Real Analysis/Continuity

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Real Analysis
Continuity

Now that we've defined the limit of a function, we're in a position to define what it means for a function to be continuous. The notion of Continuity captures the intuitive picture of a function "having no sudden jumps or oscillations". Yet, in this page, we will move away from this elementary definition into something with checklists; something with rigor. This will be important not just in Real Analysis, but in other fields of mathematics as well.

Continuity marks a new classification of functions, especially prominent when the theorems explained later on in this page will be put to use. However, if one is reading this wikibook linearly, then it will be good to note that the wikibook will describe functions with even more properties than continuity. As an example, the functions in elementary mathematics, such as polynomials, trigonometric functions, and the exponential and logarithmic functions, contain many levels more properties than that of a continuous function. We will also see several examples of discontinuous functions as well, to provide some remarks of common functions that do not fit the bill.

Definition

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Definition of a Continuous Function on I

Given an interval   and a function  , continuous on I is defined as upholding the following property:

 

and it is notated as  

Readers may note the similarity between this definition to the definition of a limit in that unlike the limit, where the function   can converge to any value, continuity restricts the returning value to be only the expected value when the function   is evaluated. This added restriction provides many new theorems, as some of the more important ones will be shown in the following headings.

Operations

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Since limits are preserved under algebraic operations, let's check whether this is also the case with continuity.

Algebraic

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We see that if   and   are both continuous at c, continuity still works out fine for the following situations:

List of Continuous Functions that are Preserved Under Algebraic Operations
Addition  
Subtraction  
Product  
Multiple of a Function  
Reciprocal  
Division  

Note that of course, for any division, g(c) must be a valid number i.e. not 0.

This is actually a corollary when you look at the proofs for the preservation of algebraic operation for limits. Simply replace the limit values L and M with ƒ(c) and g(c) respectively.

We can use sequential limits to prove that functions are discontinuous as follows:

  •   is discontinuous at   if and only if there are two sequences   and   such that  .

Composition

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Composition is a lot trickier though, as always, but it still works as intuition would suggest; composition of two continuous functions is still a continuous function.

Theorem

If   is continuous on the range of   and   is continuous on any interval  , then the composition   is continuous on A.

The proof simply works by fulfilling the definition of continuity for the composition function of   and   using variable substitutions based off fulfilling all requirements for those variables. As such, there is no algebra and no theorems used other than purely definitions.

Proof that Composition works for Continuous Functions at c
We know what is needed for continuity first. As such, we will define epsilon using the most basic definition that will fit the requirement for continuity. Let  
Since f must be continuous, we will also write down what we know is true—its checklist of properties fulfilling continuity. For now, we will make a slight modification to the delta variable for reasons that will be justified later.  .
However,   has more properties than that. The key ones are what the value of   and   refer to. Since the function   is continuous on the range of  , that means that the input value of   is actual the output value of  . Thus, we can validly substitute the value   and   for the function   with  's output value.  .
Since g must be continuous, we will also write down what we know is true, which is the definition of continuity.  .
The expression   and   is awfully similar. We can use this to our advantage by seeing if we can abuse any properties we know of. Given that the only requirement for   is that it must be positive and its inequality relationship is valid for any number, and that   is positive and a number, then we can put two and two together and define   as  . Let  
Thus, we abstractly strung together a definition of continuity built off what we know is true; the continuity of   and  . Reading the valid results of what this new implication statement suggests; that continuity for the composition of   and  , we are assured in our claim that the composition of   and   is also continuous. QED. Thus

 

so   is continuous on A.

 


The Three Continuity Theorems

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Think about what an intuitive notion of continuity is. If you can’t the image of a polynomial function always works. The smooth curve as it travels through the domain of the function is a graphical representation of continuity. However, how do we mathematically know that it’s continuous? Well, we’ll start with the Three Continuity Theorems that will verify this notion.

The Intermediate Value Theorem

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This is the big theorem on continuity. Essentially it says that continuous functions have no sudden jumps or breaks.

Theorem
Let f(x) be a continuous function. If   and  , then  .
 
The intermediate value theorem: Given a continuous function on [a,b] and three variables a < c < b it must be the case that ƒ(a) < ƒ(c) < ƒ(b)

Proof

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Let  , and let  .

Let  . By continuity,  .

If f(c) < m, then  , so  . But then  , which implies that c is not an upper bound for S, a contradiction.

If f(c) > m, then since  ,  . But since  ,  , so   = m, which implies that  , a contradiction.  

We will now prove the Minimum-Maximum theorem, which is another significant result that is related to continuity. Essentially, it states that any continuous image of a closed interval is bounded, and also that it attains these bounds.

Minimum-Maximum Theorem

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This theorem functions as a first part in another bigger theorem. However, on its own, it helps bridge the gap between supremums and infimums in regards to functions.

Theorem
Given a continuous function ƒ on [a,b] i.e.  , then   is bounded.
 

Proof

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Assume if possible that   is unbounded.

Let  . Then,   is unbounded on at least one of the closed intervals   and   (for otherwise,   would be bounded on   contradicting the assumption). Call this interval  .

Similarly, partition   into two closed intervals and let   be the one on which   is unbounded.

Thus we have a sequence of nested closed intervals   such that   is unbounded on each of them.

We know that the intersection of a sequence of nested closed intervals is nonempty. Hence, let  

As   is continuous at  , there exists   such that   But by definition, there always exists   such that  , contradicting the assumption that   is unbounded over  . Thus,   is bounded over  

Extreme Value Theorem

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This is the second part of the theorem. It is the more assertive version of the previous theorem, stating that not only is there a supremum and a infimum, it also is reachable by the function ƒ and will be in between the interval you specified.

Theorem
Given a continuous function ƒ on [a,b] i.e.  , if   are respectively the upper and lower bounds of  , then there exist   such that  .
 
A depiction of the Extreme Value Theorem: Given a continuous function on [a,b], there must exist a maximum c and d such that ƒ(c) is the greatest value in the interval and ƒ(d) is the littlest.

Proof

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Assume if possible,   but  .

Consider the function  . By algebraic properties of continuity,   is continuous. However,   being a cluster point of  ,   is unbounded over  , contradicting (i). Hence,  . Similarly, we can show that  .

Appendix

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Continuity will come again in other branches in mathematics. You will come across not only different variations of continuity, but you will also come across different definitions of continuity too.

Uniform Continuity

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Let  
Let  

We say that   is Uniformly Continuous on   if and only if for every   there exists   such that if   and   then  

Lipschitz continuity

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Let  
Let  

We say that   is Lipschitz continuous on   if and only if there exists a positive real constant   such that, for all  ,  .

The smallest such   is called the Lipschitz constant of the function  .

Topological Continuity

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As mentioned, the idea of continuous functions is used in several areas of mathematics, most notably in Topology. A different characterization of continuity is useful in such scenarios.

Theorem

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Let  
Let  

  is continuous at   if and only if for every open neighbourhood   of  , there exists an open neighbourhood   of   such that  

It must be mentioned here that the term "Open Set" can be defined in much more general settings than the set of reals or even metric spaces, and hence the utility of this characterization.