In mathematics, the branch of real analysis studies the behavior of real numbers, sequences and series of real numbers, and real functions.[1] Some particular properties of real-valued sequences and functions that real analysis studies include convergence, limits, continuity, smoothness, differentiability and integrability.
Real analysis is distinguished from complex analysis, which deals with the study of complex numbers and their functions.
See main article: Construction of the real numbers. The theorems of real analysis rely on the properties of the real number system, which must be established. The real number system consists of an uncountable set (
R
Q
The real numbers have various lattice-theoretic properties that are absent in the complex numbers. Also, the real numbers form an ordered field, in which sums and products of positive numbers are also positive. Moreover, the ordering of the real numbers is total, and the real numbers have the least upper bound property:
Every nonempty subset ofThese order-theoretic properties lead to a number of fundamental results in real analysis, such as the monotone convergence theorem, the intermediate value theorem and the mean value theorem.that has an upper bound has a least upper bound that is also a real number.R
However, while the results in real analysis are stated for real numbers, many of these results can be generalized to other mathematical objects. In particular, many ideas in functional analysis and operator theory generalize properties of the real numbers – such generalizations include the theories of Riesz spaces and positive operators. Also, mathematicians consider real and imaginary parts of complex sequences, or by pointwise evaluation of operator sequences.
Many of the theorems of real analysis are consequences of the topological properties of the real number line. The order properties of the real numbers described above are closely related to these topological properties. As a topological space, the real numbers has a standard topology, which is the order topology induced by order
<
d:R x R\toR\geq
d
<
R
See main article: Sequence. A sequence is a function whose domain is a countable, totally ordered set.[2] The domain is usually taken to be the natural numbers,[3] although it is occasionally convenient to also consider bidirectional sequences indexed by the set of all integers, including negative indices.
Of interest in real analysis, a real-valued sequence, here indexed by the natural numbers, is a map
a:\N\to\R:n\mapstoan
a(n)=an
(an)
M\in\R
|an|<M
n\inN
(an)
\leq
\geq
Given a sequence
(an)
(bk)
(an)
bk=a
| nk |
k
(nk)
See main article: Limit (mathematics). Roughly speaking, a limit is the value that a function or a sequence "approaches" as the input or index approaches some value.[5] (This value can include the symbols
\pminfty
The concept of limit was informally introduced for functions by Newton and Leibniz, at the end of the 17th century, for building infinitesimal calculus. For sequences, the concept was introduced by Cauchy, and made rigorous, at the end of the 19th century by Bolzano and Weierstrass, who gave the modern ε-δ definition, which follows.
Definition. Let
f
f(x)
L
x
x0
f(x)
x
x0
L
\varepsilon>0
\delta>0
x\inE
0<|x-x0|<\delta
|f(x)-L|<\varepsilon
f(x)\toL
x\tox0
\varepsilon
\delta
f(x)
L
\varepsilon
x
f
\delta
x0
x0
0<|x-x0|
f(x0)
x0
f
In a slightly different but related context, the concept of a limit applies to the behavior of a sequence
(an)
n
Definition. Let
(an)
(an)
a
\varepsilon>0
N
n\geqN
|a-an|<\varepsilon
(an)
(an)
Generalizing to a real-valued function of a real variable, a slight modification of this definition (replacement of sequence
(an)
an
f
f(x)
N
n
M
x
f(x)
x
x\geqM
x\leqM
f(x)
x
Sometimes, it is useful to conclude that a sequence converges, even though the value to which it converges is unknown or irrelevant. In these cases, the concept of a Cauchy sequence is useful.
Definition. Let
(an)
(an)
\varepsilon>0
N
m,n\geqN
|am-an|<\varepsilon
It can be shown that a real-valued sequence is Cauchy if and only if it is convergent. This property of the real numbers is expressed by saying that the real numbers endowed with the standard metric,
(\R,| ⋅ |)
In addition, for real-valued sequences that are monotonic, it can be shown that the sequence is bounded if and only if it is convergent.
See main article: Uniform convergence. In addition to sequences of numbers, one may also speak of sequences of functions on
E\subsetR
fn:E\toR
(fn)
| infty | |
| n=1 |
Roughly speaking, pointwise convergence of functions
fn
f:E\toR
fn → f
x\inE
fn(x)\tof(x)
n\toinfty
fn
\varepsilon>0
f
x\inE
n\geqN
N
fn\rightrightarrowsf
N
\varepsilon>0
N
fN,fN+1,fN+2,\ldots
2\varepsilon
f
f-\varepsilon
f+\varepsilon
E
The distinction between pointwise and uniform convergence is important when exchanging the order of two limiting operations (e.g., taking a limit, a derivative, or integral) is desired: in order for the exchange to be well-behaved, many theorems of real analysis call for uniform convergence. For example, a sequence of continuous functions (see below) is guaranteed to converge to a continuous limiting function if the convergence is uniform, while the limiting function may not be continuous if convergence is only pointwise. Karl Weierstrass is generally credited for clearly defining the concept of uniform convergence and fully investigating its implications.
See main article: Compactness. Compactness is a concept from general topology that plays an important role in many of the theorems of real analysis. The property of compactness is a generalization of the notion of a set being closed and bounded. (In the context of real analysis, these notions are equivalent: a set in Euclidean space is compact if and only if it is closed and bounded.) Briefly, a closed set contains all of its boundary points, while a set is bounded if there exists a real number such that the distance between any two points of the set is less than that number. In
R
\{1/n:n\inN\}\cup\{0}\
l{C}\subset[0,1]
\{1/n:n\inN\}
[0,infty)
For subsets of the real numbers, there are several equivalent definitions of compactness.
Definition. A set
E\subsetR
This definition also holds for Euclidean space of any finite dimension,
Rn
A more general definition that applies to all metric spaces uses the notion of a subsequence (see above).
Definition. A set
E
E
This particular property is known as subsequential compactness. In
R
The most general definition of compactness relies on the notion of open covers and subcovers, which is applicable to topological spaces (and thus to metric spaces and
R
U\alpha
X
X
U\alpha
X
Definition. A set
X
X
Compact sets are well-behaved with respect to properties like convergence and continuity. For instance, any Cauchy sequence in a compact metric space is convergent. As another example, the image of a compact metric space under a continuous map is also compact.
See main article: Continuous function. A function from the set of real numbers to the real numbers can be represented by a graph in the Cartesian plane; such a function is continuous if, roughly speaking, the graph is a single unbroken curve with no "holes" or "jumps".
There are several ways to make this intuition mathematically rigorous. Several definitions of varying levels of generality can be given. In cases where two or more definitions are applicable, they are readily shown to be equivalent to one another, so the most convenient definition can be used to determine whether a given function is continuous or not. In the first definition given below,
f:I\to\R
I
I=\R
I=(a,b)=\{x\in\R\mida<x<b\},
I=[a,b]=\{x\in\R\mida\leqx\leqb\}.
a
b
I
Definition. If
I\subsetR
f:I\to\R
p\inI
f
f
p\inI
In contrast to the requirements for
f
p
f
p
f
p
f
p
p
f
f(x)\tof(p)
x\top
E
E
p\inE
E
f:X\toR
X\subsetR
Definition. If
X
R
f:X\toR
p\inX
\varepsilon>0
\delta>0
x\inX
|x-p|<\delta
|f(x)-f(p)|<\varepsilon
f
f
p\inX
A consequence of this definition is that
f
p\inX
R
Definition. If
X
Y
f:X\toY
p\inX
f-1(V)
p
X
V
f(p)
Y
f
f-1(U)
X
U
Y
(Here,
f-1(S)
S\subsetY
f
See main article: Uniform continuity. Definition. If
X
f:X\toR
X
\varepsilon>0
\delta>0
x,y\inX
|x-y|<\delta
|f(x)-f(y)|<\varepsilon
Explicitly, when a function is uniformly continuous on
X
\delta
X
\varepsilon
p\inX
X
\delta
\varepsilon
p
p
On a compact set, it is easily shown that all continuous functions are uniformly continuous. If
E
R
f:E\toR
f:(0,1)\toR
f(x)=1/x
|f(x)-f(y)|>\varepsilon
\delta>0
\varepsilon>0
See main article: Absolute continuity. Definition. Let
I\subsetR
f:I\toR
I
\varepsilon
\delta
(x1,y1),(x2,y2),\ldots,(xn,yn)
I
| n | |
| \sum | |
| k=1 |
(yk-xk)<\delta
| n | |
| \sum | |
| k=1 |
|f(yk)-f(xk)|<\varepsilon.
See main article: Derivative and Differential calculus. The notion of the derivative of a function or differentiability originates from the concept of approximating a function near a given point using the "best" linear approximation. This approximation, if it exists, is unique and is given by the line that is tangent to the function at the given point
a
a
A function
f:R\toR
a
f'(a)=\limh\to
| f(a+h)-f(a) | |
| h |
exists. This limit is known as the derivative of
f
a
f'
R
f
As a simple consequence of the definition,
f
a
One can classify functions by their differentiability class. The class
C0
C0([a,b])
C1
C1
C0
Ck
C0
Ck
k
Ck-1
Ck
Ck-1
k
Cinfty
Ck
k
C\omega
Cinfty
See main article: Series (mathematics). A series formalizes the imprecise notion of taking the sum of an endless sequence of numbers. The idea that taking the sum of an "infinite" number of terms can lead to a finite result was counterintuitive to the ancient Greeks and led to the formulation of a number of paradoxes by Zeno and other philosophers. The modern notion of assigning a value to a series avoids dealing with the ill-defined notion of adding an "infinite" number of terms. Instead, the finite sum of the first
n
n
(an)
(sn)
The word "sum" is used here in a metaphorical sense as a shorthand for taking the limit of a sequence of partial sums and should not be interpreted as simply "adding" an infinite number of terms. For instance, in contrast to the behavior of finite sums, rearranging the terms of an infinite series may result in convergence to a different number (see the article on the Riemann rearrangement theorem for further discussion).
An example of a convergent series is a geometric series which forms the basis of one of Zeno's famous paradoxes:
| infty | |
| \sum | |
| n=1 |
| 1 | |
| 2n |
=
| 1 | |
| 2 |
+
| 1 | |
| 4 |
+
| 1 | |
| 8 |
+ … =1.
In contrast, the harmonic series has been known since the Middle Ages to be a divergent series:
| infty | |
| \sum | |
| n=1 |
| 1 | |
| n |
=1+
| 1 | |
| 2 |
+
| 1 | |
| 3 |
+ … =infty.
(Here, "
=infty
A series is said to converge absolutely if is convergent. A convergent series for which diverges is said to converge non-absolutely.[7] It is easily shown that absolute convergence of a series implies its convergence. On the other hand, an example of a series that converges non-absolutely is
| infty | |
| \sum | |
| n=1 |
| (-1)n-1 | |
| n |
=1-
| 1 | |
| 2 |
+
| 1 | |
| 3 |
-
| 1 | |
| 4 |
+ … =ln2.
See main article: Taylor series. The Taylor series of a real or complex-valued function ƒ(x) that is infinitely differentiable at a real or complex number a is the power series
f(a)+
| f'(a) | |
| 1! |
(x-a)+
| f''(a) | |
| 2! |
(x-a)2+
| f(3)(a) | |
| 3! |
(x-a)3+ … .
which can be written in the more compact sigma notation as
\sumn=0infty
| f(n)(a) | |
| n! |
(x-a)n
where n! denotes the factorial of n and ƒ (n)(a) denotes the nth derivative of ƒ evaluated at the point a. The derivative of order zero ƒ is defined to be ƒ itself and and 0! are both defined to be 1. In the case that, the series is also called a Maclaurin series.
A Taylor series of f about point a may diverge, converge at only the point a, converge for all x such that
|x-a|<R
See main article: Fourier series. Fourier series decomposes periodic functions or periodic signals into the sum of a (possibly infinite) set of simple oscillating functions, namely sines and cosines (or complex exponentials). The study of Fourier series typically occurs and is handled within the branch mathematics > mathematical analysis > Fourier analysis.
Integration is a formalization of the problem of finding the area bound by a curve and the related problems of determining the length of a curve or volume enclosed by a surface. The basic strategy to solving problems of this type was known to the ancient Greeks and Chinese, and was known as the method of exhaustion. Generally speaking, the desired area is bounded from above and below, respectively, by increasingly accurate circumscribing and inscribing polygonal approximations whose exact areas can be computed. By considering approximations consisting of a larger and larger ("infinite") number of smaller and smaller ("infinitesimal") pieces, the area bound by the curve can be deduced, as the upper and lower bounds defined by the approximations converge around a common value.
The spirit of this basic strategy can easily be seen in the definition of the Riemann integral, in which the integral is said to exist if upper and lower Riemann (or Darboux) sums converge to a common value as thinner and thinner rectangular slices ("refinements") are considered. Though the machinery used to define it is much more elaborate compared to the Riemann integral, the Lebesgue integral was defined with similar basic ideas in mind. Compared to the Riemann integral, the more sophisticated Lebesgue integral allows area (or length, volume, etc.; termed a "measure" in general) to be defined and computed for much more complicated and irregular subsets of Euclidean space, although there still exist "non-measurable" subsets for which an area cannot be assigned.
See main article: Riemann integral. The Riemann integral is defined in terms of Riemann sums of functions with respect to tagged partitions of an interval. Let
[a,b]
\cal{P}
[a,b]
a=x0\let1\lex1\let2\lex2\le … \lexn-1\letn\lexn=b.
This partitions the interval
[a,b]
n
[xi-1,xi]
i=1,\ldots,n
ti\in[xi-1,xi]
f
[a,b]
f
\cal{P}
| n | |
| \sum | |
| i=1 |
f(ti)\Deltai,
where
\Deltai=xi-xi-1
i
f
[a,b]
S
\varepsilon>0
\delta>0
\cal{P}
\|\Deltai\|<\delta
\left|S-
| n | |
| \sum | |
| i=1 |
f(ti)\Deltai\right|<\varepsilon.
This is sometimes denoted . When the chosen tags give the maximum (respectively, minimum) value of each interval, the Riemann sum is known as the upper (respectively, lower) Darboux sum. A function is Darboux integrable if the upper and lower Darboux sums can be made to be arbitrarily close to each other for a sufficiently small mesh. Although this definition gives the Darboux integral the appearance of being a special case of the Riemann integral, they are, in fact, equivalent, in the sense that a function is Darboux integrable if and only if it is Riemann integrable, and the values of the integrals are equal. In fact, calculus and real analysis textbooks often conflate the two, introducing the definition of the Darboux integral as that of the Riemann integral, due to the slightly easier to apply definition of the former.
The fundamental theorem of calculus asserts that integration and differentiation are inverse operations in a certain sense.
See main article: Lebesgue integral. Lebesgue integration is a mathematical construction that extends the integral to a larger class of functions; it also extends the domains on which these functions can be defined. The concept of a measure, an abstraction of length, area, or volume, is central to Lebesgue integral probability theory.
See main article: Distribution (mathematics). Distributions (or generalized functions) are objects that generalize functions. Distributions make it possible to differentiate functions whose derivatives do not exist in the classical sense. In particular, any locally integrable function has a distributional derivative.
Real analysis is an area of analysis that studies concepts such as sequences and their limits, continuity, differentiation, integration and sequences of functions. By definition, real analysis focuses on the real numbers, often including positive and negative infinity to form the extended real line. Real analysis is closely related to complex analysis, which studies broadly the same properties of complex numbers. In complex analysis, it is natural to define differentiation via holomorphic functions, which have a number of useful properties, such as repeated differentiability, expressibility as power series, and satisfying the Cauchy integral formula.
In real analysis, it is usually more natural to consider differentiable, smooth, or harmonic functions, which are more widely applicable, but may lack some more powerful properties of holomorphic functions. However, results such as the fundamental theorem of algebra are simpler when expressed in terms of complex numbers.
Techniques from the theory of analytic functions of a complex variable are often used in real analysis – such as evaluation of real integrals by residue calculus.
Important results include the Bolzano–Weierstrass and Heine–Borel theorems, the intermediate value theorem and mean value theorem, Taylor's theorem, the fundamental theorem of calculus, the Arzelà-Ascoli theorem, the Stone-Weierstrass theorem, Fatou's lemma, and the monotone convergence and dominated convergence theorems.
Various ideas from real analysis can be generalized from the real line to broader or more abstract contexts. These generalizations link real analysis to other disciplines and subdisciplines. For instance, generalization of ideas like continuous functions and compactness from real analysis to metric spaces and topological spaces connects real analysis to the field of general topology, while generalization of finite-dimensional Euclidean spaces to infinite-dimensional analogs led to the concepts of Banach spaces and Hilbert spaces and, more generally to functional analysis. Georg Cantor's investigation of sets and sequence of real numbers, mappings between them, and the foundational issues of real analysis gave birth to naive set theory. The study of issues of convergence for sequences of functions eventually gave rise to Fourier analysis as a subdiscipline of mathematical analysis. Investigation of the consequences of generalizing differentiability from functions of a real variable to ones of a complex variable gave rise to the concept of holomorphic functions and the inception of complex analysis as another distinct subdiscipline of analysis. On the other hand, the generalization of integration from the Riemann sense to that of Lebesgue led to the formulation of the concept of abstract measure spaces, a fundamental concept in measure theory. Finally, the generalization of integration from the real line to curves and surfaces in higher dimensional space brought about the study of vector calculus, whose further generalization and formalization played an important role in the evolution of the concepts of differential forms and smooth (differentiable) manifolds in differential geometry and other closely related areas of geometry and topology.
\{an\}
\Rn