The Supersingularity of Hurwitz Curves
Abstract
We study when Hurwitz curves are supersingular. Specifically, we show that the curve Hn,: XnY + YnZ + ZnX = 0, with n and relatively prime, is supersingular over the finite field Fp if and only if there exists an integer i such that pi -1 (n2 - n + 2). If this holds, we prove that it is also true that the curve is maximal over Fp2i. Further, we provide a complete table of supersingular Hurwitz curves of genus less than 5 for characteristic less than 37.
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