Finitely generated subgroups of free groups as formal languages and their cogrowth
Abstract
For finitely generated subgroups H of a free group Fm of finite rank m, we study the language LH of reduced words that represent H which is a regular language. Using the (extended) core of Schreier graph of H, we construct the minimal deterministic finite automaton that recognizes LH. Then we characterize the f.g. subgroups H for which LH is irreducible and for such groups explicitly construct ergodic automaton that recognizes LH. This construction gives us an efficient way to compute the cogrowth series LH(z) of H and entropy of LH. Several examples illustrate the method and a comparison is made with the method of calculation of LH(z) based on the use of Nielsen system of generators of H.
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