Some generalizations of the functions \(\tau\) and \(\tau^{(e)}\) in algebraic number fields (Q2238896)
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| Language | Label | Description | Also known as |
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| English | Some generalizations of the functions \(\tau\) and \(\tau^{(e)}\) in algebraic number fields |
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Some generalizations of the functions \(\tau\) and \(\tau^{(e)}\) in algebraic number fields (English)
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2 November 2021
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Let \(\tau^{(e)}(n)\) be the number of exponential divisors of \(n\in Z\), introduced by \textit{M. V. Subbarao} [Lect. Notes Math. 251, 247--271 (1972; Zbl 0237.10009)]. The authors present some simple properties of its analogue for ideals in algebraic number fields.
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exponential divisors
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divisors of ideals
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