The paradox at the heart of mathematics: Gödel's Incompleteness Theorem - Marcus du Sautoy
3,678,101 views ・ 2021-07-20
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00:06
Consider the following sentence:
“This statement is false.”
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Is that true?
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If so, that would make
this statement false.
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But if it’s false, then the statement
is true.
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By referring to itself directly, this
statement creates an unresolvable paradox.
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So if it’s not true and it’s not false—
what is it?
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This question might seem
like a silly thought experiment.
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But in the early 20th century,
it led Austrian logician Kurt Gödel
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to a discovery that would change
mathematics forever.
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Gödel’s discovery had to do with
the limitations of mathematical proofs.
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A proof is a logical argument
that demonstrates
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why a statement about numbers is true.
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The building blocks of these arguments
are called axioms—
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undeniable statements
about the numbers involved.
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Every system built on mathematics,
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from the most complex proof
to basic arithmetic,
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is constructed from axioms.
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And if a statement about numbers is true,
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mathematicians should be able to confirm
it with an axiomatic proof.
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Since ancient Greece,
mathematicians used this system
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to prove or disprove mathematical claims
with total certainty.
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But when Gödel entered the field,
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some newly uncovered logical paradoxes
were threatening that certainty.
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Prominent mathematicians were eager
to prove
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that mathematics had no contradictions.
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Gödel himself wasn’t so sure.
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And he was even less confident
that mathematics was the right tool
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to investigate this problem.
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While it’s relatively easy to create
a self-referential paradox with words,
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numbers don't typically
talk about themselves.
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A mathematical statement is simply
true or false.
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But Gödel had an idea.
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First, he translated mathematical
statements and equations into code numbers
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so that a complex mathematical idea could
be expressed in a single number.
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This meant that mathematical statements
written with those numbers
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were also expressing something about
the encoded statements of mathematics.
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In this way, the coding allowed
mathematics to talk about itself.
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Through this method, he was able to write:
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“This statement cannot be proved”
as an equation,
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creating the first self-referential
mathematical statement.
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However, unlike the ambiguous
sentence that inspired him,
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mathematical statements must be
true or false.
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So which is it?
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If it’s false, that means the statement
does have a proof.
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But if a mathematical statement has
a proof, then it must be true.
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This contradiction means that Gödel’s
statement can’t be false,
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and therefore it must be true that
“this statement cannot be proved.”
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Yet this result is even more surprising,
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because it means we now have
a true equation of mathematics
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that asserts it cannot be proved.
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This revelation is at the heart
of Gödel’s Incompleteness Theorem,
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which introduces an entirely new class
of mathematical statement.
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In Gödel’s paradigm, statements still
are either true or false,
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but true statements can either be
provable or unprovable
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within a given set of axioms.
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Furthermore, Gödel argues these
unprovable true statements
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exist in every axiomatic system.
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This makes it impossible to create
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a perfectly complete system
using mathematics,
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because there will always be true
statements we cannot prove.
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Even if you account for these
unprovable statements
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by adding them as new axioms
to an enlarged mathematical system,
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that very process introduces new
unprovably true statements.
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No matter how many axioms you add,
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there will always be unprovably true
statements in your system.
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It’s Gödels all the way down!
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This revelation rocked the foundations
of the field,
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crushing those who dreamed that every
mathematical claim would one day
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be proven or disproven.
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While most mathematicians accepted this
new reality, some fervently debated it.
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Others still tried to ignore
the newly uncovered a hole
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in the heart of their field.
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But as more classical problems were proven
to be unprovably true,
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some began to worry their life's work
would be impossible to complete.
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Still, Gödel’s theorem opened
as many doors as a closed.
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Knowledge of unprovably true statements
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inspired key innovations
in early computers.
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And today, some mathematicians dedicate
their careers
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to identifying provably
unprovable statements.
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So while mathematicians may have
lost some certainty,
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thanks to Gödel they can embrace
the unknown
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at the heart of any quest for truth.
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