Swapping algebra, Virasoro algebra and discrete integrable system

Abstract

We induce a Poisson algebra \·,·\Cn,N on the configuration space Cn,N of N twisted polygons in RPn-1 from the swapping algebra L12, which is found coincide with Faddeev-Takhtajan-Volkov algebra for n=2. There is another Poisson algebra \·,·\S2 on C2,N induced from the first Adler-Gelfand-Dickey Poissson algebra by Miura transformation. By observing that these two Poisson algebras are asymptotically related to the dual to the Virasoro algebra, finally, we prove that \·,·\C2,N and \·,·\S2 are Schouten commute.