Rationality problem for norm one tori for A5 and PSL2(F8) extensions

Abstract

We give a complete answer to the rationality problem (up to stable k-equivalence) for norm one tori T=R(1)K/k(Gm) of K/k whose Galois closures L/k are A5 PSL2(F4) and PSL2(F8) extensions. In particular, we prove that T is stably k-rational for G= Gal(L/k) PSL2(F8), H= Gal(L/K) (C2)3 and H (C2)3 C7 where Cn is the cyclic group of order n by using GAP computations with the aid of PARI/GP. Based on the result, we conjecture that T is stably k-rational for G PSL2(F2d), (C2)d≤ H≤ (C2)d C2d-1. Some other cases G An, Sn, GLn(Fpd), SLn(Fpd), PGLn(Fpd), PSLn(Fpd) and H G are also investigated for small n and pd.