Multiple zeta values and iterated Eisenstein integrals

Abstract

Brown showed that the affine ring of the motivic path torsor π1mot(P1 \0,1,∞\, 10, -11), whose periods are multiple zeta values, generates the Tannakian category MT(Z) of mixed Tate motives over Z. Brown also introduced multiple modular values, which are periods of the relative completion of the fundamental group of the moduli stack M1,1 of elliptic curves. We prove that all motivic multiple zeta values may be expressed as Q[2 π i]-linear combinations of motivic iterated Eisenstein integrals along elements of π1 (M1,1) SL2(Z), which are examples of motivic multiple modular values. This provides a new modular generator for MT(Z). We also explain how the coefficients in this linear combination may be partially determined using the motivic coaction.