Infinite-dimensional Lie algebras determined by the space of symmetric squares of hyperelliptic curves

Abstract

We construct Lie algebras of vector fields on universal bundles of symmetric squares of hyperelliptic curves of genus g = 1, 2,.. For each of these Lie algebras, the Lie subalgebra of vertical fields has commuting generators, while the generators of the Lie subalgebra of projectable fields determines the canonical representation of the Lie subalgebra with generators L₂q, q = −1, 0, 1, 2,.., of the Witt algebra. As an application, we obtain integrable polynomial dynamical systems.

Metadata

Authors/Creators:

Buchstaber, VM
Mikhailov, AV

(c) 2017, Springer Science+Business Media New York. This is an author produced version of a paper published in Functional Analysis and Its Applications. Uploaded in accordance with the publisher's self-archiving policy. The final publication is available at Springer via https://doi.org/10.1007/s10688-017-0164-5

Keywords:

infinite-dimensional Lie algebras; representations of the Witt algebra; symmetric polynomials; symmetric powers of curves; commuting operators; polynomial dynamical systems

Dates: