L-infinity algebra connections and applications to String- and Chern-Simons n-transport
Hisham Sati, Urs Schreiber, Jim Stasheff
TL;DR
This paper generalizes Cartan-Ehresmann connections to L-infinity algebras, studying obstructions to lifting bundle structures and constructing higher Chern-Simons functionals relevant for string theory and higher gauge theories.
Contribution
It introduces a framework for L-infinity algebra connections, extending classical concepts to higher categorical structures and applying them to string and fivebrane obstructions.
Findings
Defined generalized Chern-Simons and BF-theory functionals
Described obstructions to String- and Fivebrane-structures
Connected higher bundle obstructions to Pontrjagin classes
Abstract
We give a generalization of the notion of a Cartan-Ehresmann connection from Lie algebras to L-infinity algebras and use it to study the obstruction theory of lifts through higher String-like extensions of Lie algebras. We find (generalized) Chern-Simons and BF-theory functionals this way and describe aspects of their parallel transport and quantization. It is known that over a D-brane the Kalb-Ramond background field of the string restricts to a 2-bundle with connection (a gerbe) which can be seen as the obstruction to lifting the PU(H)-bundle on the D-brane to a U(H)-bundle. We discuss how this phenomenon generalizes from the ordinary central extension U(1) -> U(H) -> PU(H) to higher categorical central extensions, like the String-extension BU(1) -> String(G) -> G. Here the obstruction to the lift is a 3-bundle with connection (a 2-gerbe): the Chern-Simons 3-bundle classified by the…
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