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Depth-graded motivic multiple zeta values

Francis Brown

2021Compositio Mathematica53 citationsDOIOpen Access PDF

Abstract

We study the depth filtration on multiple zeta values, on the motivic Galois group of mixed Tate motives over $\mathbb {Z}$ and on the Grothendieck–Teichmüller group, and its relation to modular forms. Using period polynomials for cusp forms for $\mathrm {SL} _2(\mathbb {Z})$ , we construct an explicit Lie algebra of solutions to the linearized double shuffle equations, which gives a conjectural description of all identities between multiple zeta values modulo $\zeta (2)$ and modulo lower depth. We formulate a single conjecture about the homology of this Lie algebra which implies conjectures due to Broadhurst and Kreimer, Racinet, Zagier, and Drinfeld on the structure of multiple zeta values and on the Grothendieck–Teichmüller Lie algebra.

Topics & Concepts

MathematicsModuloLie algebraPure mathematicsConjectureRoot of unityModular formAlgebra over a fieldGalois groupFiltration (mathematics)CombinatoricsPhysicsQuantum mechanicsQuantumAdvanced Mathematical IdentitiesAdvanced Algebra and GeometryAdvanced Combinatorial Mathematics
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