Geodesic languages for rational subsets and conjugates in virtually free groups

dc.contributor.authorCarvalho, André
dc.contributor.authorSilva, Pedro
dc.contributor.editorHermiller, Susan
dc.date.accessioned2026-02-05T10:42:09Z
dc.date.available2026-02-05T10:42:09Z
dc.date.issued2026
dc.description.abstractWe prove that a subset of a virtually free group is rational if and only if the language of geodesic words representing its elements (in any generating set) is rational and that the language of geodesics representing conjugates of elements in a rational subset of a virtually free group is context-free. As a corollary, the doubly generalized conjugacy problem is decidable for rational subsets of finitely generated virtually free groups: there is an algorithm taking as input two rational subsets $K_1$ and $K_2$ of a virtually free group that decides whether there is one element of $K_1$ conjugate to an element of $K_2$. For free groups, we prove that the same problem is decidable with rational constraints on the set of conjugators.por
dc.description.sponsorshipFCTpor
dc.identifier.authoremailandre.carvalho@uevora.pt
dc.identifier.authoremailpvsilva@fc.up.pt
dc.identifier.citationA. Carvalho, P. V. Silva, Geodesic languages for rational subsets and conjugates in virtually free groups, J. Algebra, 694: 263-286 (2026)por
dc.identifier.doihttps://doi.org/10.1016/j.jalgebra.2025.12.034por
dc.identifier.revistaJournal of Algebra
dc.identifier.scientificarea333por
dc.identifier.urihttp://hdl.handle.net/10174/40826
dc.language.isoengpor
dc.peerreviewedyespor
dc.publisherJournal of Algebrapor
dc.rightsopenAccesspor
dc.subjectVirtually free groupspor
dc.subjectGeodesicspor
dc.subjectConjugacy problempor
dc.subjectFormal languagespor
dc.subjectSubsets of groupspor
dc.titleGeodesic languages for rational subsets and conjugates in virtually free groupspor
dc.typearticlepor

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