Anti-localization of non-stationary quasi-waves in a $β$-FPUT chain
Published: Apr 28, 2025
Last Updated: Apr 28, 2025
Authors:Serge N. Gavrilov, Ekaterina V. Shishkina, Bogdan S. Borisenkov
Abstract
Recently, a new general wave phenomenon, namely "the anti-localization of non-stationary linear waves", has been introduced and discussed. This is zeroing of the propagating component for a non-stationary wave-field near a defect in infinitely long wave-guides. The phenomenon is known to be observed in both continuum and discrete mechanical systems with a defect, provided that the frequency spectrum for the corresponding homogeneous system possesses a stop-band. In this paper, we show that the anti-localization is also quite common for nonlinear systems. To demonstrate this, we numerically solve several non-stationary problems for an infinite $\beta$-FPUT chain with a defect.