Daniel Groves, Jason Fox Manning, Henry Wilton
Published 2012-10-07Version 1
Adyan and Rabin showed that most properties of groups cannot be algorithmically recognized from a finite presentation alone. We prove that, if one is also given a solution to the word problem, then the class of fundamental groups of closed, geometric 3-manifolds is algorithmically recognizable. In our terminology, the class of geometric 3-manifold groups is `recursive modulo the word problem'.
Geometry of the word problem for 3-manifold groups
Efficient algorithms for highly compressed data: The Word Problem in Higman's group is in P
On soficity for certain fundamental groups of graphs of groups
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