The planar Tree Lagrange Inversion Formula
Abstract
A planar tree power series over a field K is a formal expression Σ cT · T where the sum is extended over all isomorphism classes of finite planar reduced rooted trees T and where the coefficients cT are in K. Mulitplications of these power series is induced by planar grafting of trees and turns the K-vectorspace K\x\∞ of those power series into an algebra, see [G]. If f ∈ K \x\∞ there is a unique g(x) ∈ K \x\∞ of order > 0 such that g(x) = x · f(g(x)) where f(g(x)) is obtained by substituting g(x) for x in f(x). Formulas for the coefficients of g in terms of the coefficients of f are obtained by the use of the planar tree Lukaciewicz language. This result generalizes the classical Lagrange inversion formula, see [C],[R],[Sch].
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