We consider a Steklov spectral problem for an elliptic differential equation with rapidly oscillating coefficients for thin perforated domains with rapidly varying thickness. We describe asymptotic algorithms for the solution of problems of this kind for thin perforated domains with different limit dimensions. We also establish asymptotic estimates for eigenvalues of the Steklov spectral problem for thin perforated domains with different limit dimensions. For certain symmetry conditions imposed on the structure of thin perforated domain and on the coefficients of differential operators, we construct and substantiate asymptotic expansions for eigenfunctions and eigenvalues.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
N. S. Bakhvalov and G. P. Panasenko, Averaging of the Processes in Periodic Media [in Russian], Moscow, Nauka (1984).
A. B. Vasil’eva, and V. F. Butuzov, Asymptotic Methods in the Theory of Singular Perturbations [in Russian], Vysshaya Shkola, Moscow (1990).
M. I. Vishik and L. A. Lyusternik, “Regular degeneration and boundary layer for linear differential equations with parameter,” Usp. Mat. Nauk, 12, No. 5, 3–192 (1957).
A. L. Gol’denveizer, “Construction of an approximate theory of bending of a plate by the method of asymptotic integration of equations of the theory of elasticity,” Prikl. Mat. Mekh., 26, No. 4, 668–686 (1962).
A. L. Gol’denveizer, Theory of Elastic Thin Shells [in Russian], Nauka, Moscow (1976).
M. G. Dzhavadov, “Asymptotics of the solution of a boundary-value problem for elliptic equations of the second order in thin domains,” Differents. Uravn., 4, No. 10, 1901–1909 (1968).
A. G. Kolpakov, “Determining equations of a thin elastic stressed beam with periodic structure,” Prikl. Mat. Mekh., 63, Issue 3, 513–523 (1999).
S. N. Leora, S. A. Nazarov, and A. V. Proskura, “Derivation of limit equations for elliptic problems in thin domains with the help of computers,” Zh. Vychisl. Mat. Mat. Fiz., 26, No. 7, 1032–1048 (1986).
T. A. Mel’nyk, “Averaging of elliptic equations that describe processes in strongly inhomogeneous thin perforated domains with rapidly varying thickness,” Dop. Akad. Nauk Ukr., No. 10, 15–19 (1991).
T. A. Mel’nik, “Asymptotic expansions of the eigenvalues and eigenfunctions of elliptic boundary-value problems with rapidly oscillating coefficients in a perforated cube,” in: Proc. of the Pertovskii Seminar [in Russian], Issue 17 (1994), pp. 51–88.
T. A. Mel’nik and A. V. Popov, “Asymptotic analysis of boundary-value and spectral problems in thin perforated domains with rapidly varying thickness and different limit dimensions,” Mat. Sb., 203, No. 8, 97–124 (2012).
S. A. Nazarov, Asymptotic Analysis of Thin Plates and Rods [in Russian], Vol. 1, Nauchnaya Kniga, Novosibirsk (2002).
S. A. Nazarov, “General scheme of averaging of self-adjoint elliptic systems in multidimensional domains including thin domains,” Algebra Analiz, 7, No. 5, 1–92 (1995).
S. A. Nazarov, “Structure of solutions of the boundary-value problems for elliptic equations in thin domains,” Vestn. Leningrad. Univ., Ser. Mat., Mekh. Astronom., Issue 2, 65–68 (1982).
O. A. Oleinik, G. A. Iosif’yan, and A. S. Shamaev, Mathematical Problems of the Theory of Strongly Inhomogeneous Elastic Media [in Russian], Moscow University, Moscow (1990).
G. P. Panasenko and M. V. Reztsov, “Averaging of the three-dimensional problem of the theory of elasticity in an inhomogeneous plate,” Dokl. Akad. Nauk SSSR, 294, No. 5, 1061–1065 (1987).
D. Caillerie, “Thin elastic and periodic plates,” Math. Methods Appl. Sci., 6, 159–191 (1984).
G. A. Chechkin and E. A. Pichugina, “Weighted Korn’s inequality for a thin plate with rough surface,” Rus. J. Math. Phys., 7, No. 3, 375–383 (2000).
P. Ciarlet and S. Kesavan, “Two-dimensional approximations of three-dimensional eigenvalue problem in plate theory,” Comput. Methods Appl. Mech. Eng., 26, 145–172 (1981).
R. V. Korn and M. Vogelius, “A new model for thin plates with rapidly varying thickness. II: A convergence proof,” Quart. Appl. Math., 18, No. 1, 1–22 (1985).
T. Lewinsky and J. Telega, Plates, Laminates, and Shells, World Scientific, Singapore (2000).
T. A. Mel’nyk and A. V. Popov, “Asymptotic analysis of the Dirichlet spectral problems in thin perforated domains with rapidly varying thickness and different limit dimensions,” in: Mathematics and Life Sciences, De Gruyter, Berlin (2012), pp. 89–109.
Author information
Authors and Affiliations
Corresponding author
Additional information
Translated from Neliniini Kolyvannya, Vol. 19, No. 2, pp. 253–275, April–June, 2016.
Rights and permissions
About this article
Cite this article
Popov, A.V. Asymptotic Expansions of Eigenfunctions and Eigenvalues of the Steklov Spectral Problem in Thin Perforated Domains with Rapidly Varying Thickness and Different Limit Dimensions. J Math Sci 223, 311–336 (2017). https://doi.org/10.1007/s10958-017-3358-8
Received:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s10958-017-3358-8