Factorization of formal exponentials and uniformization
Abstract
Let g be a Lie algebra in characteristic zero equipped with a vector space decomposition g=g- g+, and let s and t be commuting formal variables. We prove that the Campbell-Baker-Hausdorff map C:sg- [[s,t]]× tg+[[s,t]] sg-[[s,t]] tg+[[s,t]] given by esg-etg+=eC(sg-,tg+) for g∈g[[s,t]] is a bijection, as is well known when g is finite-dimensional over R or C, by geometry. It follows that there exist unique ∈g[[s,t]] such that etg+esg-= es-et+ (also well known in the finite-dimensional geometric setting). We apply this to g consisting of certain formal infinite series with coefficients in a Lie algebra p. For p the Virasoro algebra (resp., a Grassmann envelope of the Neveu-Schwarz superalgebra), the result was first proved by Huang (resp., Barron) as a step in the construction of a (super)geometric formulation of the notion of vertex operator (super)algebra. For the Virasoro (resp., N=1 Neveu-Schwarz) algebra with zero central charge the result gives the precise expansion of the uniformizing function for a sphere (resp., supersphere) with tubes resulting from the sewing of two spheres (resp., superspheres) with tubes in two-dimensional genus-zero holomorphic conformal (resp., N = 1 superconformal) field theory. The general result places such uniformization problems into a broad formal algebraic context.
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