Multiquadratic fields generated by characters of An

Abstract

For a finite group G, let K(G) denote the field generated over Q by its character values. For n>24, G. R. Robinson and J. G. Thompson proved that K(An)=Q (\ p* \ : \ p≤ n \ an odd prime with p≠ n-2\), where p*:=(-1)p-12p. Confirming a speculation of Thompson, we show that arbitrary suitable multiquadratic fields are similarly generated by the values of An-characters restricted to elements whose orders are only divisible by ramified primes. To be more precise, we say that a π-number is a positive integer whose prime factors belong to a set of odd primes π:= \p1, p2,…, pt\. Let Kπ(An) be the field generated by the values of An-characters for even permutations whose orders are π-numbers. If t≥ 2, then we determine a constant Nπ with the property that for all n> Nπ, we have Kπ(An)=Q(p1*, p2*,…, pt*).