Equivariant localization in factorization homology and applications in mathematical physics II: Gauge theory applications

Abstract

We give an account of the theory of factorization spaces, categories, functors, and algebras, following the approach of [Ras1]. We apply these results to give geometric constructions of factorization En algebras describing mixed holomorphic-topological twists of supersymmetric gauge theories in low dimensions. We formulate and prove several recent predictions from the physics literature in this language: We recall the Coulomb branch construction of [BFN1] from this perspective. We prove a conjecture from [CosG] that the Coulomb branch factorization E1 algebra A(G,N) acts on the factorization algebra of chiral differential operators Dch(Y) on the quotient stack Y=N/G. We identify the latter with the semi-infinite cohomology of Dch(N) with respect to g, following the results of [Ras3]. Both these results require the hypothesis that Y admits a Tate structure, or equivalently that Dch(N) admits an action of g at level =-Tate. We construct an analogous factorization E2 algebra F(Y) describing the local observables of the mixed holomorphic-B twist of four dimensional N=2 gauge theory. We apply the theory of equivariant factorization algebras of the prequel [Bu1] in this example: we identify S1 equivariant structures on F(Y) with Tate structures on Y=N/G, and prove that the corresponding filtered quantization of !F(Y) is given by the two-periodic Rees algebra of chiral differential operators on Y. This gives a mathematical account of the results of [Beem4]. Finally, we apply the equivariant cigar reduction principle of [Bu1] to explain the relationship between these results and our account of the results of [CosG] described above.