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This article is cited in 16 scientific papers (total in 16 papers)
Algebra, geometry, and topology of the substitution group of formal power series
I. K. Babenkoab a Université Montpellier II, Montpellier, France
b Moscow State University
Abstract:
A systematic description is given of properties of the group $\mathscr{J}(\mathbf{k})$ of formal power series in one variable with coefficients in a commutative unitary ring $\mathbf{k}$. This topological group has been studied intensively over the past 20 years, and a number of interesting results on its structure have been obtained. Here it is indicated how the group $\mathscr{J}(\mathbf{k})$ arises in several different areas of mathematics, such as complex cobordism or symplectic topology. Also considered is how the general structure of the group of complex formal power series is connected with classical problems of local uniformisation and the embedding of the germ of a holomorphic map in a flow.
Bibliography: 115 titles.
Keywords:
formal power series, topological group, pro-$p$-group, inverse limit.
Received: 28.02.2012
Citation:
I. K. Babenko, “Algebra, geometry, and topology of the substitution group of formal power series”, Russian Math. Surveys, 68:1 (2013), 1–68
Linking options:
https://www.mathnet.ru/eng/rm9471https://doi.org/10.1070/RM2013v068n01ABEH004821 https://www.mathnet.ru/eng/rm/v68/i1/p3
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Abstract page: | 1814 | Russian version PDF: | 635 | English version PDF: | 49 | References: | 156 | First page: | 82 |
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