Bergman space, Conformally flat 2-disk operads and affine Heisenberg vertex algebra
Abstract
In this paper we consider the operad of holomorphic disk embeddings of the unit disk D ⊂ C. We introduce a suboperad CE2HS defined by square-integrability conditions and show that the symmetric algebra Sym A2( D) of the Bergman space carries a natural CE2HS-algebra structure. Conformally flat factorization homology with coefficients in Sym A2( D) then yields metric-dependent invariants of two-dimensional Riemannian manifolds. Moreover, Sym A2( D) is identified with the ind-Hilbert space completion of the affine Heisenberg vertex operator algebra.
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