Hamiltonian evolutions of twisted gons in n

Abstract

In this paper we describe a well-chosen discrete moving frame and their associated invariants along projective polygons in n, and we use them to write explicit general expressions for invariant evolutions of projective N-gons. We then use a reduction process inspired by a discrete Drinfeld-Sokolov reduction to obtain a natural Hamiltonian structure on the space of projective invariants, and we establish a close relationship between the projective N-gon evolutions and the Hamiltonian evolutions on the invariants of the flow. We prove that any Hamiltonian evolution is induced on invariants by an evolution of N-gons - what we call a projective realization - and we give the direct connection. Finally, in the planar case we provide completely integrable evolutions (the Boussinesq lattice related to the lattice W3-algebra), their projective realizations and their Hamiltonian pencil. We generalize both structures to n-dimensions and we prove that they are Poisson. We define explicitly the n-dimensional generalization of the planar evolution (the discretization of the Wn-algebra) and prove that it is completely integrable, providing also its projective realization.