Linear Algebra: From the Beginnings to the Jordan Normal Forms

Miyake, Toshitsune

  • 出版商: Springer
  • 出版日期: 2023-09-06
  • 售價: $2,370
  • 貴賓價: 9.5$2,252
  • 語言: 英文
  • 頁數: 362
  • 裝訂: Quality Paper - also called trade paper
  • ISBN: 9811669961
  • ISBN-13: 9789811669965
  • 相關分類: 線性代數 Linear-algebra
  • 海外代購書籍(需單獨結帳)

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商品描述

The purpose of this book is to explain linear algebra clearly for beginners. In doing so, the author states and explains somewhat advanced topics such as Hermitian products and Jordan normal forms. Starting from the definition of matrices, it is made clear with examples that matrices and matrix operation are abstractions of tables and operations of tables. The author also maintains that systems of linear equations are the starting point of linear algebra, and linear algebra and linear equations are closely connected. The solutions to systems of linear equations are found by solving matrix equations in the row-reduction of matrices, equivalent to the Gauss elimination method of solving systems of linear equations. The row-reductions play important roles in calculation in this book. To calculate row-reductions of matrices, the matrices are arranged vertically, which is seldom seen but is convenient for calculation. Regular matrices and determinants of matrices are defined and explained. Furthermore, the resultants of polynomials are discussed as an application of determinants. Next, abstract vector spaces over a field K are defined. In the book, however, mainly vector spaces are considered over the real number field and the complex number field, in case readers are not familiar with abstract fields. Linear mappings and linear transformations of vector spaces and representation matrices of linear mappings are defined, and the characteristic polynomials and minimal polynomials are explained. The diagonalizations of linear transformations and square matrices are discussed, and inner products are defined on vector spaces over the real number field. Real symmetric matrices are considered as well, with discussion of quadratic forms. Next, there are definitions of Hermitian inner products. Hermitian transformations, unitary transformations, normal transformations and the spectral resolution of normal transformations and matrices are explained. The book ends withJordan normal forms. It is shown that any transformations of vector spaces over the complex number field have matrices of Jordan normal forms as representation matrices.

商品描述(中文翻譯)

本書的目的是為初學者清晰地解釋線性代數。在此過程中,作者陳述並解釋了一些較為進階的主題,例如厄米內積和喬丹標準型。從矩陣的定義開始,透過範例清楚地表明矩陣及其運算是表格及表格運算的抽象化。作者還主張線性方程組是線性代數的起點,並且線性代數與線性方程密切相關。線性方程組的解是透過在矩陣的行簡化中解決矩陣方程來找到的,這等同於高斯消去法解決線性方程組的方法。行簡化在本書的計算中扮演著重要角色。為了計算矩陣的行簡化,矩陣以垂直方式排列,這種方式雖然不常見,但對計算來說非常方便。正規矩陣和矩陣的行列式被定義和解釋。此外,多項式的結果也作為行列式的應用進行討論。接下來,定義了在域 K 上的抽象向量空間。然而,本書主要考慮的是實數域和複數域上的向量空間,以便讀者對抽象域不熟悉。定義了向量空間的線性映射和線性變換,以及線性映射的表示矩陣,並解釋了特徵多項式和最小多項式。討論了線性變換和方陣的對角化,並在實數域的向量空間上定義了內積。也考慮了實對稱矩陣,並討論了二次型。接下來,定義了厄米內積。解釋了厄米變換、單位變換、正規變換以及正規變換和矩陣的譜分解。本書以喬丹標準型作結。顯示出任何在複數域上的向量空間變換都有喬丹標準型的矩陣作為表示矩陣。

作者簡介

The author is currently Professor Emeritus at Hokkaido University. He is also the author of Modular Forms (published by Springer) in 1989.

作者簡介(中文翻譯)

作者目前是北海道大學的名譽教授。他也是1989年由Springer出版的《Modular Forms》的作者。