Automatic groups have word problem solvable in quadratic time. More strongly, a given word can actually be put into canonical form in quadratic time, based on which the word problem may be solved by testing whether the canonical forms of two words represent the same element (using the multiplier for ${\displaystyle a=1}$ ).^[4]

Automatic groups are characterized by the fellow traveler property.^[5] Let ${\displaystyle d(x,y)}$  denote the distance between ${\displaystyle x,y\in G}$  in the Cayley graph of ${\displaystyle G}$ . Then, G is automatic with respect to a word acceptor L if and only if there is a constant ${\displaystyle C\in \mathbb {N} }$  such that for all words ${\displaystyle u,v\in L}$  which differ by at most one generator, the distance between the respective prefixes of u and v is bounded by C. In other words, ${\displaystyle \forall u,v\in L,d(u,v)\leq 1\Rightarrow \forall k\in \mathbb {N} ,d(u_{|k},v_{|k})\leq C}$  where ${\displaystyle w_{|k}}$  for the k-th prefix of ${\displaystyle w}$  (or ${\displaystyle w}$  itself if ${\displaystyle k>|w|}$ ). This means that when reading the words synchronously, it is possible to keep track of the difference between both elements with a finite number of states (the neighborhood of the identity with diameter C in the Cayley graph).

The automatic groups include:

• Finite groups. To see this take the regular language to be the set of all words in the finite group.
• Euclidean groups
• All finitely generated Coxeter groups^[6]
• Geometrically finite groups

• Baumslag–Solitar groups
• Non-Euclidean nilpotent groups

A group is biautomatic if it has two multiplier automata, for left and right multiplication by elements of the generating set, respectively. A biautomatic group is clearly automatic.^[7]

Examples include:

• Hyperbolic groups.^[8]
• Any Artin group of finite type, including braid groups.^[8]

The idea of describing algebraic structures with finite-automata can be generalized from groups to other structures.^[9] For instance, it generalizes naturally to automatic semigroups.^[10]

• Chiswell, Ian (2008), A Course in Formal Languages, Automata and Groups, Springer, ISBN 978-1-84800-939-4.