Pre-Publicación 2026-09
Fahim Aslam, Zayd Hajjej, Jianghao Hao, Iqra Kanwal, Mauricio Sepúlveda, Rodrigo Véjar:
Stability and blow-up for a suspension bridge plate model with fractional damping and memory
Abstract:
We investigate a suspension bridge model described by a nonlinear plate equation incorporating internal fractional damping and infinite memory effects. The system also includes a nonlinear source term that may induce instability. Using semigroup theory, we first establish the local well-posedness of solutions in an appropriate energy space. We then derive conditions ensuring global existence and exponential stability of solutions. In contrast, when the initial energy is negative, we prove that solutions blow up in finite time, revealing a threshold phenomenon governing the long-term dynamics of the system. To complement the analytical results, we construct a numerical approximation based on Summation-By-Parts finite differences with Simultaneous Approximation Terms (SBP–SAT) for the spatial discretization and a Newmark scheme for time integration. The scheme preserves the structural properties of the continuous energy framework. Numerical experiments illustrate the stability and blow-up regimes predicted by the theoretical analysis.
