Estimates of automorphic forms on SU(n,1)

Abstract

For n≥ 2, let ⊂ SU((n,1),OK) be a torsion-free, finite-index subgroup, where OK denotes the ring of integers of a totally imaginary number field K of degree 2. Let Bn denote the n-dimensional complex ball endowed with the hyperbolic metric, and let X:= Bn denote the quotient space. Furthermore, let μhypvol denote the volume form associated to the hyperbolic metric. Let :=Xn denote the line bundle, where X:=X ∞. For any k≥ 1, let λk:= k OX((k-1)∞). For any k≥ 1, the hyperbolic metric induces a point-wise metric on H0(X,λk). For any k≥ 1, let BXλk denote the Bergman kernel associated H0(X,λk). Then, for k1, the first main result of the article, is the following estimate z∈ X|BXλk(z,z)|hyp=OX(kn+1/2). For any k≥ 1, and z∈ X, let μBer,k(z) denote the Bergman metric associated to the line bundle λ k, and let μber,kvol denote the associated volume form. Then, for k1, the second main result of the article is the following estimate z∈ X|μBer,kvol(z)μhypvol(z)|=OX(k2(n-1)(n+1)+n+3 ). Our estimate for the Bergman metric completes our arguments and corrects our estimate from arXiv:2305.11609, for n=1.