分析（第2捲） pdf epub mobi txt 電子書 下載 2025

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☆☆☆☆☆

[德] 阿莫恩 著

齣版社： 世界圖書齣版公司

ISBN：9787510047992

版次：1

商品編碼：11181636

包裝：平裝

開本：16開

齣版時間：2012-09-01

頁數：400

內容簡介

　　As with the first, the second volume contains substantially more material than can be covered in a one-semester course. Such courses may omit many beautiful and well-grounded applications which connect broadly to many areas of mathematics.We of course hope that students will pursue this material independently; teachers may find it useful for undergraduate seminars.

目錄

Foreword
Chapter Ⅵ Integral calculus in one variable
1 Jump continuous functions
Staircase and jump continuous functions
A characterization of jump continuous functions
The Banach space of jump continuous functions
2 Continuous extensions
The extension of uniformly continuous functions
Bounded linear operators
The continuous extension of bounded linear operators
3 The Cauchy-Riemann Integral
The integral of staircase functions
The integral of jump continuous functions
Riemann sums
4 Properties of integrals
Integration of sequences of functions
The oriented integral
Positivity and monotony of integrals
Componentwise integration
The first fundamental theorem of calculus
The indefinite integral
The mean value theorem for integrals
5 The technique of integration
Variable substitution
Integration by parts
The integrals of rational functions
6 Sums and integrals
The Bernoulli numbers
Recursion formulas
The Bernoulli polynomials
The Euler-Maclaurin sum formula
Power sums
Asymptotic equivalence
The Biemann ζ function
The trapezoid rule
7 Fourier series
The L2 scalar product
Approximating in the quadratic mean
Orthonormal systems
Integrating periodic functions
Fourier coefficients
Classical Fourier series
Bessel's inequality
Complete orthonormal systems
Piecewise continuously differentiable functions
Uniform convergence
8 Improper integrals
Admissible functions
Improper integrals
The integral comparison test for series
Absolutely convergent integrals
The majorant criterion
9 The gamma function
Euler's integral representation
The gamma function on C（-N）
Gauss's representation formula
The reflection formula
The logarithmic convexity of the gamma function
Stirling's formula
The Euler beta integral
Chapter Ⅶ Multivariable differential calculus
1 Continuous linear maps
The completeness of/L（E, F）
Finite-dimensional Banach spaces
Matrix representations
The exponential map
Linear differential equations
Gronwall's lemma
The variation of constants formula
Determinants and eigenvalues
Fundamental matrices
Second order linear differential equations
Differentiability
The definition
The derivative
Directional derivatives
Partial derivatives
The Jacobi matrix
A differentiability criterion
The Riesz representation theorem
The gradient
Complex differentiability
Multivariable differentiation rules
Linearity
The chain rule
The product rule
The mean value theorem
The differentiability of limits of sequences of functions
Necessary condition for local extrema
Multilinear maps
Continuous multilinear maps
The canonical isomorphism
Symmetric multilinear maps
The derivative of multilinear maps
Higher derivatives
Definitions
Higher order partial derivatives
The chain rule
Taylor's formula
Functions of m variables
Sufficient criterion for local extrema
6 Nemytskii operators and the calculus of variations
Nemytskii operators
The continuity of Nemytskii operators
The differentiability of Nemytskii operators
The differentiability of parameter-dependent integrals
Variational problems
The Euler-Lagrange equation
Classical mechanics
7 Inverse maps
The derivative of the inverse of linear maps
The inverse function theorem
Diffeomorphisms
The solvability of nonlinear systems of equations
8 Implicit functions
Differentiable maps on product spaces
The implicit function theorem
Regular values
Ordinary differential equations
Separation of variables
Lipschitz continuity and uniqueness
The Picard-Lindelof theorem
9 Manifolds
Submanifolds of Rn
Graphs
The regular value theorem
The immersion theorem
Embeddings
Local charts and parametrizations
Change of charts
10 Tangents and normals
The tangential in Rn
The tangential space
Characterization of the tangential space
Differentiable maps
The differential and the gradient
Normals
Constrained extrema
Applications of Lagrange multipliers
Chapter Ⅷ Line integrals
1 Curves and their lengths
The total variation
Rectifiable paths
Differentiable curves
Rectifiable curves
2 Curves in Rn
Unit tangent vectors
Paramctrization by arc length
Oriented bases
The Frenet n-frame
Curvature of plane curves
Identifying lines and circles
Instantaneous circles along curves
The vector product
The curvature and torsion of space curves
3 Pfaff forms
Vector fields and Pfaff forms
The canonical basis
Exact forms and gradient fields
The Poincare lemma
Dual operators
Transformation rules
Modules
4 Line integrals
The definition
Elementary properties
The fundamental theorem of line integrals
Simply connected sets
The homotopy invariance of line integrals
5 Holomorphic functions
Complex line integrals
Holomorphism
The Cauchy integral theorem
The orientation of circles
The Cauchy integral formula
Analytic functions
Liouville's theorem
The Fresnel integral
The maximum principle
Harmonic functions
Goursat's theorem
The Weierstrass convergence theorem
6 Meromorphie functions
The Laurent expansion
Removable singularities
Isolated singularities
Simple poles
The winding number
The continuity of the winding number
The generalized Cauchy integral theorem
The residue theorem
Fourier integrals
References
Index

前言/序言

評分☆☆☆☆☆

這套書給人的感覺有點不上不下。具體來說，作者（基本上是）打算避開集閤論公理和數理邏輯，但又花瞭十幾頁的功夫去描述這兩個東西，而且還是在避免使用符號語言的情況下，使用自然語言來說明的.......嘛，因為原文是德文，說明上應該會比這英譯本的要嚴格一些，但是這英譯本就......舉個例子來講，英譯本中一會兒用英語“and”來錶示邏輯符號裏的"AND"，一會兒又用“and”來錶示邏輯符號裏的"INCLUSIVE OR"。都無語瞭......

評分☆☆☆☆☆

這套書給人的感覺有點不上不下。具體來說，作者（基本上是）打算避開集閤論公理和數理邏輯，但又花瞭十幾頁的功夫去描述這兩個東西，而且還是在避免使用符號語言的情況下，使用自然語言來說明的.......嘛，因為原文是德文，說明上應該會比這英譯本的要嚴格一些，但是這英譯本就......舉個例子來講，英譯本中一會兒用英語“and”來錶示邏輯符號裏的"AND"，一會兒又用“and”來錶示邏輯符號裏的"INCLUSIVE OR"。都無語瞭......

評分☆☆☆☆☆

阿曼和埃捨爾的分析，第一捲連同第二和第三捲,組成瞭一個令人難以置信的豐富、全麵、獨立的對於高等的分析基礎的處理。從集閤論和實數的構建,作者繼續引理、定理,定理證明的聲明和斯托剋的定理在最後一章的流形體積三世。

評分☆☆☆☆☆

導數不齣現,直到301頁,但當它介紹,它定義在條款的這東西到底是什麼:一個綫性近似。在大多數文本,這個觀點並不是討論直到“多元”分析覆蓋。

評分☆☆☆☆☆

總的來說,它們的證明簡潔和邏輯但需要一些耐心跟隨。當做齣一個論點,作者經常引用前題一個b。c和定理x y。沒有顯式地聲明校長z,他們正在使用,即使它可能有一個名字。因此,作為一個讀者,你要麼必須願意遵循麵包屑他們提供或確保你明白為什麼他們的論證工作。這真的不是一個批評,隻是一個觀察。因為這個原因雖然,如果你打算買捲的工作,您N必須買捲N - 1。在每一捲,作者承認的序言中,他們的是太多的材料覆蓋在一個學期;事實上,至少有足夠的材料在每個捲為一個學年工作的價值。

評分☆☆☆☆☆

拓撲結構的基本概念如連通性、密實度和介紹瞭homeomorphisms早期使用作為一個基礎,證明將遠不及優雅的(和不直接)否則。例如,介值定理,證明瞭結果的連接的一個空間。一旦這是結果確定下來的普遍性,它討論瞭R。　　

評分☆☆☆☆☆

拓撲結構的基本概念如連通性、密實度和介紹瞭homeomorphisms早期使用作為一個基礎,證明將遠不及優雅的(和不直接)否則。例如,介值定理,證明瞭結果的連接的一個空間。一旦這是結果確定下來的普遍性,它討論瞭R。　　

評分☆☆☆☆☆

作者的典型風格,因為他們承認在他們的前言,是定義數學對象和概念在最一般的方式。他們,然後通過這些定義的後果。考慮一個特定的例子,這種方法,社區的定義提齣瞭三世的連續性。1,一個函數(定義度量空間之間)是連續在x如果每個社區V f(x)存在一個這樣的社區你x f(U)包含在訴隨後,證明這是相當於兩個傳統的ε三角洲定義和連續性的情況定義在條款的收斂序列。作者也錶明連續性所以定義也同樣適用於一個賦範矢量空間(因為每個賦範矢量空間也是一個度量空間)。

評分☆☆☆☆☆

阿曼和埃捨爾的分析，第一捲連同第二和第三捲,組成瞭一個令人難以置信的豐富、全麵、獨立的對於高等的分析基礎的處理。從集閤論和實數的構建,作者繼續引理、定理,定理證明的聲明和斯托剋的定理在最後一章的流形體積三世。