素数表示有10个未知数的多项式-介绍

IF 1 Q1 MATHEMATICS Formalized Mathematics Pub Date : 2022-10-01 DOI:10.2478/forma-2022-0013
Karol Pąk
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引用次数: 1

摘要

本文的主要目的是构建一个由Matiyasevich和Robinson[5]提出的复杂多项式,该多项式通常用于使用Mizar[1],[2]形式主义来减少吐芬图表示中的未知数数量。多项式Jk(a1,…,ak,x)=∏æ 1,…,æ k∈{±1} (x+ æ 1a1+ æ 2a2W)+…+ æ kakWk-1 {J_k}\left ({{a_1}, \ldots,{a_k},x }\right)= \prod\limits _ {{\varepsilon _1, }\ldots,{\varepsilon _k }\in\left {{\pm 1 }\right} }{\left ({x +{\varepsilon _1 }\sqrt a_1{{ + }}{\varepsilon _2 }\sqrt a_2{{ W }}}\right) + \ldots + {\varepsilon _k }\sqrt a_k{{ W^}}k - 1 {with W=∑i=1kx i2 W={}}}\sum\nolimits _i =1{ ^k x_i^2}具有整数系数,并且Jk(a1,…,ak, x) = 0对于某些a1,…,ak, x∈0当且仅当a1,…,ak都是平方。然而,尽管观察到这个表达式是一个多项式是很重要的,也就是说,在所有符号组合的乘积中消除相似的元素,我们得到一个表达式,其中每个平方根都以偶数次方出现。这项工作已在b[7]中部分介绍。{}
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Prime Representing Polynomial with 10 Unknowns – Introduction
Summary The main purpose of the article is to construct a sophisticated polynomial proposed by Matiyasevich and Robinson [5] that is often used to reduce the number of unknowns in diophantine representations, using the Mizar [1], [2] formalism. The polynomial Jk(a1,…,ak,x)=∏ɛ1,…,ɛk∈{ ±1 }(x+ɛ1a1+ɛ2a2W)+…+ɛkakWk-1 {J_k}\left( {{a_1}, \ldots ,{a_k},x} \right) = \prod\limits_{{\varepsilon _1}, \ldots ,{\varepsilon _k} \in \left\{ { \pm 1} \right\}} {\left( {x + {\varepsilon _1}\sqrt {{a_1}} + {\varepsilon _2}\sqrt {{a_2}} W} \right) + \ldots + {\varepsilon _k}\sqrt {{a_k}} {W^{k - 1}}} with W=∑i=1kx i2 W = \sum\nolimits_{i = 1}^k {x_i^2} has integer coefficients and Jk(a1, . . ., ak, x) = 0 for some a1, . . ., ak, x ∈ ℤ if and only if a1, . . ., ak are all squares. However although it is nontrivial to observe that this expression is a polynomial, i.e., eliminating similar elements in the product of all combinations of signs we obtain an expression where every square root will occur with an even power. This work has been partially presented in [7].
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来源期刊
Formalized Mathematics
Formalized Mathematics MATHEMATICS-
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审稿时长
10 weeks
期刊介绍: Formalized Mathematics is to be issued quarterly and publishes papers which are abstracts of Mizar articles contributed to the Mizar Mathematical Library (MML) - the basis of a knowledge management system for mathematics.
期刊最新文献
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