Generalized Dehn twists on surfaces and homology cylinders

Abstract

Let be a compact oriented surface. The Dehn twist along every simple closed curve γ ⊂ induces an automorphism of the fundamental group π of . There are two possible ways to generalize such automorphisms if the curve γ is allowed to have self-intersections. One way is to consider the `generalized Dehn twist' along γ: an automorphism of the Malcev completion of π whose definition involves intersection operations and only depends on the homotopy class [γ]∈ π of γ. Another way is to choose in the usual cylinder U:= × [-1,+1] a knot L projecting onto γ, to perform a surgery along L so as to get a homology cylinder UL, and let UL act on every nilpotent quotient π/j π of π (where jπ denotes the subgroup of π generated by commutators of length j). In this paper, assuming that [γ] is in k π for some k≥ 2, we prove that (whatever the choice of L is) the automorphism of π/2k+1 π induced by UL agrees with the generalized Dehn twist along γ and we explicitly compute this automorphism in terms of [γ] modulo k+2π. As applications, we obtain new formulas for certain evaluations of the Johnson homomorphisms showing, in particular, how to realize any element of their targets by some explicit homology cylinders and/or generalized Dehn twists.