Substitution groups of formal power series
Abstract
Let G be the group of power series x+a2x2+a3x3+·s∈ R[[x]] under substitution, where R is a commutative ring with 1≠ 0 of prime characteristic p. Given any n≥ 1, the subgroup Kn=\x+an+1xn+1+an+2xn+2+·s\,|\, ai∈ R\ is normal in G, and the quotient Gn=G/Kn is the group of truncated polynomials over R of degree ≤ n under substitution. In this paper, we compute the exponent of the image of Kr in Gn, for all r,n≥ 1, indicating in every case a family of elements realizing this exponent.
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