Sam E. Turton scite author profile

Motivated by studies of the cylinder wake, in which the vortex-shedding frequency can be obtained from the mean flow, we study thermosolutal convection driven by opposing thermal and solutal gradients. In the archetypal two-dimensional geometry with horizontally periodic and vertical noslip boundary conditions, branches of traveling waves and standing waves are created simultaneously by a Hopf bifurcation. Consistent with similar analyses performed on the cylinder wake, we find that the traveling waves of thermosolutal convection have the RZIF property, meaning that linearization about the mean fields of the traveling waves yields an eigenvalue whose real part is almost zero and whose imaginary part corresponds very closely to the nonlinear frequency. In marked contrast, linearization about the mean field of the standing waves yields neither zero growth nor the nonlinear frequency. It is shown that this difference can be attributed to the fact that the temporal power spectrum for the traveling waves is peaked, while that of the standing waves is broad. We give a general demonstration that the frequency of any quasi-monochromatic oscillation can be predicted from its temporal mean.

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Bouncing phase variations in pilot-wave hydrodynamics and the stability of droplet pairs

Couchman

Turton

Bush

2019

J. Fluid Mech.

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We present the results of an integrated experimental and theoretical investigation of the vertical motion of millimetric droplets bouncing on a vibrating fluid bath. We characterize experimentally the dependence of the phase of impact and contact force between a drop and the bath on the drop’s size and the bath’s vibrational acceleration. This characterization guides the development of a new theoretical model for the coupling between a drop’s vertical and horizontal motion. Our model allows us to relax the assumption of constant impact phase made in models based on the time-averaged trajectory equation of Moláček and Bush (J. Fluid Mech., vol. 727, 2013b, pp. 612–647) and obtain a robust horizontal trajectory equation for a bouncing drop that accounts for modulations in the drop’s vertical dynamics as may arise when it interacts with boundaries or other drops. We demonstrate that such modulations have a critical influence on the stability and dynamics of interacting droplet pairs. As the bath’s vibrational acceleration is increased progressively, initially stationary pairs destabilize into a variety of dynamical states including rectilinear oscillations, circular orbits and side-by-side promenading motion. The theoretical predictions of our variable-impact-phase model rationalize our observations and underscore the critical importance of accounting for variability in the vertical motion when modelling droplet–droplet interactions.

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A review of the theoretical modeling of walking droplets: Toward a generalized pilot-wave framework

Turton

Couchman

Bush

2018

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The walking droplet system has extended the range of classical systems to include several features previously thought to be exclusive to quantum systems. We review the hierarchy of analytic models that have been developed, on the basis of various simplifying assumptions, to describe droplets walking on a vibrating fluid bath. Particular attention is given to detailing their successes and failures in various settings. Finally, we present a theoretical model that may be adopted to explore a more generalized pilot-wave framework capable of further extending the phenomenological range of classical pilot-wave systems beyond that achievable in the laboratory.

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Speed oscillations in classical pilot-wave dynamics

2020

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We present the results of a theoretical investigation of a dynamical system consisting of a particle self-propelling through a resonant interaction with its own quasi-monochromatic pilot-wave field. We rationalize two distinct mechanisms, arising in different regions of parameter space, that may lead to a wavelike statistical signature with the pilot-wavelength. First, resonant speed oscillations with the wavelength of the guiding wave may arise when the particle is perturbed from its steady self-propelling state. Second, a random-walk-like motion may set in when the decay rate of the pilot-wave field is sufficiently small. The implications for the emergent statistics in classical pilot-wave systems are discussed.

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Emergent order in hydrodynamic spin lattices

Sáenz

Pucci

Turton

et al. 2021

Nature

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Macroscale analogs [1,2,3] of microscopic spin systems offer direct insights into fundamental physical principles, thereby advancing our understanding of synchronization phenomena [4] and informing the design of novel classes of chiral metamaterials [5,6,7]. Here, we introduce hydrodynamic spin lattices (HSLs) of walking droplets as a new class of active spin systems with particle-wave coupling. HSLs reveal a variety of non-equilibrium symmetry-breaking phenomena, including transitions from anti-ferromagnetic to ferromagnetic order that can be controlled by varying lattice geometry and system rotation [8]. Theoretical predictions based on a generalized Kuramoto model [4] derived from first principles rationalize our experimental observations, establishing HSLs as a versatile platform for exploring active phase oscillator dynamics. The tunability of HSLs suggests exciting directions for future research, from active spin-wave dynamics to hydrodynamic analog computation and droplet-based topological insulators.

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Sam E. Turton

Prediction of frequencies in thermosolutal convection from mean flows

Bouncing phase variations in pilot-wave hydrodynamics and the stability of droplet pairs

A review of the theoretical modeling of walking droplets: Toward a generalized pilot-wave framework

Speed oscillations in classical pilot-wave dynamics

Emergent order in hydrodynamic spin lattices

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