On (bi)reversible automata generating lamplighter groups
Abstract
For any nontrivial abelian group X we construct a reversible (bireversible in case the order of X is odd) automaton such that its set of states and alphabet are identified with X, transition and output functions are defined via the left and the right regular actions correspondingly and its group splits into the restricted wreath product X Z, i.e. is a lamplighter group.
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