Display Abstract

Title Quasilinear fourth order elliptic equations modeling suspension bridges

Name Filippo Gazzola
Country Italy
Email filippo.gazzola@polimi.it
Co-Author(s) Mohammed Al-Gwaiz, Vieri Benci
Submit Time 2014-02-19 11:56:33
Session
Special Session 120: Linear and Nonlinear fourth order PDE's
Contents
A rectangular plate modeling the roadway of a suspension bridge is considered. Both the contributions of the bending and stretching energies are analyzed. The latter plays an important role due to the presence of the free edges. A linear model is first considered; in this case, separation of variables is used to determine explicitly the deformation of the plate in terms of the vertical load. Moreover, the same method allows us to study the spectrum of the linear operator and the least eigenvalue. Then the stretching energy is introduced without linearization and the equation becomes quasilinear; the nonlinear term also affects the boundary conditions. We consider two quasilinear models; the surface increment model (SIM) in which the stretching energy is proportional to the increment of surface and a nonlocal model (NLM) introduced by Berger in the 50's. The (SIM) and the (NLM) are studied in detail. According to the strength of prestressing we prove the existence of multiple equilibrium positions.