The Hirzebruch-Mumford covolume of some hermitian lattices
Abstract
Let L=diag(1,1,…,1,-1) and M=diag(1,1,…,1,-2) be the lattices of signature (n,1). We consider the groups =SU(L,OK) and '=SU(M,OK) for an imaginary quadratic field K=Q(-d) of discriminant D and it's ring of integers OK, d odd and square free. We compute the Hirzebruch-Mumford volume of the factor spaces Bn/ and Bn/'. The result for the factor space Bn/ is due to Zeltinger, but as we're using it to prove the result for Bn/' and it is hard to find his article, we prove the first result here as well.
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