KdV-soliton dynamics in a random field

We consider the interaction between soliton and a spatially uniform external random field within the framework of the forced Korteweg-de Vries equation. In the general case, the averaged soliton field is transformed to a Gaussian pulse whose amplitude falls off with time as t^−α, while its width increases as t^α, where the parameter α is characterized by the statistical properties of the external force. We obtain an analytical solution for α = 2, which corresponds to the limiting case of an infinitely long correlation time (τ₀ → ∞). The obtained solution is compared with the well-known Wadati solution for the case of a delta-correlated external force (τ₀ → 0) where the soliton is transformed to a Gaussian pulse with amplitude falling off at a lower rate α = 3/2. The numerical solutions of the forced Korteweg-de Vries equation, which demonstrate an increase in the parameter α from 3/2 to 2 with increasing correlation time, are given for the intermediate case corresponding to 0 < τ₀ < ∞. It is shown that the amplitude of the averaged soliton in a periodic random field falls off as t⁻¹ for the long times t. In this case, two pulses propagating in different directions are formed. __________ Translated from Izvestiya Vysshikh Uchebnykh Zavedenii, Radiofizika, Vol. 49, No. 7, pp. 599–606, July 2006.