Modularity of special cycles on unitary Shimura varieties over CM-fields
Volume 204 / 2022
Abstract
We study the modularity of the generating series of special cycles on unitary Shimura varieties over CM-fields of degree $2d$ associated with a Hermitian form in $n+1$ variables whose signature is $(n,1)$ at $e$ real places and $(n+1,0)$ at the remaining $d-e$ real places for $1\leq e \lt d$. For $e=1$, Liu proved the modularity, and Xia showed the absolute convergence of the generating series. On the other hand, Bruinier constructed regularized theta lifts on orthogonal groups over totally real fields and proved the modularity of special divisors on orthogonal Shimura varieties. By using Bruinier’s result, we work on the problem for $e=1$ and give another proof of Liu’s theorem [Algebra Number Theory 5 (2011)]. For $e \gt 1$, we prove that the generating series of special cycles of codimension $er$ in the Chow group is a Hilbert-Hermitian modular form of weight $n+1$ and genus $r$, assuming the Beilinson–Bloch conjecture for orthogonal Shimura varieties. Our result is a generalization of Kudla’s modularity conjecture, solved by Liu unconditionally when $e=1$.
