Algebraic cycles and motivic generic iterated integrals
classification
🧮 math.NT
math.AG
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motivicwillaffinecombinatorialelementshodgeintegralsiterated
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Following the work of Gangl, Goncharov and Levin in [GGL], we will give a combinatorial framework for motivic study of iterated integrals on the affine line. We will show that under a certain genericity condition these combinatorial objects yield to elements in the motivic Hopf algebra constructed in Bloch-Kriz [BK]. It will be shown that the Hodge realization of these elements coincides with the Hodge structure induced from the fundamental torsor of path of punctured affine line.
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