An optimal algorithm to generate rooted trivalent diagrams and rooted triangular maps

Abstract: a b s t r a c tA trivalent diagram is a connected, two-colored bipartite graph (parallel edges allowed but not loops) such that every black vertex is of degree 1 or 3 and every white vertex is of degree 1 or 2, with a cyclic order imposed on every set of edges incident to the same vertex. A rooted trivalent diagram is a trivalent diagram with a distinguished edge, its root. We shall describe and analyze an algorithm giving an exhaustive list of rooted trivalent diagrams of a given size (number of edges), the l… Show more

“…With its help we were able to generate all subgroups of index µ ≤ 30. However later we discovered a paper by Vidal [25] which describes a much more efficient and essentially optimal algorithm for the same task. We plan to extend the database with higher index subgroups in the foreseeable future.…”

A Database of Modular Forms on Noncongruence Subgroups

“…With its help we were able to generate all subgroups of index µ ≤ 30. However later we discovered a paper by Vidal [25] which describes a much more efficient and essentially optimal algorithm for the same task. We plan to extend the database with higher index subgroups in the foreseeable future.…”

A Database of Modular Forms on Noncongruence Subgroups

Asymptotics and random sampling for BCI and BCK lambda terms

Modular groups and planar maps