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Chapter 11

Chapter 11. Limitations of Algorithm Power. Lower Bounds. Lower bound : an estimate on a minimum amount of work needed to solve a given problem Examples: number of comparisons needed to find the largest element in a set of n numbers number of comparisons needed to sort an array of size n

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Chapter 11

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  1. Chapter 11 Limitations of Algorithm Power

  2. Lower Bounds Lower bound: an estimate on a minimum amount of work needed to solve a given problem Examples: • number of comparisons needed to find the largest element in a set of n numbers • number of comparisons needed to sort an array of size n • number of comparisons necessary for searching in a sorted array • number of multiplications needed to multiply two n-by-n matrices

  3. Lower Bounds (cont.) • Lower bound can be • an exact count • an efficiency class () • Tight lower bound: there exists an algorithm with the same efficiency as the lower bound Problem Lower bound Tightness sorting (nlog n) yes searching in a sorted array (log n) yes element uniqueness (nlog n) yes n-digit integer multiplication (n) unknown multiplication of n-by-n matrices (n2) unknown

  4. Methods for Establishing Lower Bounds • trivial lower bounds • information-theoretic arguments (decision trees) • adversary arguments • problem reduction

  5. Trivial Lower Bounds Trivial lower bounds: based on counting the number of items that must be processed in input and generated as output Examples • finding max element • polynomial evaluation • sorting • element uniqueness • Hamiltonian circuit existence Conclusions • may and may not be useful • be careful in deciding how many elements must be processed

  6. Decision Trees Decision tree — a convenient model of algorithms involving comparisons in which: • internal nodes represent comparisons • leaves represent outcomes Decision tree for 3-element insertion sort

  7. Decision Trees and Sorting Algorithms • Any comparison-based sorting algorithm can be represented by a decision tree • Number of leaves (outcomes)  n! • Height of binary tree with n! leaves  log2n! • Minimum number of comparisons in the worst case  log2n! for any comparison-based sorting algorithm • log2n!  n log2n • This lower bound is tight (mergesort)

  8. Adversary Arguments Adversary argument: a method of proving a lower bound by playing role of adversary that makes algorithm work the hardest by adjusting input Example 1: “Guessing” a number between 1 and n with yes/no questions Adversary: Puts the number in a larger of the two subsets generated by last question Example 2: Merging two sorted lists of size n a1 < a2 < … < an and b1 < b2 < … < bn Adversary: ai < bjiff i < j Output b1 < a1 < b2 < a2 < … < bn < an requires 2n-1 comparisons of adjacent elements

  9. Lower Bounds by Problem Reduction Idea: If problem P is at least as hard as problem Q, then a lower bound for Q is also a lower bound for P. Hence, find problem Q with a known lower boundthat can be reduced to problem P in question. Example: P is finding MST for n points in Cartesian plane Q is element uniqueness problem (known to be in (nlogn))

  10. 11.3 P, NP, and NP-complete Problems • An algorithm solves a problem in polynomial time if its worst-case time efficiency belongs to O(p(n)) • Where p(n) is a polynomial of the problem’s input size n • Problems that can be solved in polynomial time are called tractable • Problems that cannot be solved in polynomial time are called intractable. • Cannot solve intractable problems in a reasonable length of time

  11. 25 city Traveling Salesperson Problem • There are 25! different possible paths to be considered. • That is approximately 1.5 x 1025 different paths. • Suppose the computer can analyze 10,000,000, or 107, paths per second. • The number of seconds required to check all possible paths is about 1.5 x 1025/107, or about 1.5 x 1018 seconds. • That’s roughly 1012 years: about a trillion years. • This would not be a feasible algorithm.

  12. The Halting Problem • Turing – 1936 • Given a computer program and an input to it, determine whether the program will halt on that input or continue working indefinitely on it. • Assume that A is an algorithm that solves the halting problem: A(P, I) = 1 if P halts on input I, 0 otherwise • Consider P as an input to itself and use the output of A for pair (P,P) to construct a program Q as follows: • Q(P) halts if A(P,P) = 0 (if program P does not halt on input P) • Q(P) does not halt if A(P, P) = 1 • Then substituting Q for P we obtain • Q(Q) halts if A(Q, Q) = 0 i.e. if program Q does not halt on input Q • Q(Q) does not halt if A(Q, Q) = 1 i.e. if program Q halts on input Q • This is a contradiction because neither of the two outcomes for program Q is possible. QED

  13. Classifying Problem Complexity Is the problemtractable,i.e., is there a polynomial-time (O(p(n)) algorithm that solves it? Possible answers: • yes (give examples) • no • because it’s been proved that no algorithm exists at all (e.g., Turing’s halting problem) • because it’s been be proved that any algorithm takes exponential time • unknown

  14. Problem Types: Optimization and Decision • Optimization problem: find a solution that maximizes or minimizes some objective function • Decision problem: answer yes/no to a question Many problems have decision and optimization versions. E.g.: traveling salesman problem • optimization: find Hamiltonian cycle of minimum length • decision: find Hamiltonian cycle of length m Decision problems are more convenient for formal investigation of their complexity.

  15. Class P P: the class of decision problems that are solvable in O(p(n)) time, where p(n) is a polynomial of problem’s input size n Examples: • searching • element uniqueness • graph connectivity • graph acyclicity • primality testing (finally proved in 2002)

  16. Class NP NP (nondeterministic polynomial): class of decision problems whose proposed solutions can be verified in polynomial time = solvable by a nondeterministicpolynomial algorithm A nondeterministic polynomial algorithm is an abstract two-stage procedure that: • generates a random string purported to solve the problem • checks whether this solution is correct in polynomial time By definition, it solves the problem if it’s capable of generating and verifying a solution on one of its tries Why this definition? • led to development of the rich theory called “computational complexity”

  17. Example: CNF satisfiability Problem: Is a boolean expression in its conjunctive normal form (CNF) satisfiable, i.e., are there values of its variables that makes it true? This problem is in NP. Nondeterministic algorithm: • Guess truth assignment • Substitute the values into the CNF formula to see if it evaluates to true Example: (A | ¬B | ¬C) &(A | B) & (¬B | ¬D |E)&(¬D | ¬E) Truth assignments: A B C D E 0 0 0 0 0 . . . 1 1 1 1 1 Checking phase: O(n)

  18. What problems are in NP? • Hamiltonian circuit existence • Partition problem: Is it possible to partition a set of n integers into two disjoint subsets with the same sum? • Decision versions of TSP, knapsack problem, graph coloring, and many other combinatorial optimization problems. (Few exceptions include: MST, shortest paths) • All the problems in P can also be solved in this manner (but no guessing is necessary), so we have: PNP • Big question: P = NP ?

  19. NP-Complete Problems A decision problem D is NP-complete if it’s as hard as any problem in NP, i.e., • D is in NP • every problem in NP is polynomial-time reducible to D Cook’s theorem (1971): CNF-sat is NP-complete

  20. NP-Complete Problems (cont.) Other NP-complete problems obtained through polynomial- time reductions from a known NP-complete problem Examples: TSP, knapsack, partition, graph-coloring and hundreds of other problems of combinatorial nature

  21. P = NP ?Dilemma Revisited • P = NP would imply that every problem in NP, including all NP-complete problems,could be solved in polynomial time • If a polynomial-time algorithm for just one NP-complete problem is discovered, then every problem in NP can be solved in polynomial time, i.e., P = NP • Most but not all researchers believe that P NP , i.e. P is a proper subset of NP

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