On polynomials counting essentially irreducible maps

Abstract

We consider maps on genus-g surfaces with n (labeled) faces of prescribed even degrees. It is known since work of Norbury that, if one disallows vertices of degree one, the enumeration of such maps is related to the counting of lattice point in the moduli space of genus-g curves with n labeled points and is given by a symmetric polynomial Ng,n(1,…,n) in the face degrees 21, …, 2n. We generalize this by restricting to genus-g maps that are essentially 2b-irreducible for b≥ 0, which loosely speaking means that they are not allowed to possess contractible cycles of length less than 2b and each such cycle of length 2b is required to bound a face of degree 2b. The enumeration of such maps is shown to be again given by a symmetric polynomial Ng,n(b)(1,…,n) in the face degrees with a polynomial dependence on b. These polynomials satisfy (generalized) string and dilaton equations, which for g≤ 1 uniquely determine them. The proofs rely heavily on a substitution approach by Bouttier and Guitter and the enumeration of planar maps on genus-g surfaces.