Quadratic points on the Fermat quartic over number fields

Abstract

Let C be a curve defined over a number field K. A point P∈ C(Q) is called K-quadratic if [K(P):K]=2. Let K be a number field such that the rank of the elliptic curves E1:\,y2= x3 + 4x and E2:\,y2= x3 - 4x over K are 0. Under the above condition, we prove that the set of K-quadratic points on the Fermat quartic F4 X4+Y4=Z4 is finite and computable and we provide a procedure to compute this finite set. In particular, we explicitly compute all the K-quadratic points if [K:Q]<8. Moreover, if the degree of K is odd, we prove that all the K-quadratic points corresponds just to the Q-quadratic points