Demi-shuffle duals of Magnus polynomials in a free associative algebra
Abstract
We study two linear bases of the free associative algebra Z X,Y: one is formed by the Magnus polynomials of type (adXk1Y)·s(adXkdY) Xk and the other is its dual basis (formed by what we call the `demi-shuffle' polynomials) with respect to the standard pairing on the monomials of Z X,Y. As an application, we show a formula of Le-Murakami, Furusho type that expresses arbitrary coefficients of a group-like series J∈ C X,Y by the `regular' coefficients of J.
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