Numerical study of Fermi-Pasta-Ulam recurrence for water waves over finite depth

Abstract

Highly accurate direct numerical simulations have been performed for two-dimensional free-surface potential flows of an ideal incompressible fluid over a constant depth h, in the gravity field g. In each numerical experiment, at t=0 the free surface profile was in the form y=A0(2π x/L), and the velocity field v=0. The computations demonstrate the phenomenon of Fermi-Pasta-Ulam (FPU) recurrence takes place in such systems for moderate initial wave amplitudes A0 0.12 h and spatial periods at least L 120 h. The time of recurrence T FPU is well fitted by the formula T FPU(g/h)1/2≈ 0.16(L/h)2(h/A0)1/2.