Intersection theory on deligne-mumford compactifications (after Witten and Kontsevich)
Publication date
1993
Authors
Looijenga, E.J.N.
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Document Type
Article in proceedings
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Abstract
Physicists have developed two approaches to quantum gravity in dimension
two One involves an a priori ill de ned integral over all conformal structures
on a surface which after a suitable renormalization procedure produces a well
de ned integral over moduli spaces of curves In another they consider a weighted
average over piecewise at metrics on that surface and take a suitable limit of
such expressions The belief that these two approaches yield the same answer led
Witten to make a number of conjectures about the intersection numbers of certain
natural classes that live on the moduli space of stable pointed curves One of these
conjectures has been rigourously proved by Kontsevich