Statistical Properties of the Intrinsic Geometry of Heavy-particle Trajectories in Two-dimensional, Homogeneous, Isotropic Turbulence

Abstract

We obtain, by extensive direct numerical simulations, trajectories of heavy inertial particles in two-dimensional, statistically steady, homogeneous, and isotropic turbulent flows, with friction. We show that the probability distribution function P(), of the trajectory curvature , is such that, as ∞, P() -h r, with h r = 2.07 0.09. The exponent h r is universal, insofar as it is independent of the Stokes number (St) and the energy-injection wave number. We show that this exponent lies within error bars of their counterparts for trajectories of Lagrangian tracers. We demonstrate that the complexity of heavy-particle trajectories can be characterized by the number N I(t, St) of inflection points (up until time t) in the trajectory and n I ( St) t∞ N I (t, St)t St-, where the exponent = 0.33 0.02 is also universal.