Riemann form

In mathematics, a Riemann form in the theory of abelian varieties and modular forms, is the following data:

  1. the real linear extension αR:Cg × CgR of α satisfies αR(iv, iw)=αR(v, w) for all (v, w) in Cg × Cg;
  2. the associated hermitian form H(v, w)=αR(iv, w) + iαR(v, w) is positive-definite.

(Note: the hermitian form written here is linear in the first variable, in opposition to the standard definition of this encyclopedia, but in accord with the standard use in this specific subject).

Riemann forms are important because of the following:

References