The Pontryagin and Euler-Lagrange Necessary Conditions

Following the path integral formalism for stochastic processes, we study formal properties of the extremal path, the Euler-Lagrange (E-L) equation and a first integral of it. A special interest is focused in the connection between this first integral and the boundary conditions. We are interested in

We prove the following results: 1. A unique smooth solution exists for a short time for the heat equation associated with the Möbius energy of loops in a euclidean space, starting with any simple smooth loop. 2. A critical loop of the energy is smooth if it has cube-integrable curvature. Combining

## Abstract Let \input amssym $S\subset{\Bbb R}^2$ be a bounded domain with boundary of class __C__^∞^, and let __g__~__ij__~ = δ~__ij__~ denote the flat metric on \input amssym ${\Bbb R}^2$. Let __u__ be a minimizer of the Willmore functional within a subclass (defined by prescribing boundary cond