Periods of Mixed Tate Motives over Real Quadratic Number Rings
Abstract
Recently, the author defined multiple Dedekind zeta values MDZF associated to a number K field and a cone C. In this paper we construct explicitly non-trivial examples of mixed Tate motives over the ring of integers in K, for a real quadratic number field K and a particular cone C. The period of such a motive is a multiple Dedekind zeta values at (s1,s2)=(1,2), associated to the pair (K;C), times a nonzero element of K.
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