Exponential decay and blow-up results of a logarithmic nonlinear wave equation having infinite memory and strong time-varying delay
Luqman Bashir, Jianghao Hao, Salah Boulaaras, Muhammad Fahim Aslam, Tong Zhang
Abstract
In this work, we investigate the logarithmic nonlinear wave equation, which is distinguished by strong time-varying delay components, infinite memory, and strong damping. Through semigroup theory, we have established a local existence result, paving the way for a comprehensive understanding of the equation’s behavior. In addition, we explore the global existence of solutions, revealing fascinating decay results and investigating the circumstances in which blow-up may occur in solutions with negative starting energy. Our results shed light on the complex nature of this dynamic system while also strengthening the theoretical framework.
Topics & Concepts
LogarithmMathematicsExponential decayExponential functionMathematical analysisNonlinear systemPartial differential equationOrdinary differential equationExponential growthWave equationPhysicsDifferential equationQuantum mechanicsStability and Controllability of Differential EquationsAdvanced Mathematical Physics ProblemsAdvanced Mathematical Modeling in Engineering