Hierarchy of Distinguished Limits and Drifts for Oscillating Flows (1509.01006v2)

Abstract: Lagrangian motions of fluid particles in a general velocity field oscillating in time are studied with the use of the two-timing method. Our aims are: (i) to calculate systematically the most general and practically usable asymptotic solutions; (ii) to check the limits of applicability of the two-timing method by calculating the averaged motion without making any assumptions; (iii) to classify various drift motions and find their limits of applicability; (iv) to introduce a logical order into the area under consideration; (v) to open the gate for application of the same ideas to the studying more complex systems. Our approach to study a drift is rather unusual: instead of solving the ODE for trajectories we consider a hyperbolic PDE for a scalar lagrangian field $a(\vx,t)$, trajectories represent the characteristics curves for this PDE. It leads us to purely eulerian description of lagrangian motion, that greatly simplifies the calculations. There are two small scaling parameters in the problem: a ratio of two time-scales and a dimensionless vibrational amplitude. It leads us to the sequence of problems for distinguished limits. We have considered four distinguished limits which differ from each other by the scale of slow time. We have shown that each distinguished limit produces an infinite number of solutions for $a(\vx,t)$. A classical drift appears in the case of a purely oscillating flow. At the same time, we have shown that the concept of drift motion is not sufficient for the description of lagrangian dynamics and some diffusion' terms do appear. Five examples of different options of drifts anddiffusion' are given.