The Non-Orientable Four-Ball Genus of a New Infinite Family of Torus Knots (2507.12606v1)

Abstract: We extend previous work by using a combination of band surgeries and known bounds to compute $\gamma_4(T_{4n, (2n\pm1)^2 + 4n-2}) = 2n-1$ for all $n \geq 1$. We further generalize this result by showing that $\gamma_4(T_{4n + 2k, n(4n + 2k) - 1}) = \gamma_4(T_{4n + 2k, (n+2)(4n + 2k) - 1}) = 2n-1 + k$ for all $n \geq 1$ and $k \geq 0$. All knots in this family are counterexamples to Batson's conjecture.