St. Petersburg Mathematical Journal

This journal is a cover-to-cover translation into English of Algebra i Analiz, published six times a year by the mathematics section of the Russian Academy of Sciences.

ISSN 1547-7371 (online) ISSN 1061-0022 (print)

The 2024 MCQ for St. Petersburg Mathematical Journal is 0.68.

What is MCQ? The Mathematical Citation Quotient (MCQ) measures journal impact by looking at citations over a five-year period. Subscribers to MathSciNet may click through for more detailed information.

 

Homogenization of Kirchhoff plates joined by rivets which are modeled by the Sobolev point conditions
HTML articles powered by AMS MathViewer

by S. A. Nazarov
Translated by: E. Peller
St. Petersburg Math. J. 32 (2021), 307-348
DOI: https://doi.org/10.1090/spmj/1649
Published electronically: March 2, 2021
PDF | Request permission

Abstract:

Two Kirchhoff plates, which are described by Neumann problems for biharmonic equations, overlap along a thin strip. In the interior of the strip, the plates are connected by rivets, which are modeled by the Sobolev point transmission conditions. By taking the boundary layer phenomenon into account, homogenization with respect to a small parameter (the relative period of the distribution of rivets) is done, and transmission conditions are obtained on the common edge of two touching plates (in the limiting case, overlapping disappears). Differences are found between a single row and multiple row riveting that appear in different types of limiting transmission conditions, and the reasons are shown for the preference of double row riveting in practical engineering. Several related unsolved problems are formulated.
References
  • S. G. Mikhlin, Variational methods in mathematical physics, A Pergamon Press Book, The Macmillan Company, New York, 1964. Translated by T. Boddington; editorial introduction by L. I. G. Chambers. MR 0172493
  • M. Š. Birman, On Trefftz’s variational method for the equation $\Delta ^2u=f$, Dokl. Akad. Nauk SSSR (N.S.) 101 (1955), 201–204 (Russian). MR 0070831
  • G. Buttazzo and S. A. Nazarov, An optimization problem for the biharmonic equation with Sobolev conditions, J. Math. Sci. (N.Y.) 176 (2011), no. 6, 786–796. Problems in mathematical analysis. No. 58. MR 2838975, DOI 10.1007/s10958-011-0436-1
  • G. Buttazzo, G. Cardone, and S. A. Nazarov, Thin elastic plates supported over small areas. II: Variational-asymptotic models, J. Convex Anal. 24 (2017), no. 3, 819–855. MR 3684804
  • O. A. Ladyzhenskaya, The boundary value problems of mathematical physics, Applied Mathematical Sciences, vol. 49, Springer-Verlag, New York, 1985. Translated from the Russian by Jack Lohwater [Arthur J. Lohwater]. MR 793735, DOI 10.1007/978-1-4757-4317-3
  • V. I. Anuryev, Corstructor-mechanical engineer handbook. Vol. III, Mashinostroenie, Moscow, 2001. (Russian)
  • S. A. Nazarov, Self-adjoint elliptic boundary-value problems. The polynomial property and formally positive operators, J. Math. Sci. (New York) 92 (1998), no. 6, 4338–4353. Some questions of mathematical physics and function theory. MR 1668418, DOI 10.1007/BF02433440
  • S. A. Nazarov, Polynomial property of selfadjoint elliptic boundary value problems, and the algebraic description of their attributes, Uspekhi Mat. Nauk 54 (1999), no. 5(329), 77–142 (Russian); English transl., Russian Math. Surveys 54 (1999), no. 5, 947–1014. MR 1741662, DOI 10.1070/rm1999v054n05ABEH000204
  • Milton Van Dyke, Perturbation methods in fluid mechanics, Applied Mathematics and Mechanics, Vol. 8, Academic Press, New York-London, 1964. MR 0176702
  • A. M. Il′in, Soglasovanie asimptoticheskikh razlozheniĭ resheniĭ kraevykh zadach, “Nauka”, Moscow, 1989 (Russian). With an English summary. MR 1007834
  • J.-L. Lions and E. Magenes, Problèmes aux limites non homogènes et applications. Vol. 1, Travaux et Recherches Mathématiques, No. 17, Dunod, Paris, 1968 (French). MR 0247243
  • V. A. Kondrat′ev, Boundary value problems for elliptic equations in domains with conical or angular points, Trudy Moskov. Mat. Obšč. 16 (1967), 209–292 (Russian). MR 0226187
  • G. P. Panasenko, Higher-order asymptotics of the solutions of problems on the contact of periodic structures, Mat. Sb. (N.S.) 110(152) (1979), no. 4, 505–538 (Russian). MR 562207
  • E. Sánchez-Palencia, Un problème d’écoulement lent d’un fluide incompressible au travers d’une paroi finement perforée, Homogenization methods: theory and applications in physics (Bréau-sans-Nappe, 1983) Collect. Dir. Études Rech. Élec. France, vol. 57, Eyrolles, Paris, 1985, pp. 371–400 (French). MR 844874
  • S. A. Nazarov, Asymptotic behavior of solutions and the modeling of problems in the theory of elasticity in a domain with a rapidly oscillating boundary, Izv. Ross. Akad. Nauk Ser. Mat. 72 (2008), no. 3, 103–158 (Russian, with Russian summary); English transl., Izv. Math. 72 (2008), no. 3, 509–564. MR 2432755, DOI 10.1070/IM2008v072n03ABEH002410
  • Sergei A. Nazarov and M. Eugenia Pérez, On multi-scale asymptotic structure of eigenfunctions in a boundary value problem with concentrated masses near the boundary, Rev. Mat. Complut. 31 (2018), no. 1, 1–62. MR 3742965, DOI 10.1007/s13163-017-0243-4
  • Sergey A. Nazarov and Boris A. Plamenevsky, Elliptic problems in domains with piecewise smooth boundaries, De Gruyter Expositions in Mathematics, vol. 13, Walter de Gruyter & Co., Berlin, 1994. MR 1283387, DOI 10.1515/9783110848915.525
  • V. A. Kozlov, V. G. Maz′ya, and J. Rossmann, Elliptic boundary value problems in domains with point singularities, Mathematical Surveys and Monographs, vol. 52, American Mathematical Society, Providence, RI, 1997. MR 1469972, DOI 10.1090/surv/052
  • S. A. Nazarov and B. A. Plamenevskiĭ, The Neumann problem for selfadjoint elliptic systems in a domain with a piecewise-smooth boundary, Trudy Leningrad. Mat. Obshch. 1 (1990), 174–211, 246–247 (Russian). MR 1104210
  • V. G. Maz′ja and B. A. Plamenevskiĭ, Estimates in $L_{p}$ and in Hölder classes, and the Miranda-Agmon maximum principle for the solutions of elliptic boundary value problems in domains with singular points on the boundary, Math. Nachr. 81 (1978), 25–82 (Russian). MR 492821, DOI 10.1002/mana.19780810103
  • S. A. Nazarov, Asymptotic expansion of the solution of the Dirichlet problem for an equation with rapidly oscillating coefficients in a rectangle, Mat. Sb. 182 (1991), no. 5, 692–722 (Russian); English transl., Math. USSR-Sb. 73 (1992), no. 1, 79–110. MR 1124104, DOI 10.1070/SM1992v073n01ABEH002536
  • S. A. Nazarov and A. S. Slutskiĭ, Asymptotic behavior of solutions of boundary value problems for an equation with rapidly oscillating coefficients in a domain with a small cavity, Mat. Sb. 189 (1998), no. 9, 107–142 (Russian, with Russian summary); English transl., Sb. Math. 189 (1998), no. 9-10, 1385–1422. MR 1680848, DOI 10.1070/SM1998v189n09ABEH000353
  • S. A. Nazarov, Asymptotic behavior of the solution of the Dirichlet problem in an angular domain with a periodically changing boundary, Mat. Zametki 49 (1991), no. 5, 86–96, 159 (Russian); English transl., Math. Notes 49 (1991), no. 5-6, 502–509. MR 1137177, DOI 10.1007/BF01142647
  • S. A. Nazarov, The Neumann problem in angular domains with periodic and parabolic perturbations of the boundary, Tr. Mosk. Mat. Obs. 69 (2008), 182–241 (Russian, with Russian summary); English transl., Trans. Moscow Math. Soc. (2008), 153–208. MR 2549447, DOI 10.1090/S0077-1554-08-00173-8
Similar Articles
  • Retrieve articles in St. Petersburg Mathematical Journal with MSC (2020): 74Q05
  • Retrieve articles in all journals with MSC (2020): 74Q05
Bibliographic Information
  • S. A. Nazarov
  • Affiliation: St. Petersburg State University, University Embankment, 7/9, 199034 St. Petersburg, Russia
  • MR Author ID: 196508
  • Email: srgnazarov@yahoo.co.uk
  • Received by editor(s): January 17, 2019
  • Published electronically: March 2, 2021
  • Additional Notes: This work was supported by the Russian Science Foundation (Project 17-11-01003)
  • © Copyright 2021 American Mathematical Society
  • Journal: St. Petersburg Math. J. 32 (2021), 307-348
  • MSC (2020): Primary 74Q05
  • DOI: https://doi.org/10.1090/spmj/1649
  • MathSciNet review: 4075004