BPS Spectra of complex knots
Abstract
Marino's conjecture remains underexplored within the framework of SO(N ) string dualities. In this article, we investigated the reformulated invariants of a one-parameter family of knots [ K]p derived from tangle surgery on Manolescu's quasi-alternating knot diagrams. Within topological string dualities, we have verified Marino's integrality conjecture for these families of knots up to the Young diagram representation R, with | R|≤ 2. Furthermore, through our analysis, we have conjectured the closed structure of extremal refined BPS integers for the torus knots [ 31]2p+1 and [ 820]2p+1, p ∈ Z≥ 0. As the parameter p of the knot diagram increases, the total crossing number of a knot exceeds 16, which we describe as a complex knot. Interestingly, we discovered a maximum number of gaps in the BPS spectra associated with complex knot families. Moreover, our observations indicated that as p increases, the size of these gaps also expands.
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