Integrable homogeneous potentials of degree $-1$ in the plane with small eigenvalues

Abstract: We give a complete classification of meromorphically integrable homogeneous potentials $V$ of degree $-1$ which are real analytic on $\mathbb{R}^2\setminus {0}$. In the more general case when $V$ is only meromorphic on an open set of an algebraic variety, we give a classification of all integrable potentials having a Darboux point $c$ with $V'(c)=-c,\; c_1^2+c_2^2\neq 0$ and $\hbox{Sp}(\nabla^2 V(c)) \subset{-1,0,2}$. We eventually present a conjecture for the other eigenvalues and the degenerate Darboux point case $V'(c)=0$.