Derivation of Commutative Rings and the Leibniz Formula for Power of Derivation

IF 1 Q1 MATHEMATICS Formalized Mathematics Pub Date : 2021-04-01 DOI:10.2478/forma-2021-0001
Yasushige Watase
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Abstract

Summary In this article we formalize in Mizar [1], [2] a derivation of commutative rings, its definition and some properties. The details are to be referred to [5], [7]. A derivation of a ring, say D, is defined generally as a map from a commutative ring A to A-Module M with specific conditions. However we start with simpler case, namely dom D = rng D. This allows to define a derivation in other rings such as a polynomial ring. A derivation is a map D : A → A satisfying the following conditions: (i) D(x + y) = Dx + Dy, (ii) D(xy) = xDy + yDx, ∀x, y ∈ A. Typical properties are formalized such as: D(∑i=1nxi)=∑i=1nDxi D\left( {\sum\limits_{i = 1}^n {{x_i}} } \right) = \sum\limits_{i = 1}^n {D{x_i}} and D(∏i=1nxi)=∑i=1nx1x2⋯Dxi⋯xn(∀xi∈A). D\left( {\prod\limits_{i = 1}^n {{x_i}} } \right) = \sum\limits_{i = 1}^n {{x_1}{x_2} \cdots D{x_i} \cdots {x_n}} \left( {\forall {x_i} \in A} \right). We also formalized the Leibniz Formula for power of derivation D : Dn(xy)=∑i=0n(in)DixDn-iy. {D^n}\left( {xy} \right) = \sum\limits_{i = 0}^n {\left( {_i^n} \right){D^i}x{D^{n - i}}y.} Lastly applying the definition to the polynomial ring of A and a derivation of polynomial ring was formalized. We mentioned a justification about compatibility of the derivation in this article to the same object that has treated as differentiations of polynomial functions [3].
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交换环的求导与求导幂的莱布尼茨公式
本文形式化了Mizar[1],[2]中交换环的一个推导,它的定义和一些性质。具体请参见[5]、[7]。一个环的导数,比如D,通常被定义为一个映射,从交换环A到A模M具有特定的条件。然而,我们从更简单的情况开始,即dom D = rng D.这允许在其他环(如多项式环)中定义导数。一个推导是一个映射D: A→A,满足下列条件:(i) D(x + y) = Dx + Dy, (ii) D(xy) = xDy + yDx,∀x, y∈A。典型的性质被形象化,例如:D(∑i=1nxi)=∑i=1nDxi D \left ({\sum\limits _i =1{ ^n }x_i{{}}}\right)= \sum\limits _i =1{ ^n x_i}和D(∏i=1nxi)=∑i=1nx1x2⋯Dxi⋯xn(∀xi∈A)。D{{}}\left ({\prod\limits _i = 1{^n }x_i{{}}}\right) = \sum\limits _i = 1{^n }x_1x_2{{}{}\cdots Dx_i{}\cdots x_n{}}\left ({\forall x_i{}\in A }\right)。我们还将推导幂的莱布尼茨公式D: Dn(xy)=∑i=0n(in)DixDn-iy公式化。{D^n}\left ({xy}\right) = \sum\limits _i = 0{^n }{\left ({_i^n}\right){D^ixD}^n{ - y{。最后}}将该定义应用于A的多项式环,并形式化了多项式环的一个导数。我们在本文中提到了一个关于推导与被视为多项式函数微分的同一对象的兼容性的论证[3]。}
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来源期刊
Formalized Mathematics
Formalized Mathematics MATHEMATICS-
自引率
0.00%
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0
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.
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