In mathematics, the Ikeda lift is a lifting of modular forms to

Siegel modular form In mathematics, Siegel modular forms are a major type of automorphic form. These generalize conventional ''elliptic'' modular forms which are closely related to elliptic curves. The complex manifolds constructed in the theory of Siegel modular form ...

s. The existence of the lifting was conjectured by W. Duke and Ö. Imamoḡlu and also by T. Ibukiyama, and the lifting was constructed by . It generalized the Saito–Kurokawa lift from modular forms of weight 2''k'' to genus 2 Siegel modular forms of weight ''k'' + 1.

Statement

Suppose that ''k'' and ''n'' are positive integers of the same parity. The Ikeda lift takes a

Hecke eigenform In mathematics, an eigenform (meaning simultaneous Hecke eigenform with modular group SL(2,Z)) is a modular form which is an eigenvector for all Hecke operators ''Tm'', ''m'' = 1, 2, 3, .... Eigenforms fall into the realm ...

of weight 2''k'' for SL₂(Z) to a Hecke eigenform in the space of Siegel modular forms of weight ''k''+''n'', degree 2''n''.

Example

The Ikeda lift takes the Delta function (the weight 12 cusp form for SL₂(Z)) to the Schottky form, a weight 8 Siegel cusp form of degree 4. Here ''k''=6 and ''n''=2.

References

* *{{citation, mr=1884618 , last=Ikeda, first= Tamotsu , title=On the lifting of elliptic cusp forms to Siegel cusp forms of degree 2n , journal=Annals of Mathematics , series=Second Series , volume=154 , year=2001, issue= 3, pages= 641–681, jstor=3062143, doi=10.2307/3062143 Modular forms