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2018 | OriginalPaper | Chapter

Comparison of Known Existence Results for One-Dimensional Beam Models of Suspension Bridges

Author : Jakub Janoušek

Published in: Differential and Difference Equations with Applications

Publisher: Springer International Publishing

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Abstract

The aim of this paper is to present our recent existence and uniqueness results for a one-dimensional damped model of a suspension bridge and compare them to previous results for either damped or non-damped one-dimensional beam models.

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previous chapter Kirchhoff-Type Boundary-Value Problems on the Real Line

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Alonso, J.M., Ortega, R.: Global asymptotic stability of a forced Newtonian system with dissipation. J. Math. Anal. Appl. 196(3), 965–986 (1995)MathSciNetCrossRef

Amann, O.H., von Kármán, T., Woodruff, G.B.: The failure of the Tacoma Narrows Bridge. Federal Works Agency (1941)

Berkovits, J., Drábek, P., Leinfelder, H., Mustonen, V., Tajčová, G.: Time-periodic oscillations in suspension bridges: existence of unique solutions. Nonlinear Anal. Real World Appl. 1(3), 345–362 (2000)MathSciNetCrossRef

Choi, Q.-H., Jung, T., McKenna, P.J.: The study of a nonlinear suspension bridge equation by a variational reduction method. Appl. Anal. 50(1–2), 73–92 (1993)MathSciNetMATH

Choi, Y.S., McKenna, P.J.: A mountain pass method for the numerical solution of semilinear elliptic problems. Nonlinear Anal. 20(4), 417–437 (1993)MathSciNetCrossRef

Drábek, P.: Jumping nonlinearities and mathematical models of suspension bridge. Acta Math. Inform. Univ. Ostraviensis 2(1), 9–18 (1994)MathSciNetMATH

Drábek, P., Holubová, G.: Bifurcation of periodic solutions in symmetric models of suspension bridges. Topol. Methods Nonlinear Anal. 14(1), 39–58 (1999)MathSciNetCrossRef

Drábek, P., Nečesal, P.: Nonlinear scalar model of a suspension bridge: existence of multiple periodic solutions. Nonlinearity 16(3), 1165–1183 (2003)MathSciNetCrossRef

Drábek, P., Holubová, G., Matas, A., Nečesal, P.: Nonlinear models of suspension bridges: discussion of the results. Appl. Math. 48(6), 497–514 (2003). Mathematical and computer modeling in science and engineeringMathSciNetCrossRef

10.

Gazzola, F.: Mathematical Models for Suspension Bridges, vol. 15. MS&A. Modeling, Simulation and Applications. Springer, Cham (2015). Nonlinear structural instabilityCrossRef

11.

Holubová, G., Janoušek, J.: One-dimensional model of a suspension bridge: revision of uniqueness results. Appl. Math. Lett. 71, 6–13 (2017)MathSciNetCrossRef

12.

Humphreys, L.D.: Numerical mountain pass solutions of a suspension bridge equation. Nonlinear Anal. 28(11), 1811–1826 (1997)MathSciNetCrossRef

13.

Lazer, A.C., McKenna, P.J.: Large scale oscillatory behaviour in loaded asymmetric systems. Ann. Inst. H. Poincaré Anal. Non Linéaire 4(3), 243–274 (1987)MathSciNetCrossRef

14.

Lazer, A.C., McKenna, P.J.: Large-amplitude periodic oscillations in suspension bridges: some new connections with nonlinear analysis. SIAM Rev. 32(4), 537–578 (1990)MathSciNetCrossRef

15.

McKenna, P.J., Walter, W.: Nonlinear oscillations in a suspension bridge. Arch. Rational Mech. Anal. 98(2), 167–177 (1987)MathSciNetCrossRef

16.

Tajčová, G.: Mathematical models of suspension bridges. Appl. Math. 42(6), 451–480 (1997)MathSciNetCrossRef

Title: Comparison of Known Existence Results for One-Dimensional Beam Models of Suspension Bridges
Author: Jakub Janoušek
Publisher: Springer International Publishing
Book: Differential and Difference Equations with Applications
Print ISBN: 978-3-319-75646-2

Electronic ISBN: 978-3-319-75647-9

Copyright Year: 2018
DOI: https://doi.org/10.1007/978-3-319-75647-9_13

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