Roots in the substitution group and in the group of Riordan matrices with ones in the main diagonal

Abstract

We investigate the existence and uniqueness of iterative roots of order n within the substitution group of formal power series J(Z) -- with coefficients in a commutative ring with unity Z -- employing a matrix-based framework grounded in the Riordan group. We analyse the relationship between the substitution group and the Lagrange subgroup -- a group of Riordan matrices -- and explore some classic questions concerning algebraic completeness and uniqueness of root extractions. This approach allows us to obtain various results about the roots in J(Z) for different choices of Z. Furthermore, the examination of the substitution group facilitates the analysis of roots within the Riordan matrix group.