The Determinant and Volume of 2-Bridge Links and Alternating 3-Braids
Abstract
We examine the conjecture, due to Champanerkar, Kofman, and Purcell that vol(K) < 2 π (K) for alternating hyperbolic links, where vol(K) = vol(S3 K) is the hyperbolic volume and (K) is the determinant of K. We prove that the conjecture holds for 2-bridge links, alternating 3-braids, and various other infinite families. We show the conjecture holds for highly twisted links and quantify this by showing the conjecture holds when the crossing number of K exceeds some function of the twist number of K.
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