Some very low-dimensional algebraic topology
Abstract
The Euclidean renormalization bundle considered in QFT by Connes, Kreimer, and Marcolli has been extended, in a remarkable series of papers by S Agarwala, to Riemannian manifolds (X,g): in particular by the construction of a flat connection on that bundle, regarded as defined over a thickening of X by an infinitesimal disk. The theory of Fourier integral operators on manifolds reconciles dimensional and zeta-function regularization by interpreting this disk as the germ of a neighborhood of a Jordan curve around ∞ on the Riemann sphere. Such fields X S2 were proposed in 14 as useful in these contexts.
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