Characterization and dynamics of certain classes of polynomial vector fields on the torus

Abstract

In this paper, we classify all polynomial vector fields in R3 of degree up to three such that their flow makes the torus T2=\(x,y,z)∈ R3:(x2+y2-a2)2+z2-1=0\~with~a∈ (1,∞) invariant. We also classify cubic Kolmogorov vector fields on T2 and prove that they exhibit a rational first integral. We study `pseudo-type-n' vector fields on T2 and show that any such vector field is completely integrable. We prove that the Lie bracket of any two quadratic vector fields on T2 is completely integrable. We explicitly find all cubic vector fields on T2 which achieve the sharp bounds for the number of invariant meridians and parallels. We present necessary and sufficient conditions when invariant meridians and parallels of cubic vector fields on T2 are periodic orbits or limit cycles. We discuss invariant meridians and parallels of pseudo-type-n vector fields as well. Moreover, we characterize the singular points of a class of polynomial vector fields on T2.