Symbols for toric Eisenstein cocycles and arithmetic applications

Abstract

Using a complex parameterizing rational spherical chains, we construct explicit cocycles for GLn() valued in the motivic cohomology of (open subsets of) the algebraic n-torus Gmn. The resulting cocycles directly generalize the work of Sharifi and Venkatesh from the case n=2 SV. Even in this special case, our systematic use of pushforwards allows us to avoid the use of their ``connecting sequences,'' and allows us to refine the construction and Hecke properties of the Sharifi map to the maximal expected statements, while inverting only the prime 2. For general n, the d regulator of our cocycle is related by convex conical duality to cocycles constructed from Shintani cones. This affords a systematic approach to p-adic L-functions for totally real fields without need for auxiliary data or logarithm sheaf coefficients, including a distribution-valued n()-cocycle specializing in a simple way to all such p-adic L-functions. It moreover provides a direct conceptual link between polylogarithmic constructions of Eisenstein classes (e.g., in BKL), and those constructed using Shintani cones (e.g., in CDG). We also show how our formalism gives an alternate proof of the exceptional divisibilities of the Deligne-Ribet 2-adic L-function in almost all cases.