Motivic action for Siegel modular forms

Abstract

We study the coherent cohomology of automorphic sheaves corresponding to Siegel modular forms f of low weight on GSp(4) Shimura varieties. Inspired by the work of Prasanna--Venkatesh on singular cohomology of locally symmetric spaces, we propose a conjecture that explains all the contributions of a Hecke eigensystem to coherent cohomology in terms of the action of a motivic cohomology group. Under some technical conditions, we prove that our conjecture is equivalent to Beilinson's conjecture for the adjoint L-function of f. We also prove some unconditional results in special cases. For a lift f of a Hilbert modular form f0 to GSp(4), we produce elements in the motivic cohomology group for which the conjecture holds, using the results of Ramakrishnan on the Asai L-function of f0. For a lift f of a Bianchi modular form f0 to GSp(4), we show that our conjecture for f is equivalent to the conjecture of Prasanna-Venkatesh for f0, thus establishing a connection between the motivic action conjectures for locally symmetric spaces of non-hermitian type and those for coherent cohomology of Shimura varieties.