Automorphic forms and cubic twists of elliptic curves
Abstract
This paper surveys the connection between the elliptic curve ED: x3 + y3 = D and a certain metaplectic form on the cubic cover of GL(3) which has the property that its m,nth Whittaker--Fourier coefficient is essentially the L--series of the curve Em2n. One may obtain information about the collective behavior the curves ED by exploiting this connection; for example, one can prove: Theorem: Fix any prime p 3, and any congruence class c mod p. Then there are infinitely many D congruent to c mod p such that the curve ED has no rational solutions. This paper is fairly self-contained; no prior knowledge of algebraic number theory, analytic number theory or metaplectic forms is assumed. On the other hand, this paper is a survey, no proofs are included.
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