Some remarks on BRS transformations, anomalies and the cohomology of the Lie algebra of the group of gauge transformations

Abstract: We show that ghosts in gauge theories can be interpreted as Maurer-Cartan forms in the infinite dimensional group ^ of gauge transformations. We examine the cohomology of the Lie algebra of ^ and identify the coboundary operator with the BRS operator. We describe the anomalous terms encountered in the renormalization of gauge theories (triangle anomalies) as elements of these cohomology groups.

“…The anomalies associated to a linearly realised group are well known, and are classified by symmetric Casimirs. A nice way to derive such anomalies is by means of the 'Russian formula' [36][37][38][39] 29) to derive a (d + δ k )-cocycle from any symmetric Casimirs by use of the Cartan homotopy formula. In four dimensions, the relevant Casimir is the symmetric tensor of rank three, and the Cartan homotopy formula gives…”

E 7(7) symmetry in perturbatively quantised $ \mathcal{N} = 8 $ supergravity

“…The anomalies associated to a linearly realised group are well known, and are classified by symmetric Casimirs. A nice way to derive such anomalies is by means of the 'Russian formula' [36][37][38][39] 29) to derive a (d + δ k )-cocycle from any symmetric Casimirs by use of the Cartan homotopy formula. In four dimensions, the relevant Casimir is the symmetric tensor of rank three, and the Cartan homotopy formula gives…”

E 7(7) symmetry in perturbatively quantised $ \mathcal{N} = 8 $ supergravity

“…This explains why the definition of these general transformations requires to introduce the ghost field. In fact, in Bonora & Cotta-Ramusino (1983), it was shown that the ghost field can be identified with the Maurer-Cartan form of the gauge group G , that is to say with the form η ∈ Lie(G ) * ⊗ Lie(G ) that satisfies η(ξ) = ξ, ∀ξ ∈ Lie(G ). This means that the ghost η is a Lie(G )-valued 1-form dual to Lie(G ).…”

“…Instead of attaching a copy V x of the vector space V to each point x ∈ M , we now attach the space R x of all bases s in V x . The structure group G rotates the bases in R x by means of the free and transitive right action R x × G → R x , with (s, g) → s ′ = s · g. 9 We will now characterize the kind of objects that the spaces R x are. If a basis s 0 (x) in a fiber R x is arbitrarily chosen, an isomorphism ϕ s 0 (x) between R x and the structure group G is induced.…”

“…According to this description, if a fiber bundle is not generally a cartesian product at the global level, it would nevertheless be so at the local level. The originality of the fiber bundle formalism would be that allows us to treat 9 The vector bundle E → M can be defined as a bundle associated to the Gprincipal fiber bundle P → M by identifying E with P × G V , where the right action of G on P × V is given by (s, v) · g = (s · g, ρ(g −1 )v). 10 In general this can only be done locally, that is to say on each open set…”

Geometric foundations of classical Yang–Mills theory

“…An useful and powerful method to find the non-trivial solutions of Eq. (1) is given by the descent-equations technique [5,6,7,8,9,10,11,12,13,14]. Writing ∆ = A Eq.…”

Some remark on consistent anomalies in gauge theories