Chiral homology

In mathematics, chiral homology, introduced by Beilinson−Drinfeld, is, in their words, "a “quantum” version of (the algebra of functions on) the space of global horizontal sections of an affine ${\mathcal {D}}_{X}$ -scheme (i.e., the space of global solutions of a system of non-linear differential equations)."

Lurie's topological chiral homology gives an analog for manifolds.^[1]

References

↑ outline of "On the Classification of Topological Field Theories" in nLab

Ch. 4 of Beilinson−Drinfeld, Chiral algebras, available at

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Chiral homology

See also

References