Brieskorn spheres, cyclic group actions and the Milnor conjecture

Pub Date : 2024-06-04 DOI:10.1112/topo.12339

David Baraglia, Pedram Hekmati

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Abstract

In this paper we further develop the theory of equivariant Seiberg–Witten–Floer cohomology of the two authors, with an emphasis on Brieskorn homology spheres. We obtain a number of applications. First, we show that the knot concordance invariants $θ^{(c)}$ defined by the first author satisfy $θ^{(c)} (T_{a, b}) = (a - 1) (b - 1) / 2$ for torus knots, whenever $c$ is a prime not dividing $a b$ . Since $θ^{(c)}$ is a lower bound for the slice genus, this gives a new proof of the Milnor conjecture. Second, we prove that a free cyclic group action on a Brieskorn homology 3-sphere $Y = Σ (a_{1}, \dots, a_{r})$ does not extend smoothly to any homology 4-ball bounding $Y$ . In the case of a non-free cyclic group action of prime order, we prove that if the rank of $H F_{r e d}^{+} (Y)$ is greater than $p$ times the rank of $H F_{r e d}^{+} (Y / Z_{p})$ , then the $Z_{p}$ -action on $Y$ does not extend smoothly to any homology 4-ball bounding $Y$ . Third, we prove that for all but finitely many primes a similar non-extension result holds in the case that the bounding 4-manifold has positive-definite intersection form. Finally, we also prove non-extension results for equivariant connected sums of Brieskorn homology spheres.

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布里斯科恩球、循环群作用和米尔诺猜想

在本文中，我们进一步发展了两位作者的等变塞伯格-维滕-弗洛尔同调理论，重点是布里斯科恩同调球。我们获得了一些应用。首先，我们证明了第一作者定义的结协和不变式 θ ( c ) $\theta ^{(c)}$ 满足 θ ( c ) ( T a , b ) = ( a - 1 ) ( b - 1 ) / 2 $\theta ^{(c)}(T_{a,b}) = (a-1)(b-1)/2$ 对于环结来说，只要 c $c$ 是不除以 a b $ab$ 的素数。由于 θ ( c ) $\theta ^{(c)}$ 是片属的下限，这就给出了米尔诺猜想的新证明。其次，我们证明了在布里斯科恩同调 3 球 Y = Σ ( a 1 , ⋯ , a r ) $Y = \Sigma (a_1, \dots, a_r)$ 上的自由循环群作用不会平滑地扩展到任何与 Y $Y$ 边界的同调 4 球。在素数阶的非自由循环群作用的情况下，我们证明如果 H F r e d + ( Y ) $HF_{red}^+(Y)$ 的秩大于 H F r e d + ( Y / Z p ) $HF_{red}^+(Y/\mathbb {Z}_p)$ 的秩的 p $p $ 倍，那么 Y $Y$ 上的 Z p $\mathbb {Z}_p$ 作用不会平滑地扩展到任何与 Y $Y$ 定界的同源 4 球。第三，我们证明，对于除有限多个素以外的所有情况，类似的非扩展结果在边界 4-manifold具有正定交形式的情况下成立。最后，我们还证明了布里斯科恩同调球等变连接和的非扩展结果。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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