Duality of the Principle of Least Action: A New Formulation of Classical Mechanics

Abstract

A dual formalism for Lagrange multipliers is developed. The formalism is used to minimize an action function S(q2,q1,T) without any dynamical input other than that S is convex. All the key equations of analytical mechanics -- the Hamilton-Jacobi equation, the generating functions for canonical transformations, Hamilton's equations of motion and S as the time integral of the Lagrangian -- emerge as simple consequences. It appears that to a large extent, analytical mechanics is simply a footnote to the most basic problem in the calculus of variations: that the shortest distance between two points is a straight line.