Herbert Gangl
Published 2016-09-18Version 1
We clarify the relationship between different multiple polylogarithms in weight~4 by writing suitable linear combinations of a given type of iterated integral I_{n_1,...,n_d}(z_1,...,z_d), in depth d>1 and weight \sum_i n_i=4 in terms of the classical tetralogarithm Li_4. In the process, we prove a statement conjectured by Goncharov which can be rephrased as writing the sum of iterated integrals I_{3,1}(V(x,y),z), where V(x,y) denotes a formal version of the five term relation for the dilogarithm, in terms of Li_4-terms (we need 122 such).
Comments: 21 pages, link to home page with (long) Mathematica-readable expressions
Functional equations of polygonal type for multiple polylogarithms in weights 5, 6 and 7
Multiple polylogarithms and the Steinberg module
Evaluation of iterated log-sine integrals in terms of multiple polylogarithms
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