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2002 | Buch

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Real Analysis

verfasst von: Emmanuele DiBenedetto

Verlag: Birkhäuser Boston

Buchreihe : Birkhäuser Advanced Texts / Basler Lehrbücher

Enthalten in: Professional Book Archive

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Über dieses Buch

This book is a self-contained introduction to real analysis assuming only basic notions on limits of sequences in ]RN, manipulations of series, their convergence criteria, advanced differential calculus, and basic algebra of sets. The passage from the setting in ]RN to abstract spaces and their topologies is gradual. Continuous reference is made to the ]RN setting, where most of the basic concepts originated. The first seven chapters contain material forming the backbone of a basic training in real analysis. The remaining two chapters are more topical, relating to maximal functions, functions of bounded mean oscillation, rearrangements, potential theory, and the theory of Sobolev functions. Even though the layout of the book is theoretical, the entire book and the last chapters in particular concern applications of mathematical analysis to models of physical phenomena through partial differential equations. The preliminaries contain a review of the notions of countable sets and related examples. We introduce some special sets, such as the Cantor set and its variants, and examine their structure. These sets will be a reference point for a number of examples and counterexamples in measure theory (Chapter II) and in the Lebesgue differentiability theory of absolute continuous functions (Chapter IV). This initial chapter also contains a brief collection of the various notions of ordering, the Hausdorff maximal principle, Zorn's lemma, the well-ordering principle, and their fundamental connections.

Inhaltsverzeichnis

Frontmatter

Preliminaries

Abstract

A set E is countable if it can be put in one-to-one correspondence with a subset of the natural numbers ℕ. Every subset of a countable set is countable.

Emmanuele DiBenedetto

I. Topologies and Metric Spaces

Abstract

Let X be a set. A collection U of subsets of Xdefines a topologyon X if

(i)

the empty set Ø and X belong to U;

(ii)

the union of any collection of sets in U is in U;

(iii)

the intersection of finitely many elements of U is in U.

Emmanuele DiBenedetto

II. Measuring Sets

Abstract

Every open subset E of ℝ is the union of a countable collection of pairwise-disjoint open intervals.

Emmanuele DiBenedetto

III. The Lebesgue Integral

Abstract

Let {X,A,μ} be a measure space and E ∈ A. For a function $f:E \to {{\mathbb{R}}^{*}}$ and c∈ℝ, set

$$\left[ {f > c} \right] = \left\{ {x \in E\left| {f\left( x \right) > c} \right.} \right\}.$$

(1.1)

Emmanuele DiBenedetto

IV. Topics on Measurable Functions of Real Variables

Abstract

Letfbe a real-valued function defined and bounded in some interval $\left[ {a,b} \right] \subset \mathbb{R}$. Denote by

$$\mathcal{P} \equiv \left\{ {a = {{x}_{0}} < {{x}_{1}} < \cdots < {{x}_{n}} = b} \right\}$$

a partition of[a,b]and set

$${{v}_{f}}\left[ {a,b} \right] = \begin{array}{*{20}{c}} {\sup } \\ {\text{P}} \\ \end{array} \sum\limits_{{i = 1}}^{n} {\left| {f\left( {{{x}_{i}} - f\left( {{{x}_{{i - 1}}}} \right)} \right)} \right|}$$

This number, finite or infinite, is called thetotal variationoffin[a,b].IfVf [a,b]is finite, the functionfis said to be ofbounded variationin[a,b].

Emmanuele DiBenedetto

V. The L p (E) Spaces

Abstract

Let { X,A,μ} be a measure space and let E be a measurable subset of X. A measurable function $f:E \to {{\mathbb{R}}^{*}}$ is said to be in L ^P (E) for P≥1 if is integrable on E, i.e., if

$$ \left\| f \right\|_p \mathop = \limits^{def} \left( {\smallint _E \left| f \right|^p d\mu } \right)^{1/p} < \infty $$

(1.1)p

Emmanuele DiBenedetto

VI. Banach Spaces

Abstract

Let X be a vector space and let Θ be its zero element. A norm on X is a function $\left\| \cdot \right\|:X \to {{\mathbb{R}}^{ + }}$ satisfying the following:

(i)

‖x‖=0 if and only if x=θ.

(ii)

‖x+y‖≤ ‖x‖+ ‖y‖for all x,y∈X.

(iii)

‖λx‖=|λ|‖x‖ for all λ∈ℝ and ∈X.

Emmanuele DiBenedetto

VII. Spaces of Continuous Functions, Distributions, and Weak Derivatives

Abstract

Let E be an open set in ℝ^N, and let f be a real-valued function f defined in E. The support of f is the closure in ℝ^N of the set, [|f |>0], and we write

$$\operatorname{supp} \left\{ f \right\} = \overline {\left[ {\left| f \right| > 0} \right]} .$$

Emmanuele DiBenedetto

VIII. Topics on Integrable Functions of Real Variables

Abstract

Let μ be the Lebesgue measure in ℝ^N and refer the notions of measurability and integrability to such a measure. Let E ⊂ ℝ^N be measurable and of finite measure, and let F be a collection of cubes in ℝ^N with faces parallel to the coordinate planes whose union covers E. Such a covering is a Vitali-type covering. The cubes making up F are not required to be open or closed.

Emmanuele DiBenedetto

IX. Embeddings of W 1,p (E) into L q (E)

Abstract

Let E be a bounded, open set in ℝ^N. An embedding from W ^{1, p} (E) into L ^q (E) is an estimate of the L ^q (E)-norm of a function u ∈ W ^{1, p} (E) in terms of its W^{1, p} (E)-norm. The structure of such an estimate and the various constants involved should not depend on the particular function u ∈ W ^{1, p}(E) nor on the size of E,although they might depend on the structure of ∂ E.

Emmanuele DiBenedetto

Backmatter

Titel: Real Analysis
verfasst von: Emmanuele DiBenedetto
Verlag: Birkhäuser Boston
Electronic ISBN: 978-1-4612-0117-5
Print ISBN: 978-1-4612-6620-4
DOI: https://doi.org/10.1007/978-1-4612-0117-5

Springer Professional

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Inhaltsverzeichnis

Frontmatter

Preliminaries

I. Topologies and Metric Spaces

II. Measuring Sets

III. The Lebesgue Integral

IV. Topics on Measurable Functions of Real Variables

V. The L p (E) Spaces

VI. Banach Spaces

VII. Spaces of Continuous Functions, Distributions, and Weak Derivatives

VIII. Topics on Integrable Functions of Real Variables

IX. Embeddings of W 1,p (E) into L q (E)

Backmatter