Mathematical Models for Suspension Bridges
Nonlinear Structural Instability
Nonfiction, Science & Nature, Mathematics, Differential Equations, Applied
| Author: | Filippo Gazzola | ISBN: | 9783319154343 |
| Publisher: | Springer International Publishing | Publication: | May 29, 2015 |
| Imprint: | Springer | Language: | English |
| Author: | Filippo Gazzola |
| ISBN: | 9783319154343 |
| Publisher: | Springer International Publishing |
| Publication: | May 29, 2015 |
| Imprint: | Springer |
| Language: | English |
This work provides a detailed and up-to-the-minute survey of the various stability problems that can affect suspension bridges. In order to deduce some experimental data and rules on the behavior of suspension bridges, a number of historical events are first described, in the course of which several questions concerning their stability naturally arise. The book then surveys conventional mathematical models for suspension bridges and suggests new nonlinear alternatives, which can potentially supply answers to some stability questions. New explanations are also provided, based on the nonlinear structural behavior of bridges. All the models and responses presented in the book employ the theory of differential equations and dynamical systems in the broader sense, demonstrating that methods from nonlinear analysis can allow us to determine the thresholds of instability.
This work provides a detailed and up-to-the-minute survey of the various stability problems that can affect suspension bridges. In order to deduce some experimental data and rules on the behavior of suspension bridges, a number of historical events are first described, in the course of which several questions concerning their stability naturally arise. The book then surveys conventional mathematical models for suspension bridges and suggests new nonlinear alternatives, which can potentially supply answers to some stability questions. New explanations are also provided, based on the nonlinear structural behavior of bridges. All the models and responses presented in the book employ the theory of differential equations and dynamical systems in the broader sense, demonstrating that methods from nonlinear analysis can allow us to determine the thresholds of instability.
