Chow groups andL-derivatives of automorphic motives for unitary groups, II.

Abstract

AbstractIn this article, we improve our main results from [LL21] in two directions: First, we allow ramified places in the CM extension$E/F$at which we consider representations that are spherical with respect to a certain special maximal compact subgroup, by formulating and proving an analogue of the Kudla–Rapoport conjecture for exotic smooth Rapoport–Zink spaces. Second, we lift the restriction on the components at split places of the automorphic representation, by proving a more general vanishing result on certain cohomology of integral models of unitary Shimura varieties with Drinfeld level structures.