On the number of planar orientations with prescribed degrees

Abstract

We deal with the asymptotic enumeration of combinatorial structures on planar maps. Prominent instances of such problems are the enumeration of spanning trees, bipartite perfect matchings, and ice models. The notion of orientations with out-degrees prescribed by a function α : V → ℕ unifies many different combinatorial structures, including the afore mentioned. We call these orientations α-orientations. The main focus of this paper are bounds for the maximum number of α-orientations that a planar map with n vertices can have, for different instances of α. We give examples of triangulations with 2:37n Schnyder woods, 3-connected planar maps with 3:209n Schnyder woods and inner triangulations with 2:91 n bipolar orientations. These lower bounds are accompanied by upper bounds of 3:56n, 8n and 3:97n respectively. We also show that for any planar map M and any α the number of α-orientations is bounded from above by 3:73n and describe a family of maps which have at least 2:598n α-orientations.