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The Limits of Computation
Intractable and Non-computable functions
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Decision Problems
A specific set of computations are classified as decision problems.
An algorithm describes a decision problem if its output is simply YES or NO, depending on whether a certain property holds for its input.
Example:Given a set of n shapes,can these shapes bearranged into a rectangle?
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Monkey Puzzle Problem
Given: A set of n square cards whose sides are imprinted
with the upper and lower halves of colored monkeys. n is a square number, such that n = m2. Cards cannot be rotated.
Problem: Determine if an arrangement of the n cards in an
m X m grid exists such that each adjacent pair of cards display the upper and lower half of a monkey of the same color.
Source: www.dwheeler.com (2002)
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Analysis
Simple algorithm: Pick one card for each cell of m X m grid. Verify if each pair of touching edges make a full
monkey of the same color. If not, try another arrangement until a solution is
found or all possible arrangements are checked. Answer "YES" if a solution is found. Otherwise,
answer "NO" if all arrangements are analyzed and no solution is found.
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Analysis
If there are n = 9 cards (m = 3):
To fill the first cell, we have 9 card choices.
To fill the second cell, we have 8 card choices left.
To fill the third cell, we have 7 card choices remaining.
etc.
The total number of unique arrangements for n = 9 cards is:
9 * 8 * 7 * 6 * 5 * 4 * 3 * 2 * 1 = 362,880
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Analysis
For n cards, the number of arrangements to examine is n! (n factorial)
If we can analyze one arrangement in a microsecond:
n Time to analyze all arrangements
9 362880 s = 0.36288 s
16 20922789888000 s
25 15511210043330985984000000 s
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Map Coloring
Given a map of n territories, can the map be colored using k colors such that no two adjacent territories are colored with the same color?
k=4: Answer is always yes. k=2: Only if the map contains no point that
is the junction of an odd number of territories.
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Map Coloring
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Map Coloring
Given a map of 48 territories, can the map be colored using 3 colors such that no two adjacent territories are colored with the same color? Pick a color for California (3 choices) Pick a color for Nevada (3 choices) ...
There are 348 = 79766443076872509863361possible colorings (not necessarily valid).
No one has come up with a better algorithmic solution that works in general for any map, so far.
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Classifications
Algorithms that are O(nk) for some fixed k are polynomial-time algorithms. O(1), O(log n), O(n), O(n log n), O(n2) reasonable, tractable
All other algorithms are super-polynomial-time algorithms. O(2n), O(n!), O(nn) unreasonable, intractable
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Traveling Salesperson
Given: a weighted graph of nodes representing cities and edges representing flight paths (weights represent cost)
Is there a route that takes the salesperson through every city and back to the starting city with cost no more than k? The salesperson can visit a city only once
(except for the start and end of the trip).
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Traveling Salesperson
A
B
D
C
G
E
F
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64
59
810
7 11
3
7
7
Is there a route with cost at most 52? YES (Route above costs 50.)Is there a route with cost at most 48? YES? NO?
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Traveling Salesperson
If there are n cities, what is the maximum number of routes that we might need to compute?
Worst-case: There is a flight available between every pair of cities.
Compute cost of every possible route. Pick a starting city Pick the next city (n-1 choices remaining) Pick the next city (n-2 choices remaining) ...
Maximum number of routes: (n-1)! = O(n!)
how tobuild aroute
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P and NP
The class P consists of all those decision problems that can be solved on a deterministic sequential machine (e.g. a computer) in an amount of time that is polynomial with respect to the size of the input
The class NP consists of all those decision problems whose positive solutions can be verified in polynomial time given the right information.
from Wikipedia
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NP Complete
The class NPC consists of all those problems in NP that are least likely to be in P. Each of these problems is called NP Complete. Monkey puzzle, Traveling salesperson, and
map coloring are all in NPC.
Every problem in NPC can be transformed to another problem in NPC. If there were some way to solve one of these problems
in polynomial time, we should be able to solve all of these problems in polynomial time.
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Complexity Classes
NP Problems
P ProblemsNP Complete
Problems
But does P = NP?If P ≠ NP, then all decision problems can be brokendown into this classification scheme.If P = NP, then all three classes are one and the same.
The Clay Mathematics Institute is offering a $1M prize for the first person to prove P = NP or P ≠ NP. (http://www.claymath.org/millennium/P_vs_NP/)
We know that P < NP, sinceany problem that can be solvedin polynomial time can certainlyhave a solution verified in polynomial time.
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19
It gets worse...
Tractable Problems Problems that have reasonable, polynomial-
time solutions Intractable Problems
Problems that may have no reasonable, polynomial-time solutions
Noncomputable Problems Problems that have no algorithms at all to solve
them
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Noncomputability and Undecidability
An algorithmic problem that has no algorithm is called noncomputable.
If the noncomputable algorithm requires only a yes/no answer, the problem is called undecidable.
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Noncomputability and Undecidability
Example: Given any set of any number of different tile
designs (examples shown above), with an infinite number of each type of tile, can we tile any area with these tiles without rotation so that like colored edges touch?
This problem is undecidable!
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Tiling Problem
YES
Note the periodicity in the tiling.
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Tiling Problem
NO
For this 3 X 3 room, if we try all 39 tiling configurations, no tiling works.
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Tiling Problem
Possible algorithm: If we find a repeating pattern, report YES. If we find a floor we cannot tile, report NO.
But this algorithm isn’t correct: there are some tilings which have no repeating pattern!
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Tom’s Believe-It-Or-Not! If you take the same problem and allow
tile rotations, you can ALWAYS tile any room regardless of the size.
This problem is definitely computable!
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Another Undecidable Problem:The Barber Paradox
Suppose there is a town with one male barber; and that every man in the town keeps himself clean-shaven: some shave themselves and some are shaved by the barber. Only the barber can shave another man. The barber shaves all and only those men who do not shave themselves.
Does the barber shave himself?
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Program Termination
Can we determine if a program will terminate given a valid input?
Example:x = input (“Input a positive integer”)
while x != 1:
x = x - 2
Does this algorithm terminate when x = 15105? Does this algorithm terminate when x = 2008? Does this algorithm terminate for any positive x?
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Program Termination
Another Example:x = input (“Input a positive integer”)
while x != 1:
if x % 2 == 0:
x = x / 2
else:
x = 3 * x + 1
Does this algorithm terminate for x = 15? Does this algorithm terminate for x = 105? Does this algorithm terminate for any positive x?
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The Halting Problem
Suppose a program called the Terminator existed that could take ANY program and determine if it terminates or not.
What happens if it tries to analyze this “evil” program P?
Program P:
Run the Terminator on program P (i.e. this program itself) and see what answer it gives.
If the Terminator says YES (i.e. this program terminates):
go into an infinite loop.
Else:
halt immediately.
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The Halting Problem
Can we write a general program Q that takes as its input any program P and an input I and determines if program P will terminate (halt) when run with input I? It will answer YES if P terminates successfully on input I. It will answer NO if P never terminates on input I.
This computational problem is undecidable! No such general program Q can exist! It doesn’t matter how powerful the computer is. It doesn’t matter how much time we devote to the computation. The proof of this involves contradiction.
AlanTuring
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start
end
Does this algorithm end?
yes
no
Contradiction
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Contradiction isn't just forcomputer scientists...
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The Big Ideas
Many problems are Tractable Problems that have reasonable, polynomial-time
solutions Some problems are Intractable
Problems that have no reasonable, polynomial-time solutions
NP Complete problems are those that are least likely to be tractable (but we haven’t proven or disproven this yet)
Some problems are noncomputable Problems that have no algorithms at all to solve them
in general