Dynamics of a Certain Nonlinearly Perturbed Heat Equation

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We consider a system described by the linear heat equation, with appropriate boundary conditions in order to model the temperature on a wire with adiabatic endpoints, which is perturbed nonlinearly by a family of quadratic maps. The time instants of the perturbation are determined by an additional dynamical system, seen here as part of the external interacting system. We study the complex behaviour of the system, namely the dependence on initial conditions.

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C.C. Ramos, A.I. Santos and S. Vinagre, (2020), Dynamics of a Certain Nonlinearly Perturbed Heat Equation, In: S. Pinelas, J.R. Graef, S. Hilger, P. Kloeden and C. Schinas (eds), International Conference on Differential and Difference Equations with Applications 2019, Springer Proceedings in Mathematics & Statistics, vol. 333, Springer, 653-668.

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