The Lagrange Problem from the Viewpoint of Toric Geometry

In this paper, I mainly prove the following conclusions. For the Lagrange problem, when the energy value is below the minimum value of the first, second and third critical points, the toric domain defined for the bounded component of the regularized energy hypersurface is strictly monotone and is dynamically convex as a corollary. For the Euler problem as a special case of the Lagrange problem, When the energy is negative, the toric domain defined for the bounded component near the positive mass of the regularized energy hypersurface with one positive mass and one absolutely smaller non-positive masses is convex. Together with Gabriella Pinzari's result, the toric domain defined above is concave when the second mass is non-negative, convex when the second mass is non-positive.