Unramified Euler sums and Hoffman basis

Abstract

When looking at how periods of π1m(P1 0, 1, ∞ ), i.e. multiple zeta values, embeds into periods of π1m(P1 0, 1, ∞ ), i.e. Euler sums, an explicit criteria via the coaction acting on their motivic versions comes out. In this paper, adopting this Galois descent approach, we present a new basis for the space H1 of motivic multiple zeta values via motivic Euler sums. Up to an analytic conjecture, we also prove that the motivic Hoffman star basis ζ, m (2a1,3,·s,3, 2ap, 3, 2b) is a basis of H1. Under a general motivic identity that we conjecture, these bases are identical. Other examples of unramified ES with alternating patterns of even and odds are also provided.