Ozsváth-Szabó d-invariants of almost simple linear graphs

In this survey, we present the most recent highlights from the study of the homology cobordism group, with particular emphasis on its long-standing and rich history in the context of smooth manifolds. Further, we list various results on its algebraic structure and discuss its crucial role in the development of low-dimensional topology. Also, we share a series of open problems about the behavior of homology 3 3 -spheres and the structure of Θ Z 3 \Theta _{\mathbb {Z}}^3 . Finally, we briefly discuss the knot concordance group C \mathcal {C} and the rational homology cobordism group Θ Q 3 \Theta _{\mathbb {Q}}^3 , focusing on their algebraic structures, relating them to Θ Z 3 \Theta _{\mathbb {Z}}^3 , and highlighting several open problems. The appendix is a compilation of several constructions and presentations of homology 3 3 -spheres introduced by Brieskorn, Dehn, Gordon, Seifert, Siebenmann, and Waldhausen.

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Ozsváth-Szabó d-invariants of almost simple linear graphs

Abstract: We describe an effective method for simultaneously computing [Formula: see text]-invariants of infinite families of Brieskorn spheres [Formula: see text] with [Formula: see text].

Cited by 4 publications

References 17 publications

Positive scalar curvature and homology cobordism invariants

Positive scalar curvature and homology cobordism invariants

Almost simple linear graphs, homology cobordism and connected Heegaard Floer homology

A survey of the homology cobordism group

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