Physics – High Energy Physics – High Energy Physics - Theory
Scientific paper
1993-05-06
Physics
High Energy Physics
High Energy Physics - Theory
LaTeX, 33 pages, preprint PAR-LPTHE 22-93
Scientific paper
We give the description of discretized moduli spaces (d.m.s.) $\Mcdisc$ introduced in \cite{Ch1} in terms of a discrete de Rham cohomologies for each moduli space $\Mgn$ of a genus $g$, $n$ being the number of punctures. We demonstrate that intersection indices (cohomological classes) calculated for d.m.s. coincide with the ones for the continuum moduli space $\Mc$ compactified by Deligne and Mumford procedure. To show it we use a matrix model technique. The Kontsevich matrix model is a generating function for these indices in the continuum case, and the matrix model with the potential $N\alpha \tr {\bigl(- \fr 12 \L X\L X +\log (1-X)+X\bigr)}$ is the one for d.m.s. In the last case the effects of reductions become relevant, but we use the stratification procedure in order to express integrals over open spaces $\Mdisc$ in terms of intersection indices which are to be calculated on compactified spaces. The coincidence of the cohomological classes for both continuum and d.m.s. models enables us to propose the existence of a quantum group structure on d.m.s. Then d.m.s. are nothing but cyclic (exceptional) representations of a quantum group related to a moduli space $\Mc$. Considering the explicit expressions for integrals of Chern classes over $\Mc$ and $\Mcdisc$ we conjecture that each moduli space $\Mc$ in the Kontsevich parametrization can be presented as a coset $\Mc ={\bf T}^d/G$, $d=3g-3+n$, where ${\bf T}^d$ is some $d$--dimensional complex torus and $G$ is a finite order symmetry group of ${\bf T}^d$.
Chekhov Leonid
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