Igusa group

In mathematics, an Igusa group or Igusa subgroup is a subgroup of the Siegel modular group defined by some congruence conditions. They were introduced by.

Definition

The symplectic group Sp_2g consists of the matrices
such that AB^t and CD^t are symmetric, and AD^t − CB^t = I.
The Igusa group Γ_g = Γ_n,2n consists of the matrices
in Sp_2g such that B and C are congruent to 0 mod n, A and D are congruent to the identity matrix I mod n, and the diagonals of AB^t and CD^t are congruent to 0 mod 2n.
We have Γ_g ⊆ Γ_g ⊆ Γ_g where Γ_g is the subgroup of matrices congruent to the identity modulo n.