Instantons and affine algebras I: The Hilbert scheme and vertex operators
Abstract
This is the first in a series of papers which describe the action of an affine Lie algebra with central charge n on the moduli space of U(n)-instantons on a four manifold X. This generalises work of Nakajima, who considered the case when X is an ALE space. In particular, this describes the combinatorial complexity of the moduli space as being precisely that of representation theory, and thus will lead to a description of the Betti numbers of moduli space as dimensions of weight spaces. This Lie algebra acts on the space of conformal blocks (i\.e\., the cohomology of a determinant line bundle on the moduli space) generalising the ``insertion'' and ``deletion'' operations of conformal field theory, and indeed on any cohomology theory. In the particular case of U(1)-instantons, which is essentially the subject of this present paper, the construction produces the basic representation after Frenkel-Kac. Then the well known quadratic nature of ch2, ch2 = 12 c1· c1 - c2 becomes precisely the formula for the eigenvalue of the degree operator, i\.e\. the well known quadratic behaviour of affine Lie algebras.
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