Cantor's diagonal argument: Difference between revisions

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(added informal idea; in the formal section phi_i was not defined. Changed \Phi to F (as it was easily confused with \phi))
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'''Cantor's diagonal argument''' provides a convenient proof that the set <math>2^{\mathbb{N}}</math> of subsets of the [[natural number]]s (also known as its [[power set]] is not [[countable set|countable]]. More generally, it is a recurring theme in [[computability]] theory, where perhaps its most well known application is the negative solution to the [[halting problem]].
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'''Cantor's diagonal argument''' provides a convenient proof that the set <math>2^{\mathbb{N}}</math> of subsets of the [[natural number]]s (also known as its [[power set]]) is not [[countable set|countable]]. More generally, it is a recurring theme in [[computability]] theory, where perhaps its most well known application is the negative solution to the [[halting problem]].


==Informal description==
==Informal description==
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:1, '''1''', 1, 1, 0, ...
:1, '''1''', 1, 1, 0, ...
:1, 0, '''1''', 0, 0, ...
:1, 0, '''1''', 0, 0, ...
Now, we construct a sequence <math>s=(s_1,s_2,s_3,....)</math>, which is ''not'' on the list while still, <math>s_i\in\{0,1\}</math> for all ''i''. This is done as follows. Take <math>s_1</math> to be ''different'' from the first digit of the first member on the list. In our example the digit is 0 (in boldface) and so <math>s_1</math> is defined to be 1. Take <math>s_2</math> to be ''different'' from the second digit of the second member on the list (in our example <math>s_2=0</math>). Generally, define <math>s_n</math> as different from the n-th digit of the n-th entry on the list. In other words, the sequence ''s=(s_1,s_2,s_3,....)'' contains "the complement in <math>\{0,1\}</math>" of the diagonal of our table. It follows that that the sequence ''s'' itself is not on the list, since it is different from every member by the definition. The list was supposed to contain ''all'' the 0-1 sequences. The contradiction shows that such sequences can not be enumerated (or they are not countable).  
Now, we construct a sequence ''s'' = (''s''<sub>1</sub>, ''s''<sub>2</sub>, ''s''<sub>3</sub>, ....), which is ''not'' on the list while still, <math>s_i\in\{0,1\}</math> for all ''i''. This is done as follows. Take <math>s_1</math> to be ''different'' from the first digit of the first member on the list. In our example the digit is 0 (in boldface) and so <math>s_1</math> is defined to be 1. Take <math>s_2</math> to be ''different'' from the second digit of the second member on the list (in our example <math>s_2=0</math>). Generally, define <math>s_n</math> as different from the n-th digit of the n-th entry on the list. In other words, the sequence ''s'' = (''s''<sub>1</sub>, ''s''<sub>2</sub>, ''s''<sub>3</sub>, ....) contains "the complement in <math>\{0,1\}</math>" of the diagonal of our table. It follows that the sequence ''s'' itself is not on the list, since it is different from every member by the definition. The list was supposed to contain ''all'' the 0-1 sequences. The contradiction shows that such sequences can not be enumerated (or they are not countable).  


The role of the diagonal clearly explains the name of the argument.  
The role of the diagonal clearly explains the name of the argument.


==Formal argument==
==Formal argument==
To prove that the family of all subsets of <math>\mathbb{N}</math> is not countable, we associate to any set <math>S \subset \mathbb{N}</math> a function <math>\phi : \mathbb{N} \rightarrow \{0, 1\}</math> by setting <math>\phi(n) = 1</math> if <math>n \in S</math> and <math>\phi(n) = 0</math>, otherwise. Conversely, every such function defines a subset. Observe also that every such function corresponds to a 0-1 sequence and vice-versa.  
To prove that the family of all subsets of <math>\mathbb{N}</math> is not countable, we associate to any set <math>S \subset \mathbb{N}</math> its [[characteristic function]] <math>\phi : \mathbb{N} \rightarrow \{0, 1\}</math> by setting <math>\phi(n) = 1</math> if <math>n \in S</math> and <math>\phi(n) = 0</math>, otherwise. Conversely, every such function defines a subset. Observe also that every such function corresponds to a 0-1 sequence and vice-versa.  


If power set is countable, there is a bijective map <math>F : \mathbb{N} \rightarrow 2^{\mathbb{N}}</math>, that allows us to assign an index <math>i = F^{-1} (S)</math> to every subset S. In other words, all the functions <math> \phi: \mathbb{N} \rightarrow \{0, 1\}</math> can be enumerated as <math>\{\phi_1, \phi_2, \phi_3, \ldots \}</math>. Assuming this has been done, we proceed to construct a function <math>\psi : \mathbb{N} \rightarrow \{ 0, 1\}</math> that is not in this list. Consequently, the corresponding set, <math>T</math> cannot be in the range of <math>F</math>.  
If power set is countable, there is a bijective map <math>F : \mathbb{N} \rightarrow 2^{\mathbb{N}}</math>, that allows us to assign an index <math>i = F^{-1} (S)</math> to every subset S. In other words, all the functions <math> \phi: \mathbb{N} \rightarrow \{0, 1\}</math> can be enumerated as <math>\{\phi_1, \phi_2, \phi_3, \ldots \}</math>. Assuming this has been done, we proceed to construct a function <math>\psi : \mathbb{N} \rightarrow \{ 0, 1\}</math> that is not in this list. Consequently, the corresponding set, <math>T</math> cannot be in the range of <math>F</math>.  
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For each <math>i</math>, either <math>\phi_i(i) = 0</math> or <math>\phi_i(i) = 1</math>, and so we define <math>\psi(i)=1-\phi_i(i)</math>. Clearly, <math>\psi(i)\in \{0,1\}</math> and <math>\psi(i) \not= \phi_i(i)</math>.
For each <math>i</math>, either <math>\phi_i(i) = 0</math> or <math>\phi_i(i) = 1</math>, and so we define <math>\psi(i)=1-\phi_i(i)</math>. Clearly, <math>\psi(i)\in \{0,1\}</math> and <math>\psi(i) \not= \phi_i(i)</math>.


It follows that <math>\psi \not= \phi_i </math> for any <math>i</math>, and it must therefore correspond to a set not in the range of <math>\Psi</math>. This contradiction shows that <math>2^{\mathbb{N}}</math> cannot be countable.
It follows that <math>\psi \not= \phi_i </math> for any <math>i</math>, and it must therefore correspond to a set not in the range of <math>F</math>. This contradiction shows that <math>2^{\mathbb{N}}</math> cannot be countable.


[[Category:CZ Live]]
==Application to general sets==
[[Category:Mathematics Workgroup]]
More generally, the argument shows that a [[set]] cannot be put into [[one-to-one correspondence]] with its [[power set]]: equivalently, the [[cardinality]] of a set is strictly less than that of its power set.  The argument proceeds by showing that there cannot be a [[surjection]] from a set ''X'' to the set ''PX'' of subsets of ''X''.  Suppose if possible that there were such a surjection ''f''.  Form the set
 
:<math> C = \{ x \in X : x \not\in f(x) \} . \, </math>
 
Since ''C'' is a subset of ''X'' then from the assumption that ''f'' is surjective there is an element ''c'' of ''X'' such that ''f''(''c'') = ''C''.  We now ask whether ''c'' is in ''C''.  We find that
 
:<math> c \in C \Leftrightarrow c \in \{ x \in X : x \not\in f(x) \} \Leftrightarrow c \not\in f(c) \Leftrightarrow c \not\in C , \,</math>
 
which is a contradiction.  Hence the supposition that ''f'' is a surjection is untenable.  In particular, then, ''f'' cannot be a [[bijection]].[[Category:Suggestion Bot Tag]]

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Cantor's diagonal argument provides a convenient proof that the set of subsets of the natural numbers (also known as its power set) is not countable. More generally, it is a recurring theme in computability theory, where perhaps its most well known application is the negative solution to the halting problem.

Informal description

The original Cantor's idea was to show that the family of 0-1 infinite sequences is not countable. This is done by contradiction. If this family is countable then its members can be enumerated or enlisted. Such a list gives a table of digits, like in the following arbitrarily chosen example:

0, 1, 0, 1, 0, ...
1, 1, 1, 1, 0, ...
1, 0, 1, 0, 0, ...

Now, we construct a sequence s = (s1, s2, s3, ....), which is not on the list while still, for all i. This is done as follows. Take to be different from the first digit of the first member on the list. In our example the digit is 0 (in boldface) and so is defined to be 1. Take to be different from the second digit of the second member on the list (in our example ). Generally, define as different from the n-th digit of the n-th entry on the list. In other words, the sequence s = (s1, s2, s3, ....) contains "the complement in " of the diagonal of our table. It follows that the sequence s itself is not on the list, since it is different from every member by the definition. The list was supposed to contain all the 0-1 sequences. The contradiction shows that such sequences can not be enumerated (or they are not countable).

The role of the diagonal clearly explains the name of the argument.

Formal argument

To prove that the family of all subsets of is not countable, we associate to any set its characteristic function by setting if and , otherwise. Conversely, every such function defines a subset. Observe also that every such function corresponds to a 0-1 sequence and vice-versa.

If power set is countable, there is a bijective map , that allows us to assign an index to every subset S. In other words, all the functions can be enumerated as . Assuming this has been done, we proceed to construct a function that is not in this list. Consequently, the corresponding set, cannot be in the range of .

For each , either or , and so we define . Clearly, and .

It follows that for any , and it must therefore correspond to a set not in the range of . This contradiction shows that cannot be countable.

Application to general sets

More generally, the argument shows that a set cannot be put into one-to-one correspondence with its power set: equivalently, the cardinality of a set is strictly less than that of its power set. The argument proceeds by showing that there cannot be a surjection from a set X to the set PX of subsets of X. Suppose if possible that there were such a surjection f. Form the set

Since C is a subset of X then from the assumption that f is surjective there is an element c of X such that f(c) = C. We now ask whether c is in C. We find that

which is a contradiction. Hence the supposition that f is a surjection is untenable. In particular, then, f cannot be a bijection.