Projective and anomalous representations of categories and their linearizations

Abstract

We invesigate the relation between projective and anomalous representations of categories, and show how to any anomaly J C 2Vect one can associate an extension CJ of C and a subcategory CJST of CJ with the property that: (i) anomalous representations of C with anomaly J are equivalent to Vect-linear functors E CJ Vect, and (ii) these are in turn equivalent to linear representations of CJST where "J acts as scalars". This construction, inspired by and generalizing the technique used to linearize anomalous functorial field theories in the physics literature, can be seen as a multi-object version of the classical relation between projective representations of a group G, with given 2-cocycle α, and linear representations of the central extension Gα of G associated with α.