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SESSION:
MathematicsWedPM3-R3
Rowlands International Symposium (7th Intl. Symp. on Sustainable Mathematics Applications)
Wed. 23 Oct. 2024 / Room: Marika B2
Session Chairs: Peter Rowlands; James Watson; Student Monitors: TBA

17:05: [MathematicsWedPM312] OS
THE DISSIPATIVE EFFECT OF CAPUTO–TIME–FRACTIONAL DERIVATIVES FOR THE SOLUTIONS OF NONLINEAR WAVE EQUATIONS
Anastassios Bountis1; Julia Cantisán Gómez2; Jesús Cuevas–Maraver3; J. E. Macıas-Dıaz4; P. Kevrekidis5
1University of Patras, Patras, Greece; 2Universidad Rey Juan Carlos, Madrid, Spain; 3Universidad de Sevilla, Sevilla, Spain; 4Universidad Autonoma de Aguascalientes, Aguascalientes, Mexico; 5University of Massachusetts, Amherst, United States
Paper ID: 373 [Abstract]

We would like to draw attention in the present paper to a curious mathematical observation concerning fractional differential equations describing physical systems, whose time evolution for integer derivatives has a time-honored conservative form. This observation, although known to the general mathematical community [1, 2, 3], has not, in our view, been satisfactorily addressed. More specifically, we follow the recent exploration of Caputo-Riesz time-space-fractional nonlinear wave equation [4], in which the authors introduced an energy-type functional and proposed a finite-difference scheme to approximate the solutions of the continuous model. The relevant Klein-Gordon equation is considered, where we explore the sine-Gordon nonlinearity with smooth initial data. For the Riesz and Caputo derivative coefficients α=β=2, we naturally retrieve the exact, analytical form of breather waves expected from the literature. 

Focusing on the Caputo temporal derivative variation within 1<β<2 values for α=2, however, we observe artificial dissipative effects, which lead to complete breather disappearance, over a time scale depending on the value of β. We compare such findings to single degree-of-freedom linear and nonlinear oscillators in the presence of Caputo temporal derivatives and also consider anti-damping mechanisms to counter the relevant effect. These findings also motivate some interesting directions for further study, e.g., regarding the consideration of topological solitary waves, such as kinks/antikinks and their dynamical evolution in this model.

References:
[1] B. N. Achar, J. Hanneken, T. Enck, T. Clarke, Dynamics of the fractional oscillator, Physica A: Statistical Mechanics and its Applications 297 (3-4) (2001) 361–367.
[2] A. A. Stanislavsky, Fractional oscillator, Physical review E 70 (5) (2004) 051103
[3] W. S. Chung, M. Jung, Fractional damped oscillators and fractional forced oscillators, Journal of the Korean Physical Society 64 (2014) 186–191
[4] T. B. J E Macias Diaz, An efficient dissipation-preserving numerical scheme to solve a caputo–riesz time-space-fractional nonlinear wave equation, Fractal/Fractional 6 (9) (2022) 500–525


17:25 POSTERS/EXHIBITION - Ballroom Foyer