Computing in Component Groups of Elliptic Curves

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Let K be a p-adic local field and E an elliptic curve defined over K. The component group of E is the group E(K)/E0(K), where E0(K) denotes the subgroup of points of good reduction; this is known to be finite, cyclic if E has multiplicative reduction, and of order at most 4 if E has additive reduction. We show how to compute explicitly an isomorphism E(K)/E0(K) = Z/NZ or E(K)/E0(K) = Z/2Z

J. E. Cremona

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Algorithms | ANTS 2008 | Elliptic Curve | Multiplicative Reduction | P-adic Local Field |

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Added	12 Oct 2010
Updated	12 Oct 2010
Type	Conference
Year	2008
Where	ANTS
Authors	J. E. Cremona

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Computing in Component Groups of Elliptic Curves

Algorithms | ANTS 2008 | Elliptic Curve | Multiplicative Reduction | P-adic Local Field |

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