We present a theoretical and numerical study of Fourier space triad phase dynamics in 1-D stochastically forced Burgers equation at Reynolds number Re ≈ 27000. We show that Fourier triad phases over the inertial range display a collective behaviour characterised by intermittent periods of synchronisation and alignment, reminiscent of Kuramoto model (1984) and directly related to shock collisions in physical space. These periods of synchronisation favour efficient energy fluxes across the inertial range towards small scales, resulting in strong bursts of dissipation and enhanced coherence of Fourier energy spectrum. The fast time scale of the onset of synchronisation relegates energy dynamics to a passive role: this is further examined using a reduced system where Fourier amplitudes are fixed in time -- a phase-only model. In it, we find intermittent triad phase dynamics without amplitude evolution and recover many features of the full Burgers system. Finally, for both full Burgers and phase-only systems the physical space velocity statistics reveal that triad phase alignment is directly related to the non-Gaussian statistics typically associated with structure-function intermittency in turbulent systems.

This is joint work with Brendan P. Murray, and is published in JFM 850, 624-645 (2018). This work was supported by Science Foundation Ireland (research grant number 12/IP/1491) and COST-Action MP1305.