On the mapping class group of 4-dimensional 1-handlebodies via Budney-Gabai invariants
Abstract
We define an invariant (W3)m for π0Diff(m S1× D3,∂) for m≥ 1 that generalizes Budney--Gabai's W3 invariant. We give a computational framework inspired by Budney--Gabai and use it to calculate the invariant for all unknotted barbell difeomorphisms of m S1× D3 for m=1,2. This allows us to detect more linearly independent elements in π0Diff(S1× D3,∂), and to prove that π0Diff( 2 S1× D3,∂)/ ( π0 Diff(S1× D3,∂))2 admits infinitely generated subgroups generated by unknotted barbell diffeomorphisms, leading to infinitely many properly embedded separating 3-balls that are non-isotopic relative to the boundary.
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