On the τ-functions of the reduced Ostrovsky equation and the A2(2) two-dimensional Toda system

Abstract

The reciprocal link between the reduced Ostrovsky equation and the A2(2) two-dimensional Toda system is used to construct the N-soliton solution of the reduced Ostrovsky equation. The N-soliton solution of the reduced Ostrovsky equation is presented in the form of pfaffian through a hodograph (reciprocal) transformation. The bilinear equations and the τ-function of the reduced Ostrovsky equation are obtained from the period 3-reduction of the B∞ or C∞ two-dimensional Toda system, i.e., the A2(2) two-dimensional Toda system. One of τ-functions of the A2(2) two-dimensional Toda system becomes the square of a pfaffian which also become a solution of the reduced Ostrovsky equation. There is another bilinear equation which is a member of the 3-reduced extended BKP hierarchy. Using this bilinear equation, we can also construct the same pfaffian solution.