Equivalence classes of dessins d'enfants with two vertices

Abstract

Let N be a positive integer. For any positive integer L≤ N and any positive divisor r of N, we enumerate the equivalence classes of dessins d'enfants with N edges, L faces and two vertices whose automorphism groups are cyclic of order r. Further, for any non-negative integer h, we enumerate the equivalence classes of dessins with N edges, h faces of degree 2 with h≤ N, and two vertices, whose automorphism groups are cyclic of order r. Our arguments are essentially based upon a natural one-to-one correspondence of the equivalence classes of all dessins with N edges to the equivalence classes of all pairs of permutations with components generating transitive subgroups of the symmetric group of degree N.