-
Imagine an island where 100 people,
-
all perfect logicians,
are imprisoned by a mad dictator.
-
There's no escape,
except for one strange rule.
-
Any prisoner can approach the guards
at night and ask to leave.
-
If they have green eyes,
they'll be released.
-
If not, they'll be tossed
into the volcano.
-
As it happens,
all 100 prisoners have green eyes,
-
but they've lived there since birth,
-
and the dictator has ensured
they can't learn their own eye color.
-
There are no reflective surfaces,
-
all water is in opaque containers,
-
and most importantly,
-
they're not allowed
to communicate among themselves.
-
Though they do see each other
during each morning's head count.
-
Nevertheless, they all know no one would
ever risk trying to leave
-
without absolute certainty of success.
-
After much pressure
from human rights groups,
-
the dictator reluctantly agrees
to let you visit the island
-
and speak to the prisoners
under the following conditions:
-
you may only make one statement,
-
and you cannot tell them
any new information.
-
What can you say
to help free the prisoners
-
without incurring the dictator's wrath?
-
After thinking long and hard,
-
you tell the crowd,
"At least one of you has green eyes."
-
The dictator is suspicious,
-
but reassures himself that your statement
couldn't have changed anything.
-
You leave, and life on the island
seems to go on as before.
-
But on the hundredth morning
after your visit,
-
all the prisoners are gone,
-
each having asked to leave
the previous night.
-
So how did you outsmart the dictator?
-
It might help to realize that the amount
of prisoners is arbitrary.
-
Let's simplify things
by imagining just two, Adria and Bill.
-
Each sees one person with green eyes,
-
and for all they know,
that could be the only one.
-
For the first night, each stays put.
-
But when they see each other
still there in the morning,
-
they gain new information.
-
Adria realizes that if Bill had seen
a non-green-eyed person next to him,
-
he would have left the first night
-
after concluding the statement
could only refer to himself.
-
Bill simultaneously realizes
the same thing about Adria.
-
The fact that other person waited
-
tells each prisoner his
or her own eyes must be green.
-
And on the second morning,
they're both gone.
-
Now imagine a third prisoner.
-
Adria, Bill and Carl each see
two green-eyed people,
-
but aren't sure if each of the others
is also seeing two green-eyed people,
-
or just one.
-
They wait out the first night as before,
-
but the next morning,
they still can't be sure.
-
Carl thinks, "If I have non-green-eyes,
-
Adria and Bill were just
watching each other,
-
and will now both leave
on the second night."
-
But when he sees both
of them the third morning,
-
he realizes they must
have been watching him, too.
-
Adria and Bill have each
been going through the same process,
-
and they all leave on the third night.
-
Using this sort of inductive reasoning,
-
we can see that the pattern will repeat
no matter how many prisoners you add.
-
The key is the concept
of common knowledge,
-
coined by philosopher David Lewis.
-
The new information was not contained
in your statement itself,
-
but in telling it to everyone
simultaneously.
-
Now, besides knowing at least one
of them has green eyes,
-
each prisoner also knows
that everyone else is keeping track
-
of all the green-eyed people they can see,
-
and that each of them
also knows this, and so on.
-
What any given prisoner doesn't know
-
is whether they themselves are one
of the green-eyed people
-
the others are keeping track of
-
until as many nights have passed
as the number of prisoners on the island.
-
Of course, you could have spared
the prisoners 98 days on the island
-
by telling them at least 99 of you
have green eyes,
-
but when mad dictators are involved,
you're best off with a good headstart.
closed TED
