p-adic interpolation of logarithmic derivatives associated to certain Lubin-Tate formal groups (Q1072595)
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scientific article; zbMATH DE number 3941644
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | p-adic interpolation of logarithmic derivatives associated to certain Lubin-Tate formal groups |
scientific article; zbMATH DE number 3941644 |
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p-adic interpolation of logarithmic derivatives associated to certain Lubin-Tate formal groups (English)
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1986
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The purpose of this paper is to generalize, to certain commutative formal groups of dimension one and height greater than one defined over the ring of integers of a finite extension of \({\mathbb{Q}}_ p\), some results on p- adic interpolation developed by Kubota, Leopoldt, Iwasawa, Mazur, Katz and others notably for the multiplicative group \({\hat {\mathbb{G}}}_ m\), and which they used to construct p-adic L-functions.
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logarithmic derivatives
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commutative formal groups
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p-adic interpolation
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p-adic L-functions
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0.9408668
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0.9279723
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0.9147045
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0.9005655
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0.8961364
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0.89295805
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