Pseudo-isotopies of 3-manifolds with infinite fundamental groups

Abstract

Suppose Y is a compact, connected, oriented 3-manifold possibly with boundary, such that π1(Y) is infinite. Let Diff∂(I× Y) denote the group of self-diffeomorphisms of I× Y that are equal to the identity near the boundary. Let DiffPI(I× Y) denote the subgroup of Diff∂(I× Y) consisting of elements pseudo-isotopic to the identity. Define Homeo∂(I× Y), HomeoPI(I× Y) similarly for homeomorphisms. We show that the canonical map π0DiffPI(I× Y) π0HomeoPI(I× Y) is of infinite rank. As a consequence, π0DiffPI(I× Y), π0Diff∂(I× Y), π0HomeoPI(I× Y), π0Homeo∂(I× Y) are all abelian groups of infinite rank. We also prove that π0\,C(Y) contains an abelian subgroup of infinite rank, and π0\,C(I× Y) admits a surjection to an abelian group of infinite rank, where C(X) denotes the concordance automorphism group Diff(I× X, \0\× X I× ∂ X) or Homeo(I× X, \0\× X I× ∂ X). These results are proved by studying the actions of barbell diffeomorphisms on the spaces of embedded arcs and configuration spaces.