Constant Tamagawa numbers of special elliptic curves
Abstract
For the elliptic curves Eσ 2D : y2 = x3 + σ 2Dx , which has 2-isogeny curve E'σ 2D : y2 = x3 -σ 8Dx, σ = 1,\ D = p1e1p2e2·s pnen, where pi are different odd prime numbers and ei = 1 or 3, we demonstrate that Tamagawa numbers of these elliptic curves are always one or zero by the use of matrix in finite field F2. The specific number depends on the value of σ. By our proofs of these results, we find a method to quickly sieve a part of the elliptic curves with Mordell-Weil rank zero or rank one in this form as an application.
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