| Bill Allombert on Wed, 09 Oct 2024 19:49:20 +0200 |
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| Re: question on mapping points from an elliptic curve back to a quartic |
On Wed, Oct 09, 2024 at 07:31:35PM +0200, Bill Allombert wrote: > On Wed, Oct 09, 2024 at 09:54:10AM -0700, American Citizen wrote: > > Suppose we consider a quartic with rational points > > > > Q(x,y) : -x^4 + 39/380*x^3 + 39/380*x + 1 = y^2 > > > > Question: > > > > Why are most of the points in the elliptic curve pool L unmappable back to > > Q(x,y)? This is surprising to me, as I believed that all the rational points > > on E were mappable back to Q(x,y)? > > Q is a 2-cover of E, so only the points in [2]E(\Q) are mappable back to Q. And to answer your question quantitatively: E ~ Z^3 x Z/2Z [2]E ~ (2Z)^3 x 0Z/2Z E/[2]E ~ (Z/2Z)^4 [E:[2]E]=16 so a point on E has proba 1/16 to be mappable back to Q. Cheers, Bill