the arithmetic of elliptic curves

For a basic exposition of the subject the reader should start with the entry elliptic curve (http://planetmath.org/EllipticCurve) (defines elliptic curve, the group law and gives some examples with graphs, also treats elliptic curves over the complex numbers).

Some basic objects attached to an elliptic curve: $j$-invariant (http://planetmath.org/JInvariant), discriminant and invariant differential. The $j$-invariant classifies elliptic curves up to isomorphism (http://planetmath.org/JInvariantClassifiesEllipticCurvesUpToIsomorphism).

Isogeny, the dual isogeny and the Frobenius morphism.

Elliptic curves over finite fields: good reduction, bad reduction, multiplicative reduction, additive reduction, cusp, node.

One of the most important objects that one can associate to an elliptic curve is the $L$-series (http://planetmath.org/LSeriesOfAnEllipticCurve) (the entry defines the $L$-series of an elliptic curve (http://planetmath.org/LSeriesOfAnEllipticCurve) and also talks about analytic continuation).

The conductor of an elliptic curve is an integer quantity that measures the arithmetic complexity of the curve (the entry contains examples).

The Tate module of an elliptic curve (it is also defined in the entry inverse limit).

The canonical height on an elliptic curve (over $\mathbb{Q}$).

The height matrix and the elliptic regulator of an elliptic curve.

See bad reduction (http://planetmath.org/BadReduction2).

The criterion of Néron-Ogg-Shafarevich.

Supersingular reduction.

Hasse’s bound for elliptic curves over finite fields.

The structure of $E(K)$ is given by the Mordell-Weil theorem (see also this entry (http://planetmath.org/RankOfAnEllipticCurve)). The main two ingredients of the proof of the theorem are the concept of height function and the so-called descent theorem.

The free rank of the abelian group $E(K)$ is called the rank of an elliptic curve (http://planetmath.org/RankOfAnEllipticCurve) (the entry contains examples).

Together with the Mordell-Weil group, one defines two other rather important groups: the Selmer groups and the Tate-Shafarevich group. The Tate-Shafarevich group (or “Sha”) measures the failure of the Hasse principle on the elliptic curve.

Some examples: Mordell curves.

The Nagell-Lutz Theorem.

Mazur’s theorem on torsion of elliptic curves (a classification of all possible torsion subgroups).

Examples of torsion subgroups of elliptic curves (includes examples of all possible subgroups).

A way to determine the torsion group: the torsion subgroup of an elliptic curve injects in the reduction of the curve.

Read about the rank (http://planetmath.org/RankOfAnEllipticCurve).

A bound for the rank of an elliptic curve.

Definition of the endomorphism ring (http://planetmath.org/EndomorphismRing) and complex multiplication.

Examples of elliptic curves with complex multiplication.

A connection between complex multiplication and class field theory: abelian extensions of quadratic imaginary number fields.

Definition of Grössencharacters, in general.

Fermat’s Last Theorem was finally solved using the theory of elliptic curves and modular forms.

The Birch and Swinnerton-Dyer conjecture (relating the $L$-series of an elliptic curve with the algebraic rank).

The Taniyama-Shimura-Weil Conjecture (now a theorem!).

Cryptography and Number Theory.

The elliptic curve discrete logarithm problem.

The Diffie-Hellman key exchange.