Elliptic pseudoprime

Template:Short description In number theory, a pseudoprime is called an elliptic pseudoprime for (E, P), where E is an elliptic curve defined over the field of rational numbers with complex multiplication by an order in ${\displaystyle \mathbb{Q}\left(\sqrt{-d}\right)}$, having equation y² = x³ + ax + b with a, b integers, P being a point on E and n a natural number such that the Jacobi symbol (−d | n) = −1, if Template:Nowrap.

The number of elliptic pseudoprimes less than X is bounded above, for large X, by

${\displaystyle X/\exp ((1/3)\log X\log \log \log X/\log \log X).}$

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