Observables of Relative Structures and Lie 2-algebras associated with Quasi-Hamiltonian G-spaces

Abstract

A manifold is said to be n-plectic if it is equipped with a closed, nondegenerate (n+1)-form. This thesis develops the theory of relative n-plectic structures, where the classical condition is replaced by a closed, nondegenerate relative (n+1)-form defined with respect to a smooth map. Analogous to how n-plectic manifolds give rise to L∞-algebras of observables, we show that relative n-plectic structures naturally induce corresponding L∞-algebras. These structures provide a conceptual bridge between the frameworks of quasi-Hamiltonian G-spaces and 2-plectic geometry. As an application, we examine the relative 2-plectic structure canonically associated to quasi-Hamiltonian G-spaces. We show that every quasi-Hamiltonian G-space defines a closed, nondegenerate relative 3-form, and that the group action induces a Hamiltonian infinitesimal action compatible with this structure. We then construct explicit homotopy moment maps as L∞-morphisms from the Lie algebra g into the Lie 2-algebra of relative observables, extending the moment map formalism to the higher and relative geometric setting.