Heegner point constructions and fundamental units in cubic fields

Abstract

We use Heegner points to prove the existence of nontorsion rational points on the elliptic curve y2 = x3 + D for any rational number D=a/b such that a and b are squarefree integers for which 6, a, and b are pairwise relatively prime, a b4, a b-15 or 79, and hK is odd, where K:=Q([3]D). In particular, we show that under these assumptions, the elliptic curve with equation y2 = x3 + D has algebraic rank 1 and the elliptic curve with equation y2 = x3 - D has algebraic rank 0. This follows from our new expression for the fundamental unit of OK in terms of the class number hK and the norm of a special value of a modular function of level 6, for any integer D relatively prime to 6, not congruent to 19, for which no exponent in its prime factorization is a multiple of 3. This expression is an analogue of a theorem of Dirichlet in 1840 relating the fundamental unit of a real quadratic field to its class number and a product of cyclotomic units.

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