Integrability of potentials of degree k ≠ 2. Second order variational equations between Kolchin solvability and Abelianity

Abstract

In our previous paper: Integrability of Homogeneous potentials of degree k = 2. An application of higher order variational equations, we tried to extract some particular structures of the higher variational equations (the VEp for p >1 ), along particular solutions of some Hamiltonian systems. Then, we use them to get new Galois obstructions to the integrability of natural Hamiltonian with potential of degree k = 2. In the present work, we apply the results of the previous paper, to the complementary cases, when the degrees of the potentials are relative integers k, with |k| >2. Since these cases are much more general and complicated, we reduce our study only to the second variational equation VE2.