Algebraic curves with a large cyclic automorphism group

Abstract

The study of algebraic curves with numerous automorphisms in relation to their genus g() is a well-established area in Algebraic Geometry. In 1995, Irokawa and Sasaki Sasaki gave a complete classification of curves over C with an automorphism of order N ≥ 2g(X) + 1. Precisely, such curves are either hyperelliptic with N=2g()+2 with g() even, or are quotients of the Fermat curve of degree N by a cyclic group of order N. Such a classification does not hold in positive characteristic p, the curve with equation y2=xp-x being a well-studied counterexample. This paper successfully classifies curves with a cyclic automorphism group of order N at least 2g(X) + 1 in positive characteristic p ≠ 2, offering the positive characteristic counterpart to the Irokawa-Sasaki result. The possibility of wild ramification in positive characteristic has presented a few challenges to the investigation.

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