Remarks on generating series for special cycles

Abstract

In this note, we consider special algebraic cycles on the Shimura variety S associated to a quadratic space V over a totally real field F, |F:|=d, of signature ((m,2)d+,(m+2,0)d-d+), 1 d+<d. For each n, 1 n m, there are special cycles Z(T) in S, of codimension nd+, indexed by totally positive semi-definite matrices with coefficients in the ring of integers OF. The generating series for the classes of these cycles in the cohomology group H2nd+(S) are Hilbert-Siegel modular forms of parallel weight m/2+1. One can form analogous generating series for the classes of the special cycles in the Chow group CHnd+(S). For d+=1 and n=1, the modularity of these series was proved by Yuan-Zhang-Zhang. In this note we prove the following: Assume the Bloch-Beilinson conjecture on the injectivity of Abel-Jacobi maps. Then the Chow group valued generating series for special cycles of codimension nd+ on S is modular for all n with 1 n m.