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Heuristic Optimization Methods Prologue

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Title: Heuristic Optimization Methods Prologue


1
Heuristic Optimization MethodsPrologue
  • Chin-Shiuh Shieh

2
Course Information
  • ???? ?????
  • Heuristic Optimization Methods
  • ???? ???
  • ???? (?)1-2,5
  • ???? ?504
  • Could be switched to ?501B
  • ????
  • http//bit.kuas.edu.tw/csshieh

3
Course Information (cont)
  • Objective
  • The study of heuristic optimization methods
  • Course Outline
  • Introduction to Optimization
  • Calculus, Optimization, and Search
  • Linear Programming, Combinatorial Optimization
  • Heuristic Approaches to Optimization
  • Genetic Algorithm
  • Ant Colony System
  • Simulated Annealing
  • Particle Swarm Optimization
  • Tabu Search
  • Memetic Algorithm

4
Course Information (cont)
  • Readings
  • Kwang Y. Lee and Mohamed A. El-Sharkawi, Eds.,
    Modern Heuristic Optimization Techniques, John
    Wiley Sons, 2008.
  • Johann Dreo, Patrick Siarry, Alain Petrowski,
    and Eric Taillard, Metaheuristics for Hard
    Optimization, Springer, 2006.

5
What Is Optimization?
  • Optimization defined in Wikipedia
  • In mathematics, statistics, empirical sciences,
    computer science, or management science,
    mathematical optimization (alternatively,
    optimization or mathematical programming) is the
    selection of a best element (with regard to some
    criteria) from some set of available alternatives.

6
What Is Optimization? (cont)
  • A mathematical formulation
  • Given a function f  A?R from some set A to
    the real numbers
  • Sought an element x0 in A such that f(x0)  f(x)
    for all x in A ("minimization") or such
    that f(x0)  f(x) for all x in A ("maximization").

7
Challenges
  • Object function
  • High dimensionalities
  • Local optimum
  • Huge search space

8
Example Optimization Problems
  • Minimize the costs of shipping from production
    facilities to warehouses
  • Maximize the probability of detecting an incoming
    warhead (vs. decoy) in a missile defense system
  • Place sensors in manner to maximize useful
    information
  • Determine the times to administer a sequence of
    drugs for maximum therapeutic effect
  • Find the best red-yellow-green signal timings in
    an urban traffic network
  • Determine the best schedule for use of laboratory
    facilities to serve an organizations overall
    interests

9
Major Subfields
  • Linear Programming, a type of convex programming,
    studies the case in which the objective function
    f is linear and the set of constraints is
    specified using only linear equalities and
    inequalities.
  • Nonlinear Programming studies the general case in
    which the objective function or the constraints
    or both contain nonlinear parts.

10
Major Subfields (cont)
  • Integer Programming studies linear programs in
    which some or all variables are constrained to
    take on integer values. This is not convex, and
    in general much more difficult than regular
    linear programming.
  • Stochastic Programming studies the case in which
    some of the constraints or parameters depend on
    random variables.

11
Major Subfields (cont)
  • Calculus of Variations seeks to optimize an
    objective defined over many points in time, by
    considering how the objective function changes if
    there is a small change in the choice path.
  • Combinatorial Optimization is concerned with
    problems where the set of feasible solutions is
    discrete or can be reduced to a discrete one.

12
Major Subfields (cont)
  • Heuristics and Meta-heuristics make few or no
    assumptions about the problem being optimized.
    Usually, heuristics do not guarantee that any
    optimal solution need be found. On the other
    hand, heuristics are used to find approximate
    solutions for many complicated optimization
    problems.

13
Optimization Methods
  • (Exact) Algorithms
  • An algorithm is sometimes described as a set of
    instructions that will result in the solution to
    a problem when followed correctly.
  • Unless otherwise stated, an algorithm is assumed
    to give the optimal solution to an optimization
    problem.
  • That is, not just a good solution, but the best
    solution.

14
Optimization Methods (cont)
  • Approximation Algorithms
  • Approximation algorithms (as opposed to exact
    algorithms) do not guarantee to find the optimal
    solution.
  • However, there is a bound on the quality, e.g.,
    for a maximization problem, the algorithm can
    guarantee to find a solution whose value is at
    least half that of the optimal value.
  • We will not see many approximation algorithms
    here, but mention them as a contrast to heuristic
    algorithms.

15
Optimization Methods (cont)
  • Heuristic Algorithms
  • Heuristic algorithms do not guarantee to find the
    optimal solution.
  • Heuristic algorithms do not even necessarily have
    a bound on how bad they can perform.
  • However, in practice, heuristic algorithms
    (heuristics for short) have proven successful.
  • Near optimal solutions in reasonable time.
  • Most of this course will focus on this type of
    heuristic solution method.

16
What Is Heuristic?
  • Heuristic defined in Wikipedia
  • Heuristic (Greek ????s??", "find" or "discover")
    refers to experience-based techniques for
    problem solving, learning, and discovery. Where
    the exhaustive search is impractical, heuristic
    methods are used to speed up the process of
    finding a satisfactory solution mental short
    cuts to ease the cognitive load of making a
    decision.

16
17
Why Not Always Exact Methods?
  • The running time of the algorithm
  • For reasons explained soon, the running time of
    an algorithm may render it useless on the problem
    you want to solve.
  • The link between the real-world problem and the
    formal problem is weak
  • Sometimes you cannot properly formulate a COP/IP
    that captures all aspects of the real-world
    problem. If the problem you solve is not the
    right problem, it might be just as useful to have
    one (or more) heuristic solutions, rather than
    the optimal solution of the formal problem.

17
18
Heuristic Optimization Methods
  • Random Walk
  • Hill-climbing
  • Genetic Algorithms
  • Particle Swarm Optimization
  • Ant Colony Optimization
  • Simulated Annealing
  • Tabu Search
  • Memetic Algorithm

19
A Challenge
  • Maximize F1(x,y)

20
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