The rank of 2-Selmer group associate to θ-congruent numbers

Abstract

We study the parity of rank of 2- Selmer groups associated to π/3 and 2π/3-congruent numbers. Our second result gives some positive densities about π/3 and 2π/3 non-congruent numbers which can support the even part of Goldfeld's conjecture. We give some necessary conditions such that n is non π/3-congruent number for elliptic curves En whose Shafarevich-Tate group is non-trivial. In the last section, we show that for n=pq 5(resp. \ 11)24, the density of non π/3(resp. 2π/3)-congruent numbers is at least 75\%, where p,q are primes.