A note on the integrability of exceptional potentials via polynomial bi-homogeneous potentials
Abstract
This paper is concerned with the polynomial integrability of the two-dimensional Hamiltonian systems associated to complex homogeneous polynomial potentials of degree k of type Vk,l=α (q2-i q1)l (q2+iq1)k-l with α∈C and l=0,1,…, k, called exceptional potentials. Hietarinta Hietarinta1983 proved that the potentials with l=0,1,k-1,k and l=k/2 for k even are polynomial integrable. We present an elementary proof of this fact in the context of the polynomial bi-homogeneous potentials, as was introduced by Combot et al. Combot2020. In addition, we take advantage of the fact that we can exchange the exponents to derive an additional first integral for V7,5, unknown so far. The paper concludes with a Galoisian analysis for l=k/2.
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