Zn--graded Independence
Abstract
We generalize results of Mingo and Nica on graded independence from the context of Z2--graded (Fermionic) noncommutative probability spaces to that of Zn--graded noncommutative probability spaces. We show that for q a primitive n-th root of unity, the q-cumulants defined by Nica linearize the addition of homogeneous Zn--graded independent random variables.
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