Slice genus bound in $DTS^2$ from $s$-invariant

We prove a recent conjecture of Manolescu-Willis which states that the $s$-invariant of a knot in $\mathbb{RP}^3$ (as defined by them) gives a lower bound on its null-homologous slice genus in the unit disk bundle of $TS^2$. We also conjecture a lower bound in the more general case where the slice s...

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Bibliographic Details
Main Author	Ren, Qiuyu
Format	Journal Article
Language	English
Published	30.06.2023
Subjects	Mathematics - Geometric Topology Mathematics - Quantum Algebra
Online Access	Get full text

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Summary:	We prove a recent conjecture of Manolescu-Willis which states that the $s$-invariant of a knot in $\mathbb{RP}^3$ (as defined by them) gives a lower bound on its null-homologous slice genus in the unit disk bundle of $TS^2$. We also conjecture a lower bound in the more general case where the slice surface is not necessarily null-homologous, and give its proof in some special cases.
DOI:	10.48550/arxiv.2306.17816