The a-numbers of non-hyperelliptic curves of genus 3 with cyclic automorphism group of order 6

Abstract

In this paper, we study non-hyperelliptic curves of genus 3 with cyclic automorphism group of order 6. Over an algebraically closed field K of characteristic ≠ 2,3, such curves are written as plane quartics Cr: x3 z + y4 + r y2 z2 + z4 = 0 with one parameter r. As the first main theorem, we show that r≠ 0, 2 and give a necessary and sufficient condition with respect to r and r' such that Cr Cr'. By describing the Hasse-Witt matrix of Cr in terms of a certain Gauss' hypergeometric series, we obtain the second main theorem, where we determine the possible a-number of Cr, and give the exact number of isomorphism classes over K of such curves attaining the possible maximal a-number.