Ax's theorem for additive power series
56 mins 40 secs,
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| Description: |
Kowalski, P (Wroclaw)
Thursday 14 May 2009, 14:00-15:00 Algebraic Theory of Difference Equations |
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| Created: | 2011-03-14 15:21 | ||||
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| Collection: | Discrete Integrable Systems | ||||
| Publisher: | Isaac Newton Institute | ||||
| Copyright: | Kowalski, P | ||||
| Language: | eng (English) | ||||
| Credits: |
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| Abstract: | Ax's theorem is a power series version of Schanuel's conjecture. It is a statement about the transcendence degree of the values of the exponential map on a linearly independent sequence of power series. I will discuss an analogous statement where the role of the exponential map is played by additive power series (in positive characteristic). |
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