Hyper-Mahler measures via Goncharov-Deligne cyclotomy
Abstract
The hyper-Mahler measures mk( 1+x1+x2),k∈ Z>1 and mk( 1+x1+x2+x3),k∈ Z>1 are evaluated in closed form via Goncharov-Deligne periods, namely Q-linear combinations of multiple polylogarithms at cyclotomic points (complex-valued coordinates that are roots of unity). Some infinite series related to these hyper-Mahler measures are also explicitly represented as Goncharov-Deligne periods of levels 1, 2, 3, 4, 6, 8, 10 and 12.
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