, Selected Problems of the Theory of Function Spaces and Generalized Functions [in Russian ], Nauka, Moscow, 1989.
G. A. Chechkin, M. E. Pérez, and E. I. Yablokova, “On eigenvibrations of a b dy with many “light ”con-centrated masses l cated nonperiodically along the b undary,”in:Preprint of Universidad de Cantabria Núm.1/2002 Santander, Abril 2002.
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Chechkin, G.A. Estimation of Solutions of Boundary-Value Problems in Domains with Concentrated Masses Located Periodically along the Boundary: Case of Light Masses. Mathematical Notes 76, 865–879 (2004). https://doi.org/10.1023/B:MATN.0000049687.89273.d9
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DOI: https://doi.org/10.1023/B:MATN.0000049687.89273.d9