Abstract
Let us consider the longitudinal, torsional and transverse vibrations of a rod with a rectilinear axis of homogeneous material over its cross-section.
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Mikhlin, S. G. (1950). Direct Methods in mathematical physics (p. 428). Moscow: State Technical Publishing. (in Russian).
Timoshenko S. P. (1956) Strength of materials, 3rd edn. Van Nostrand, NJ, Part 1, 1955, 442 p.; Part 2, 1956, 572 p.
Lusternik, L. A., & Sobolev, V. J. (1968). Elements of functional analysis (411 p.). Gordon and Breach.
Smirnov V. I. (1964). Course of higher mathematics (Vol. IV, 336 p.). Pergamon Press.
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Fridman, V. (2018). Oscillation Equations of a Rod with Rectilinear Axis. In: Theory of Elastic Oscillations. Foundations of Engineering Mechanics. Springer, Singapore. https://doi.org/10.1007/978-981-10-4786-2_1
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DOI: https://doi.org/10.1007/978-981-10-4786-2_1
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