Hashing to elliptic curves of j=0 and Mordell--Weil groups

Abstract

Consider an ordinary elliptic curve Eb\!: y2 = x3 - b (of j-invariant 0) over a finite field F\!q such that [3]b F\!q. This article tries to resolve the problem of constructing a rational F\!q-curve on the Kummer surface of the direct product Eb \!×\! Eb, where Eb is the quadratic F\!q-twist of Eb. More precisely, we propose to search such a curve among infinite order F\!q-sections of some elliptic surface of j=0, analyzing its Mordell--Weil group. Unfortunately, we prove that it is just isomorphic to Z/3.