Visibly Pushdown Languages in Groups

Abstract

In this paper we explore the connections between the class of Visibly Pushdown Languages (VPL) and the natural sets of words one can associate to a finitely generated group. We show that the word problem of a finitely generated group is VPL exactly when the group is finite. We also show that free reduction does not preserve VPL, and that finding solutions to equations in a free group with VPL constraints (as reduced words) is undecidable. We explore the structure of sets whose full preimage is VPL, showing these are often recognisable sets. We conjecture that, in any group, this class is precisely the recognisable sets.