Abstract
The paper considers the dynamic process of contact interaction of infinite impulse-loaded strips arranged with a gap. The behavior of the strips is described by linear elastic dynamics equations. The contact problem is solved by the collocation method. The process of impact of two and three strips is analyzed. The calculation results are compared with data obtained by using the finite-element method.
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References
Vorovich II, Aleksandrov VM (eds) (2001). Contact mechanics. Fizmatgiz, Moscow
Galin LA (ed) (1976). Development of the theory of contact problems in the USSR. Nauka, Moscow
Bezine G and Fortune D (1984). Contact between plates by a new direct boundary integrall equation formulation. Int J Solids Struct 20(8): 739–746
Johnson KL (1989). Contact mechanics. Mir, Moscow
Goldsmith W (1960). Impact. Edward Arnold, London
Aleksandrov VM (1968). Asymptotic methods in contact problems of the elasticity theory. Prikladnaya matematika i mekhanika (Appl Math Mech) 32(4): 672–683
Mackerle J (1998). Contact mechanics-Finite element and boundary element approaches—a bibliography (1995–1997). Finite Elem Anal Des 29: 275–285
Kantor BYa (1990). Contact problems of the nonlinear theory of rotation shells. Naukova Dumka, Kiev
Podgorny AN, Gontarovsky PP, Kirkach VN, Matiukhin YuI and Khavin GL (1989). Problems in contact interaction of structural elements. Naukova Dumka, Kiev
Andersson T (1981) The boundary element method applied to two dimensional contact problems with friction. In: Brebbia CA (ed) Proceedings of the 3 international seminar on recent advances in boundary element methods. Springer, Berlin
Burago NG and Kukudzhanov VN (2005). Review of contact algorithms. Mekhanika tverdogo tela (Mech Solids) 1: 45–87
Zelentsov VB (2004). On nonstationary dynamic contact problems in the theory of elasticity with a variable contact zone width. Prikladnaya matematika i mekhanika (Appl Math Mech) 68(1): 119–134
Jäger J (2002). New analytical and numerical results for two-dimensional contact profiles. Int J Solids Struct 39(4): 959–972
Beghini M and Santus C (2007). Analysis of the plane contact with discontinuous curvature. Meccanica 42: 95–106
Gorshkov AG and Tarlakovsky DV (1995). Dynamic contact problems with mobile boundaries. Nauka Publishers, Moscow
Flitman LM (1959). Dynamic problem for a die in an elastic semiplane. Prikladnaya matematika i mekhanika (Appl Math Mech) 23(4): 697–705
Robinson AR and Thompson JC (1974). Transient stresses in an elastic half-space resulting from the frictionless indentation of a rigid wedge-shaped die. Z Angew Math Mech 54(3): 139–144
Babeshko VA (1995). Dummy absorption method in the form of the Fourier transform. Doklad RAN (Rep Russ Acad Sci) 345(4): 475–478
Babeshko VA and Priakhina OD (1980). Dummy absorption method in plane dynamic problems. Prikladnaya matematika i mekhanika (Appl Math Mech) 44(3): 477–484
Shupikov AN and Ugrimov SV (2006). The impact problem for two strips. Int J Solids Struct 43: 3817–3831
Shupikov AN and Ugrimov SV (1999). Vibrations of multilayer plates under the effect of impulse loads. Three-dimensional theory. Int J Solids Struct 36: 3391–3402
Shupikov AN, Buz’ko YaP, Smetankina NV, Ugrimov SV (2004) Nonstationary vibrations of multilayer plates and shells, and their optimization. Publishing House “INZhEK”, Kharkov
Lanczos C (1956). Applied analysis. Prentice Hall, Englewood Cliffs
Weingarten LI and Reismann H (1974). Forced motion of cylindrical shells—a comparison of shell theory with elasticity theory. Z Angew Math Mech 54(3): 181–191
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Kantor, B.Y., Ugrimov, S.V. & Shupikov, A.N. Analyzing dynamic interaction of impulse-loaded strips. Meccanica 43, 11–20 (2008). https://doi.org/10.1007/s11012-007-9069-3
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DOI: https://doi.org/10.1007/s11012-007-9069-3