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References
G. Yu. Dzhanelidze, Tr. Leningr. Politekh. Inst., No. 192, 21 (1958).
Z. Kordas and M. Życzkowski, Arch. Mech. Stosow. 15(1), 7 (1963).
T. E. Smith and G. Herrmann, Trans. ASME. J. Appl. Mech. 39(2), 628 (1972).
C. Sundararajan, J. Sound and Vibr. 37(1), 79 (1974).
W. Hauger and K. Vetter, J. Sound and Vibr. 47(2), 296 (1976).
I. I. Voloshin and V. G. Gromov, Izv. Akad. Nauk, Mekh. Tverd. Tela 12(4), 169 (1977).
Ya. G. Panovko and I. I. Gubanova, Stability and Oscillations of Elastic Systems: Advanced Concepts, Paradoxes, and Errors (Nauka, Moscow, 1987).
S. Y. Lee, J. C. Lin, and K. C. Hsu, Comput. Struct. 59, 983 (1996).
I. Elishakoff and N. Impollonia, Trans. ASME, J. Appl. Mech. 68(2), 206 (2001).
O. N. Kirillov and A. P. Seyranian, in Proceedings of Seminar on Time, Chaos, and Mathematical Problems, Mosk. Gos. Univ., No. 2, 217 (2000).
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From Doklady Akademii Nauk, Vol. 386, No. 6, 2002, pp. 761–766.
Original English Text Copyright © 2002 by Kirillov, Seyranian.
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Kirillov, O.N., Seyranian, A.P. Solution to the Herrmann-Smith problem. Dokl. Phys. 47, 767–771 (2002). https://doi.org/10.1134/1.1519327
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DOI: https://doi.org/10.1134/1.1519327