Twisted conjugacy in dihedral Artin groups I: Torus Knot groups

Abstract

In this paper we provide an alternative solution to a result by Juh\'asz that the twisted conjugacy problem for odd dihedral Artin groups is solvable, that is, groups with presentation G(m) = a,b \; | \; m(a,b) = m(b,a) , where m≥ 3 is odd, and m(a,b) is the word abab … of length m, is solvable. Our solution provides an implementable linear time algorithm, by considering an alternative group presentation to that of a torus knot group, and working with geodesic normal forms. An application of this result is that the conjugacy problem is solvable in extensions of odd dihedral Artin groups.