具有指定因子分解长度的全局域的赋值环上的整值多项式。

IF 0.8 4区数学 Q2 MATHEMATICS Monatshefte fur Mathematik Pub Date : 2023-01-01 Epub Date: 2023-09-04 DOI:10.1007/s00605-023-01895-2

Victor Fadinger-Held, Sophie Frisch, Daniel Windisch

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引用次数: 2

摘要

设V是全局域K的一个赋值环。我们证明了对于所有正整数K和1n1≤…≤nk，V上存在一个整数值多项式，即Int（V）={f∈K[X]Üf（V）⊆V}的一个元素，它具有精确的K个本质上不同的因子分解为Int（V）的不可约元素，其长度恰好为n1，…，nk。事实上，我们证明了更多，即对于每个具有有限剩余域的离散估值域V，同样的结果成立，使得V的商域允许独立于V的估值环，其最大理想是主或其剩余域是有限的。如果V的商域是任意域的纯超越扩展，则满足此性质。这解决了Cahen、Fontana、Frisch和Glaz在这些情况下提出的一个开放问题。

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Integer-valued polynomials on valuation rings of global fields with prescribed lengths of factorizations.

Let V be a valuation ring of a global field K. We show that for all positive integers k and $1 < n_{1} \leq \dots \leq n_{k}$ there exists an integer-valued polynomial on V, that is, an element of $Int (V) = {f \in K [X] ∣ f (V) \subseteq V}$ , which has precisely k essentially different factorizations into irreducible elements of $Int (V)$ whose lengths are exactly $n_{1}, \dots, n_{k}$ . In fact, we show more, namely that the same result holds true for every discrete valuation domain V with finite residue field such that the quotient field of V admits a valuation ring independent of V whose maximal ideal is principal or whose residue field is finite. If the quotient field of V is a purely transcendental extension of an arbitrary field, this property is satisfied. This solves an open problem proposed by Cahen, Fontana, Frisch and Glaz in these cases.

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来源期刊

Monatshefte fur Mathematik 数学-数学

CiteScore

1.60

自引率

11.10%

发文量

155

审稿时长

4-8 weeks

期刊介绍： The journal was founded in 1890 by G. v. Escherich and E. Weyr as "Monatshefte für Mathematik und Physik" and appeared with this title until 1944. Continued from 1948 on as "Monatshefte für Mathematik", its managing editors were L. Gegenbauer, F. Mertens, W. Wirtinger, H. Hahn, Ph. Furtwängler, J. Radon, K. Mayrhofer, N. Hofreiter, H. Reiter, K. Sigmund, J. Cigler. The journal is devoted to research in mathematics in its broadest sense. Over the years, it has attracted a remarkable cast of authors, ranging from G. Peano, and A. Tauber to P. Erdös and B. L. van der Waerden. The volumes of the Monatshefte contain historical achievements in analysis (L. Bieberbach, H. Hahn, E. Helly, R. Nevanlinna, J. Radon, F. Riesz, W. Wirtinger), topology (K. Menger, K. Kuratowski, L. Vietoris, K. Reidemeister), and number theory (F. Mertens, Ph. Furtwängler, E. Hlawka, E. Landau). It also published landmark contributions by physicists such as M. Planck and W. Heisenberg and by philosophers such as R. Carnap and F. Waismann. In particular, the journal played a seminal role in analyzing the foundations of mathematics (L. E. J. Brouwer, A. Tarski and K. Gödel). The journal publishes research papers of general interest in all areas of mathematics. Surveys of significant developments in the fields of pure and applied mathematics and mathematical physics may be occasionally included.