G-invariant quasimorphisms and symplectic geometry of surfaces

Abstract

Let G be a group and G its normal subgroup. In this paper, we study G-invariant quasimorphisms on G which appear in symplectic geometry and low dimensional topology. As its application, we prove the non-existence of a section of the flux homomorphism on closed surfaces of higher genus. We also prove that Py's Calabi quasimorphism and Entov-Polterovich's partial Calabi quasimorphism are non-extendable to the group of symplectomorphisms. We show that Py's Calabi quasimorphism is the unique non-extendable quasimorphism to some group.