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Hauptverfasser: Kanwal, Iqra, Hao, Jianghao, Aslam, Muhammad Fahim, Hajjej, Zayd, Sepúlveda-Cortés, Mauricio, Vejár-Asem, Rodrigo
Format: Preprint
Veröffentlicht: 2026
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Online-Zugang:https://arxiv.org/abs/2603.20566
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author Kanwal, Iqra
Hao, Jianghao
Aslam, Muhammad Fahim
Hajjej, Zayd
Sepúlveda-Cortés, Mauricio
Vejár-Asem, Rodrigo
author_facet Kanwal, Iqra
Hao, Jianghao
Aslam, Muhammad Fahim
Hajjej, Zayd
Sepúlveda-Cortés, Mauricio
Vejár-Asem, Rodrigo
contents 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 using Summation-By-Parts finite differences with Simultaneous Approximation Terms (SBP-SAT) for 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.
format Preprint
id arxiv_https___arxiv_org_abs_2603_20566
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Stability and blow-up for a suspension bridge plate model with fractional damping and memory
Kanwal, Iqra
Hao, Jianghao
Aslam, Muhammad Fahim
Hajjej, Zayd
Sepúlveda-Cortés, Mauricio
Vejár-Asem, Rodrigo
Analysis of PDEs
Numerical Analysis
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 using Summation-By-Parts finite differences with Simultaneous Approximation Terms (SBP-SAT) for 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.
title Stability and blow-up for a suspension bridge plate model with fractional damping and memory
topic Analysis of PDEs
Numerical Analysis
url https://arxiv.org/abs/2603.20566