Trisections obtained by trivially regluing surface-knots
Abstract
Let S be a P2-knot which is the connected sum of a 2-knot with normal Euler number 0 and an unknotted P2-knot with normal Euler number 2 in a closed 4-manifold X with trisection TX. Then, we show that the trisection of X obtained by the trivial gluing relative trisections of (S) and X-(S) is diffeomorphic to a stabilization of TX. It should be noted that this result is not obvious since boundary-stabilizations introduced by Kim and Miller are used to construct a relative trisection of X-(S). As a corollary, if X=S4, the resulting trisection is diffeomorphic to a stabilization of the genus 0 trisection of S4. This result is related to the conjecture that is a 4-dimensional analogue of Waldhausen's theorem on Heegaard splittings.
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