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Nearly-linear solution to the word problem for 3-manifold groups

We show that the word problem for any 3-manifold group is solvable in time $O(n\log^3 n)$. Our main contribution is the proof that the word problem for admissible graphs of groups, in the sense of Croke and Kleiner, is solvable in $O(n\log n)$; this covers fundamental groups of non-geometric graph manifolds. Similar methods also give that the word problem for free products can be solved ``almost as quickly'' as the word problem in the factors.

preprint2026arXivOpen access

Alessandro Sisto Stefanie Zbinden

math.GR math.GT

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Alessandro Sisto Stefanie Zbinden

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