2_2015_sen_5

Title of the article ON FREE BOUNDARY AND INTERFACIAL VIBRATIONS OF THIN ELASTIC SEMI-INFINITE PLATES WITH FREE END
Authors

VITYAZ P.A., Academician, Dr. Techn. Sc., Professor, Chief of the Staff of the NAS of Belarus and Metallurgy, Presidium of the NAS of Belarus, Minsk, Republic of Belarus
ZHORNIK V.I., Dr. Techn. Sc., Associate Professor, Head of the Laboratory of Nanostructured and Superhard Materials, Joint Institute of Mechanical Engineering of the National Academy of Sciences of Belarus, Minsk, Republic of Belarus, This email address is being protected from spambots. You need JavaScript enabled to view it.
KUKAREKO V.A., Dr. Phys.-Math. Sc., Associate Professor, Head of the Center of Structural Research and Tribo-Mechanical Test of Materials and Machine-Building Output, Joint Institute of Mechanical Engineering of the National Academy of Sciences of Belarus, Minsk, Republic of Belarus, This email address is being protected from spambots. You need JavaScript enabled to view it.
SHYPITSYN S.Ya., Dr. Techn. Sc., Professor, Head of Department of Precipitation Hardening Alloy, Physico-Technological Institute of Metals and Alloys of the National Academy of Science of Ukraine, Kiev, Ukraina
MOSUNOV E.I., Senior Researcher of the Laboratory of Nanostructured and Superhard Materials, Joint Institute of Mechanical Engineering of the National Academy of Sciences of Belarus, Minsk, Republic of Belarus
KOVALIOVA S.A., Senior Researcher of the Laboratory of Nanostructured and Superhard Materials, Joint Institute of Mechanical Engineering of the National Academy of Sciences of Belarus, Minsk, Republic of Belarus, This email address is being protected from spambots. You need JavaScript enabled to view it.
In the section TECHNOLOGICAL MECHANICS
Year 2015 Issue 2 Pages 37-46
Type of article RAR Index UDK 669.141.24 Index BBK  
Abstract Free planar and bending interfacial and boundary vibrations of semi-infinite composed plates and plate-strips are studied. Using the system of equations of the related classical theory of orthotropic plates, dispersion equations and asymptotic formulas for obtaining eigenfrequencies of interfacial and boundary vibrations of composed plates are derived. An asymptotic link is established between the dispersion equations of problems in hand and analogous problems for infinite composed plate and infinite plate-strip, respectively.
Keywords interfacial vibrations, natural frequencies, plate
  You can access full text version of the article
Bibliography
  • Pietraszkiewicz W., Szymczak Cz. (Eds.) Shell Structures, Theory and Applications. Proceedings of the 8th International conference on shell structures (SSTA 2005).
  • Rayleigh J.W. On waves propagated along the plate surface of an elastic solids. Proc. London Math. Soc. 1885, vol. 17, pp. 4-11.
  • Viktorov I.A. Zvukovye poverkhnostnye volny v tverdykh telakh [Sound surface waves in solid bodies]. Moscow, Nauka Publ., 1981. 288 p.
  • Grinchenko W.T., Meleshko V.V. Garmonicheskie kolebaniya i volny v uprugikh telakh [Harmonic vibrations and waves in elastic bodies]. Kiev, Naukova dumka Publ., 1981. 284 p.
  • Mikhasev G.I., Tovstik P.E. Lokalizovannye kolebaniya i volny v tonkikh obolochkakh. Asimptoticheskie metody [Localized vibrations and waves in thin shells: Asymptotic methods]. Moscow, Fizmatlit Publ., 2009. 292 p.
  • Zilbergeyt A.S., Suslova I.B. Kontaktnye volny izgiba v tonkikh plastinkakh [Contact bending waves in thin plates]. Akust. Zhurnal [Acoustic magazine], 1983, vol. 29, pp. 186-191.
  • Gertman I.P., Lisitskiy O.N. Otrazhenie i prokhozhdenie zvukovykh voln cherez granitsu razdela dvukh sostykovannykh uprugikh polupolos [Reflection and transmission of acoustic waves at the interface of separation of two elastic semi-strips]. Prikladnaya matematika i mechanika [Applied Mathematics and Mechanics], 1998, vol. 52, pp. 1044-1048.
  • Stoneley R. The elastic waves at the interface of two solids. Proc. Roy Soc. London A. 1924, vol. 106, pp. 416-429.
  • Vilde M.V., Kaplunov Yu.D., Kossovich L.Yu. Kraevye i interfeysnye rezonansnye yavleniya v uprugich telach [Edge and interfacial resonance phenomenon in elastic solids]. Moscow, Fizmatlit Publ., 2010. 280 p.
  • Gulgazaryan G.R., Gulgazaryan L.G., Miklashevich I.A., Pletezhov A.A., Chachanyan A.A. Svobodnye interfeysnye kolebaniya beskonechoy bezmomentnoy tsilindricheskoy obolochki s proizvolnoy napravlyayuschey [Free interfacial vibrations of unmoment infinite cylindrical shells with arbitrary smooth directing curve]. Vestnik FFI [Vestnik of the Foundation for Fundamental Research], 2012, no. 1, pp. 59-80.
  • Gulgazaryan G.R., Gulgazaryan R.G. O svobodnykh interfeysnykh kolebaniyakh tonkikh uprugikh krugovykh tsilindricheskikh obolochek [About free interfacial vibrations of thin elastic circular cylindrical shells]. Mechanika mashin, mechanizmov i materialov [Mechanics of machines, mechanisms and materials], 2013, no. 4(25), pp. 12-19.
  • Ambartsumyan S.A. Teoriya anizotropnych obolochek [The Theory of Anizotropic Shells]. Moscow, Gos.izd.fiz.mat.lit., 1961. 384 p.
  • Gulgazaryan G.R., Gulgazaryan R.G., Mikhasev G.I. Svobodnye interfacnye i kraevye kolebaniya tonkikh uprugikh polubeskonechnyкh krugovykh tsilindricheskikh obolochek so svobodnym tortsom [Free interfacial and boundary vibrathions
    of thin elastic semi-infinite circular cylindrical shells]. Problemy dinamiki vzaimodeystviya deformiruemykh sred [The problems of dynamics of interaction of deformable media], Yerevan, Chartaraget Publ., 2014. pp. 187-191.
  • Gulgazaryan G.R., Lidskiy V.B. Plotnost’ chastot svobodnykh kolebaniy tonkoy anizotropnoy obolochki, sostavlennoy iz anizotropnykh sloev [The frequency density of the free vibrations of a thin anisotropic shell composed of anizotrpic
    layers]. Izv. AN SSSR MTT [News AN SSSR MTT], 1982, no. 3, pp. 171-174.