Delta form: Difference between revisions

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In mathematics, Delta is a modular form, arising from the discriminant of an elliptic curve. As a modular form it is a cusp form of weight 12 and level 1 for the full modular group. It is an eigenform for the Hecke algebra.

The q-expansion is

\Delta /(2\pi )^{12}=q\prod _{n=1}^{\infty }\left(1-q^{n}\right)^{24}=\sum _{n}\tau (n)q^{n},\,

where τ is Ramanujan's tau function. Since Δ is a Hecke eigenform, the tau function is multiplicative.

Dedekind's eta function is a 24-th root of Δ.

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	In [[mathematics]], '''Delta''' is a [[modular form]], arising from the [[discriminant of an elliptic curve]]. As a modular form it is a [[cusp form]] of [[weight of a modular form\|weight]] 12 and [[level of a modular form\|level]] 1 for the full [[modular group]]. It is an [[eigenform]] for the [[Hecke algebra]].		In [[mathematics]], '''Delta''' is a [[modular form]], arising from the [[discriminant of an elliptic curve]]. As a modular form it is a [[cusp form]] of [[weight of a modular form\|weight]] 12 and [[level of a modular form\|level]] 1 for the full [[modular group]]. It is an [[eigenform]] for the [[Hecke algebra]].