The flux homomorphism and central extensions of diffeomorphism groups

Abstract

Let D be a 2-dimensional closed unit disk and Symp(D,0)rel the group of symplectomorphisms preserving the origin and the boundary ∂ D pointwise. We consider the R-valued flux homomorphism on Symp(D,0)rel and define the central R-extension called the R-valued flux extension. We determine the Euler class of this extension and investigate the relation between the extension, the group 2-cocycle defined by Ismagilov, Losik, and Michor, and the Calabi invariant of D.