2-Selmer groups, 2-class groups, and congruent numbers

Abstract

In this article, we study necessary conditions for certain square-free integers to be congruent numbers. Our method uses divisibility properties of class numbers of related imaginary quadratic fields. We first consider positive square-free integers of the form n = p1 p2 ·s pt q, where each prime pi 5 8 and q 7 8. We show that if such an integer n is a congruent number, then the class number h(-n) of the quadratic field Q(-n) satisfies a specific divisibility condition. Furthermore, we provide quantitative lower bounds on the number of non-congruent numbers of this form. Next, we study integers of the form n = p1 p2 ·s pt q, with pi 5 8 and q 3 8. Assuming that n is a congruent number, we obtain a congruence modulo powers of 2 between the class numbers of the fields Q(-n) and Q\!(-p1 p2 ·s pt).