Litcius/Paper detail

Lie 2-algebras of vector fields

Daniel Berwick-Evans, Eugene Lerman

2020Pacific Journal of Mathematics27 citationsDOIOpen Access PDF

Abstract

We show that the category of vector fields on a geometric stack has the structure of a Lie 2-algebra. This proves a conjecture of R.~Hepworth. The construction uses a Lie groupoid that presents the geometric stack. We show that the category of vector fields on the Lie groupoid is equivalent to the category of vector fields on the stack. The category of vector fields on the Lie groupoid has a Lie 2-algebra structure built from known (ordinary) Lie brackets on multiplicative vector fields of Mackenzie and Xu and the global sections of the Lie algebroid of the Lie groupoid. After giving a precise formulation of Morita invariance of the construction, we verify that the Lie 2-algebra structure defined in this way is well-defined on the underlying stack.

Topics & Concepts

Lie algebroidMathematicsLie bracket of vector fieldsStack (abstract data type)Fundamental vector fieldLie algebraLie coalgebraPure mathematicsGraded Lie algebraVector fieldAlgebra over a fieldLie theoryLie conformal algebraMultiplicative functionAdjoint representation of a Lie algebraComputer scienceMathematical analysisGeometryProgramming languageHomotopy and Cohomology in Algebraic TopologyAdvanced Topics in AlgebraAlgebraic structures and combinatorial models