On the Rosenhain forms of superspecial curves of genus two

Abstract

In this paper, we examine superspecial genus-2 curves C: y2 = x(x-1)(x-λ)(x-μ)(x-) in odd characteristic p. As a main result, we show that the difference between any two elements in \0,1,λ,μ,\ is a square in Fp2. Moreover, we show that C is maximal or minimal over Fp2 without taking its Fp2-form (we also give a criterion in terms of p that tells whether C is maximal or minimal). As these applications, we study the maximality of superspecial hyperelliptic curves of genus 3 and 4 whose automorphism groups contain Z/2Z × Z/2Z.