Galois theory for motivic cyclotomic multiple zeta values
Presenter
March 30, 2017
Keywords:
- Galois theory
- Galois orbits
- periods
- multiple zeta values
- roots of unity
- shuffle product
- iterated integrals
- motivic integration
- weight spaces of modular forms
- cohomology comparison isomorphisms
- Lefschetz motive
- cyclotomic fields
- Hopf algebras
- motivic periods
- motivic fundamental group
MSC:
- 11R34
- 11R32
- 11Rxx
- 11-xx
- 14-xx
- 14Cxx
- 14C30
- 19E15
- 19E20
- 14E18
- 11R18
Abstract
Cyclotomic multiple zeta values (CMZV), are an interesting first bunch of examples of periods and a fruitful recent approach is to look at their motivic version (MCMZV), which are motivic periods of the fundamental groupoid of ℙ_1 ∖ {0, μN, ∞}. Notably, MCMZV have a Hopf comodule structure, dual of the action of the motivic Galois group on these specific motivic periods; the explicit combinatorial formula of the coaction (Goncharov, Brown) enables, via the period map (isomorphism under Grothendieck’s period conjecture), to deduce results on CMZV. We will here highlight how to apply some Galois descents ideas to the study of these motivic periods and look at how periods of the fundamental groupoid of ℙ_1 ∖ {0, μN', ∞} are embedded into periods of π1(ℙ_1 ∖ {0, μN, ∞}), when N′ | N, via a few examples.