Around the combinatorial unit ball of measured foliations on bordered surfaces

Abstract

The volume B comb(G) of the unit ball -- with respect to the combinatorial length function G -- of the space of measured foliations on a stable bordered surface appears as the prefactor of the polynomial growth of the number of multicurves on . We find the range of s ∈ R for which (B comb)s, as a function over the combinatorial moduli spaces, is integrable with respect to the Kontsevich measure. The results depends on the topology of , in contrast with the situation for hyperbolic surfaces where Arana-Herrera and Athreya (arXiv:1907.06287) recently proved an optimal square-integrability.

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