On fibrations of Lie groupoids

Abstract

As groupoids generalize groups, motivated by group extensions we consider a kind of fibrations of Lie groupoids, called locally topological product Lie groupoid fibrations with fiber A, i.e., \[ 1→ A → G → K→ 1 \] where A, G and K are Lie groupoids. Similar to the theory of group extensions, we show that the existence of locally topological product Lie groupoid fibrations with fiber A over K is obstructed by a groupoid cohomology of H3 ( K,Z A), and these locally topological product Lie groupoid fibrations are classified by H2 ( K,Z A) once exists. Here Z A is the center of A. This generalizes the theory of group extensions, of gerbes over manifolds/groupoids and etc.