Polynomial dynamical systems and Korteweg--de Vries equation

Abstract

In this work we explicitly construct polynomial vector fields Lk,\;k=0,1,2,3,4,6 on the complex linear space C6 with coordinates X=(x2,x3,x4) and Z=(z4,z5,z6). The fields Lk are linearly independent outside their discriminant variety ⊂ C6 and tangent to this variety. We describe a polynomial Lie algebra of the fields Lk and the structure of the polynomial ring C[X, Z] as a graded module with two generators x2 and z4 over this algebra. The fields L1 and L3 commute. Any polynomial P(X,Z) ∈ C[X, Z] determines a hyperelliptic function P(X,Z)(u1, u3) of genus 2, where u1 and u3 are coordinates of trajectories of the fields L1 and L3. The function 2 x2(u1, u3) is a 2-zone solution of the KdV hierarchy and ∂∂ u1z4(u1, u3)=∂∂ u3x2(u1, u3).