Let $$\Gamma _n(\mathcal {\scriptstyle {O}}_{\mathbb {K}})$$ Γ n ( O K ) denote the Hermitian modular group of degree n over an imaginary quadratic number field $$\mathbb {K}$$ K and… Click to show full abstract
Let $$\Gamma _n(\mathcal {\scriptstyle {O}}_{\mathbb {K}})$$Γn(OK) denote the Hermitian modular group of degree n over an imaginary quadratic number field $$\mathbb {K}$$K and $$\Delta _{n,\mathbb {K}}^*$$Δn,K∗ its maximal discrete extension in the special unitary group $$SU(n,n;\mathbb {C})$$SU(n,n;C). In this paper we study the action of $$\Delta _{n,\mathbb {K}}^*$$Δn,K∗ on Hermitian theta series and Maaß spaces. For $$n=2$$n=2 we will find theta lattices such that the corresponding theta series are modular forms with respect to $$\Delta _{2,\mathbb {K}}^*$$Δ2,K∗ as well as examples where this is not the case. Our second focus lies on studying two different Maaß spaces. We will see that the new found group $$\Delta _{2,\mathbb {K}}^*$$Δ2,K∗ consolidates the different definitions of the spaces.
