Determining Factorial Speed Fast

Abstract

The speed of a graph class G measures how many labeled graphs on n vertices one can find in G. This graph class complexity function is explicitly provided on graphclasses.org. However, for many graph classes, their speed status is classified as unknown. In this paper, wWe show that any graph class representable by a finite binary language has at most factorial speed, meaning that its speed function behaves like 2(n n), and we use this criterion to classify many graph classes whose speed was previously unknown as factorial. As a consequence, inclusions between several graph classes can now be seen to be proper. We also prove that k-letter graphs have exponential speed, i.e., the speed function lies in 2(n).