Sharp bounds for the valence of certain logharmonic polynomials
Abstract
Consider a logharmonic polynomial; that is, a product of the form p(z)q(z), where p, q are holomorphic polynomials. Assume q is linear and denote by n the degree of p. It was recently shown in arXiv:2302.04339 [math.CV] that the valence of such a logharmonic polynomial is at most 3n-1; in this paper we show that their 3n-1 upper bound is sharp. Together with the work of arXiv:2302.04339 [math.CV], this resolves a conjecture of Bshouty and Hengartner.
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