BSD is true for 141a

Summary of Proof:

1. For p=2 : Cremona verified this several years ago via a 2 -descent.
   
   
2. For all p�3  with p==7 : Kolyvagin's bound implies that p=j#Sha(E) .
   
   
3. For p=7 : we computed the 7 -adic regulator, found that it was nonzero. Then using that the mod-7  representation is surjective, the bounds coming from Iwasawa theory, and thoerems of Kato, Perrin-Riou, Schneider, and others imply that ord7(Sha(E))=0 .
   
   
4. We conclude that the full BSD conjecture is true for the elliptic curve 141a.

Key Point

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