The Lang-Trotter conjecture on average for genus-2 curves with Klein-4 reduced automorphism group

Abstract

For an elliptic curve E over Q without complex multiplication, Lang and Trotter conjecture \[ \# \ p<X E has a supersingular reduction at p \ cX X \] as X → ∞, where c>0 is a constant depending only on E. Fourvy and Murty obtained an average estimation related to the Lang-Trotter conjecture, called the Lang-Trotter conjecture on average. We considered the Lang-Trotter conjecture for curves of genus 2, and obtained a similar result to the Lang-Trotter conjecture on average for the family of curves Cλ:y2=x(x-1)(x+1)(x-λ)(x-1/ λ). Such curves are characterized as curves of genus two with reduced automorphism group containing the Klein 4-group.