betartom

Betartom is a fictional mathematical construct used in theoretical discussions to explore how discrete combinatorial data can encode continuous geometric structure. In its typical formulation, a betartom consists of an orientable surface S of genus g together with a labeled graph G embedded in S. The edges of G are assigned labels from a finite set, and local rules at each vertex require a balance among the incident labels, yielding a consistent global structure. The goal is that certain invariants derived from the combinatorial data of G correspond to geometric invariants of S, and vice versa.

The term betartom is coined in speculative mathematics and related science-fiction narratives to denote this class

Betartoms typically exhibit a duality that exchanges vertices and faces of the embedded graph, producing a

The simplest betartom uses a torus with a triangular lattice and labels drawn from a three-element set

Betartoms are used as a didactic tool to illustrate how discrete models can reflect continuous geometry, and