Killing tensor fields of third rank on a two-dimensional Riemannian torus

Abstract

A rank m symmetric tensor field on a Riemannian manifold is called a Killing field if the symmetric part of its covariant derivative is equal to zero. Such a field determines the first integral of the geodesic flow which is a degree m homogeneous polynomial in velocities. There exist global isothermal coordinates on a two-dimensional Riemannian torus such that the metric is of the form ds2=λ(z)|dz|2 in the coordinates. The torus admits a third rank Killing tensor field if and only if the function λ satisfies the equation (∂∂ z(λ(c-1λzz+a)))=0 with some complex constants a and c≠0. The latter equation is equivalent to some system of quadratic equations relating Fourier coefficients of the function λ. If the functions λ and λ+λ0 satisfy the equation for a real constant λ0≠0, then there exists a non-zero Killing vector field on the torus.