The arithmetic of a twist of the Fermat quartic

Abstract

We study the arithmetic of the twist of the Fermat quartic defined by X4 + Y4 + Z4 = 0 which has no Q-rational point. We calculate the Mordell--Weil group of the Jacobian variety explicilty. We show that the degree 0 part of the Picard group is a free Z/2Z-module of rank 2, whereas the Mordell--Weil group is a free Z/2Z-module of rank 3. Thus the relative Brauer group is non-trivial. We also show that this quartic violates the local-global property for linear determinantal representations.