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The perturbed Alexander invariant ₁, defined by Bar-Natan and van der Veen, is a powerful, easily computable polynomial knot invariant with deep connections to the Alexander and colored Jones polynomials. We study the behavior of ₁ for families of knots \Kₜ\ given by performing t full twists on a set of coherently oriented strands in a knot K₀ S³. We prove that as t the coefficients of ₁ grow asymptotically linearly, and we show how to compute this growth rate for any such family. As an application we give the first theorem on the ability of ₁ to distinguish knots in infinite families. Our methods also yield a new proof that the Alexander polynomial stabilizes under such twisting and we show how to compute the limit of Alexander polynomials, strengthening a recent result of Chen. Finally, we conjecture that ₁ obstructs knot positivity via a ``perturbed Conway invariant. ''
Joe Boninger (Wed,) studied this question.