系数有算术限制的d -有限多元级数

Pub Date : 2022-02-01 DOI:10.4153/S0008414X22000517

J. Bell, Daniel Smertnig

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引用次数: 0

摘要

如果域K上的多元形式幂级数的所有系数都可以表示为有限生成的子群K^*$中最多r个元素的和，则该幂级数是一个b zivin级数;如果r=1，它就是Pólya级数。给出了特征$0$域上的d -有限bsamzivin级数和d -有限Pólya级数的显式结构描述，从而将经典的Pólya和bsamzivin结果推广到多元环境。

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D-finite multivariate series with arithmetic restrictions on their coefficients

Abstract A multivariate, formal power series over a field K is a Bézivin series if all of its coefficients can be expressed as a sum of at most r elements from a finitely generated subgroup $G \le K^*$ ; it is a Pólya series if one can take $r=1$ . We give explicit structural descriptions of D-finite Bézivin series and D-finite Pólya series over fields of characteristic $0$ , thus extending classical results of Pólya and Bézivin to the multivariate setting.

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