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Reference6 articles.
1. P. Deligne and A. B. Goncharov, Groupes fondamentaux motiviques de Tate mixte. Ann. Sci. ENS, 38 (2005), 1–56.
2. A. B. Goncharov, The dihedral Lie algebra and Galois symmetries of $\pi_{1}^{(l)}(\mathbb{P}^{1}-(\{0,\infty\}\cup\mu_{N}))$ , Duke Math. J., 110 (2001), 397–487.
3. Y. Ihara, The Galois representations arising from ℙ1−{0,1,∞} and Tate twists of even degree, in : Galois Groups over ℚ, MSRI Publ., vol. 16, pp. 299–313.
4. G. Racinet, Doubles mélanges des polylogarithmes multiples aux racines de l’unité, Publ. Math. IHES, 95 (2002), 185–231.
5. D. E. Radford, A natural ring basis for the shuffle algebra and an application to group schemes, J. Algorithms, 58 (1979), 432–454.
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