For $N$-body problems with homogeneous potentials we define a special class of central configurations related with the reduction of homotheties in the study of homogeneous weak KAM solutions. For potentials in $1/r^\alpha$ with $\alpha\in (0,2)$ we prove the existence of homogeneous weak KAM solutions. We show that such solutions are related to viscosity solutions of another Hamilton-Jacobi equation in the sphere of normal configurations. As an application we prove for the Newtonian three body problem that there are no smooth homogeneous solutions to the critical Hamilton-Jacobi equation.
A Dynamical Approach to Viscosity Solutions of Hamilton-Jacobi Equations
On and beyond propagation of singularities of viscosity solutions
Existence of $C^{1,1}$ critical sub-solutions of the Hamilton-Jacobi equation on compact manifolds
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