On non-congruent numbers with 8a1 type odd prime factors and tame kernels
Abstract
Let n be a positive square-free integer, where every odd prime factor of n has form 8a 1. We determine when n is non-congruent with second minimal 2-primary Shafarevich-Tate group, in terms of the 4-ranks of class groups and a Jacobi symbol. In particular, when every odd prime factor of n has form 8a+1, this condition is equivalent to the vanishing of the 4-rank of the tame kernel of Q(n) for odd n, or Q(-n) for even n. This generalizes previous results.
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