Nonfreeness of some algebras of hermitian modular forms
Abstract
We study the algebras of hermitian automorphic forms for the lattice Ln=diag(1,1,…,1,-1) and for the field K=Q(-d) such that p=2 is unramified and the ring of integers OK is a p.i.d. We prove that for d>7 these algebras can't be free. When d=7 and d=3 we give an estimate for the dimension of the symmetric spaces for which these algebras might be free. We also compare our results with the known results for d=3.
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