The $\theta$ invariant recovers the Rozansky-Overbay invariant

Ramana Murugesan

arXiv:2604.27029·math.GT·May 1, 2026

The $\theta$ invariant recovers the Rozansky-Overbay invariant

Ramana Murugesan

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TL;DR

This paper demonstrates that the $ heta$ invariant extends the Rozansky-Overbay invariant, providing a broader mathematical framework.

Contribution

It introduces a generalization of the Rozansky-Overbay invariant through the $ heta$ invariant, expanding its applicability.

Findings

01

$ heta$ invariant recovers the Rozansky-Overbay invariant

02

The generalization offers new insights into knot invariants

Abstract

In this paper we show that the $θ$ invariant generalizes the Rozansky-Overbay invariant.

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