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Genetic Programming: An Introduction

Genetic Programming: An Introduction. The Lunacy of Evolving Computer Programs. Before we start, consider the general evolutionary algorithm : Randomly create a population of solutions. Evaluate each solution, giving each a score.

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Genetic Programming: An Introduction

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  1. Genetic Programming:An Introduction

  2. The Lunacy of Evolving Computer Programs Before we start, consider the general evolutionary algorithm : Randomly create a population of solutions. Evaluate each solution, giving each a score. Pick the best and reproduce, mutate or crossover with other fit solutions to produce new solutions for the next generation.

  3. The Lunacy of Evolving Computer Programs Now consider what this means in the context of genetic programming: Randomly create a population of programs. Evaluate each program, giving each a score. Pick the best and reproduce, mutate or crossover with other fit programs to produce new programs for the next generation.

  4. The Lunacy of Evolving Computer Programs A randomly generated C program #bjsieldi <dkjsldkfj.?+ nit anim(tin x, rach*vrag[)} { nit x; rof (x = 10; : ) { touch ,? *wha”ts g01nG 0n?@; : ] ]

  5. The Lunacy of Evolving Computer Programs The argument against evolving programs Randomly created programs have an infinitesimal chance of compiling, let alone doing what you want them to do.. Running a randomly created program will most likely give array out-of bounds errors, data-casting, core-dumps and division by zero errors, and is ultimately prone to the halting problem Mutating and mixing segments of randomly created programs is as senseless as randomly creating them in the first place. (How) does genetic programming get around this?

  6. Individual Representation Individual Size (complexity) GA(conventional) Coded strings of numbers Fixed-length strings GP In general by LISP S-expressions Variable What makes GP different

  7. GP algorithm Create random population Evaluate fitness function Apply evolution genetic operators probabilistically to obtain a new computer program Reproduction/Crossover/Mutation Insert new computer program into new population

  8. The Genetic Programming Representation The trick is to choose an underlying representation for programs such that:the random creation, mutation and crossover of programs always yields a syntactically correct program. The representation employed in genetic-programming is a tree: this representation is natural for LISP programs and leads to elegant algorithms for creation, mutation and crossover.

  9. Genetic Structure Functions: Can be conditional(if, then,etc.), sequentual(+,-,etc.), iterative (whileDo etc.) Terminals: No arguments, just return a value

  10. Evolving Trees In fact the representation is useful for the evolution of more than just LISP programs! The tree structures in a genetic programming population can be used to determine layouts for analogue electric circuits, create neural networks, paralellise computer programs and much much more. It’s a great representation because it can produce solutions of arbitrary size and complexity, as opposed to, for example, fixed-length genetic algorithms. As we’ll be applying an evolutionary algorithm to this representation, we need to define creation, crossover and mutation operators.

  11. Creation, Crossover and Mutation The following shows how tree structures can be created, crossed and mutated. Creation: randomly generate a tree using the functions and terminals provided Crossover: pick crossover points in both parents and swap the subtrees. If the parents are same, the offsprings will often be different. Mutation: pick a mutation point in one parent and replace its sub-tree with a randomly generated tree.

  12. Crossover

  13. Mutation

  14. Population Creation When creating a population, it’d be nice to begin with many trees of different shapes sizes. We can generate trees using the full or the grow method: full - every path in the tree is the maximum length grow - path lengths will vary up to the maximum length. Typically, when a population is created, the “Ramp half-and-half” technique is used.Trees of varying depths from the minimum to maximum depth are created, and for each depth half are created using the full method and the other half are created using the grow method.

  15. Preparatory steps for GP You’ve decided you want to use GP to solve a problem. To set up your GP runs, you need to do the following: Determine the set of terminals (the leaves of your trees). In the programming context, these are usually variables, input values or action commands Determine the set of functions (the nodes of your trees). The fitness measure The parameters for controlling the run: Population size, Maximum number of generations, Mutation, Crossover and Reproduction rates (1%, 90%, 9%) The method for terminating a run and designating a result.

  16. Sufficiency & Closure Function and terminal sets must satisfy the principles of closure and sufficiency: Closure: every function f must be capable of accepting the values of every terminal t from the terminal set and every function f from the function set. Sufficiency: A solution to the problem at hand must exist in the space of programs created from the function set and terminal set. One way to get around closure is to use make all terminals and functions return the same type (for example, integer) or use strongly typed genetic programming to ensure that all expressions are type-safe.

  17. Example: Symbolic Regression Problem: Can GP evolve the function to fit the following data:: x f(x) 0 0 1 4 2 30 3 120 4 340 5 780 6 1554 7 2800 8 4680

  18. GP Symbolic Regression Function Set: +, - *, / Terminal Set: X Fitness Measure: use the absolute difference of the error. Best normalized fitness is 0. Parameters: Population Size = 500, Max Generations = 10, Crossover = 90%, Mutation = 1%, Reproduction = 9%. Selection is by Tournament Selection (size 5), Creation is performed using RAMP_HALF_AND_HALF. Termination Condition: Program with fitness 0 found.

  19. Results The following zero-fitness individual was found after two generations (add (add (mul (mul X X) (mul X X)) (mul (mul X X) (- X))) (sub X (sub (sub (sub X X) (mul X X)) (mul (add X X) (mul X X))))) which correctly captures the function: f(x) = x4 + x3 + x2 + x

  20. Santa Fe Trail In the Santa Fe Trail, an ant must eat all the items of food in a trail. The ant can only move left, right or forward, and can only sense what is directly in front of him.

  21. GP Santa Fe Function Set: Prog2, Prog3, IfFoodAhead Terminal Set: TurnLeft, TurnRight, MoveForward Fitness Measure: count the number of items food eaten after a fixed number of moves, and subtract from 89. Bad fitness = 89, Good fitness = 0. Parameters: Population Size = 500, Max Generations = 50, Crossover = 90%, Mutation = 1%, Reproduction = 9%. Selection is by Tournament Selection (size 5), Creation is performed using RAMP_HALF_AND_HALF. Termination Condition: Program with fitness 0 found.

  22. Some programs Prog2(TurnRight)(TurnLeft) Prog2(MoveForward)(MoveForward)

  23. Result Here’s how one agent fared:

  24. Agent (Prog3 (IfFoodAhead (IfFoodAhead (IfFoodAhead (IfFoodAhead (Prog2 MoveForward MoveForward) TurnLeft) TurnLeft) TurnLeft) (IfFoodAhead MoveForward (IfFoodAhead MoveForward (IfFoodAhead (IfFoodAhead (Prog2 MoveForward MoveForward) TurnLeft) TurnLeft)))) TurnLeft (Prog3 (IfFoodAhead (IfFoodAhead MoveForward TurnLeft) TurnRight) MoveForward TurnRight)) Smaller agents can be found!

  25. Robot Wall-Following with GP (Koza, 1993) Given: Odd-shaped room with robot in center. Find: A control strategy for the robot that makes it move along the periphery. GP Primitives: Terminals: S0, S1..S11 (12 sensor readings, distance to wall), Functions: IFLTE (if less than or equal), PROGN2, MF, MB (move forward/back), TL, TR (turn left/right). Fitness Function: Fitness = peripheral cells visited. Sample Individual/Strategy: (IFLTE S3 S7 (MF) (PROG2 MB (IFLTE S4 S9 (TL) (PROG2 (MB) (TL)))))

  26. Wall-Following Evolution

  27. Fitness function The fitness function is based on executing the evolved programs on one or more prescribed test suites. The test suites can be devised in the same way as those used when testing traditional manually produced programs. Program size as part of fitness

  28. Fitness function Fitness Functions Error-based – Fitness inversely proportional to total error on the test data. – E.g. symbolic regression, classification, image compression, multiplexer design.. Cost-based – Fitness inversely proportional to use of resources (e.g. time, space, money, materials, tree nodes) – E.g. truck-backing, broom-balancing, energy network design…

  29. Fitness function Benefit-based – Fitness proportional to accrued resources or other benefits. – E.g. foraging, investment strategies Parsimony-base – Fitness partly proportional to the simplicity of the phenotypes. – E.g. sorting algorithms, data compression… Entropy-based – Fitness directly or inversely proportional to the statistical entropy of a set of collections – E.g. Random sequence generators, clustering algorithms, decision trees.

  30. … Designer GP In recent times, the tree-representation employed by GP has been used for automatic design of electrical circuits. The tree is no longer a “program”, but should be considered a “program that builds circuits”. The idea of building graph structures using commands embedded in a tree was developed by Frederic Gruau. He used it to evolve neural networks: Koza et al now use it to evolve electric circuits. Functions of node are Par (P) and Seq (S), that change the topology of the graph. Other functions and terminals modify the values at the nodes. Everything begins with one embryonic cell with a pointer to the head of the tree.

  31. Cellular Encoding

  32. Cellular Encoding

  33. Cellular Encoding

  34. Cellular Encoding

  35. Cellular Encoding

  36. Cellular Encoding

  37. Cellular Encoding

  38. Cellular Encoding

  39. Cellular Encoding

  40. Cellular Encoding

  41. Cellular Encoding

  42. Cellular Encoding

  43. So you want to use GP... Genetic programming, at its heart, is the evolution of tree structures that can be interpreted as programs. Use GP to solve problems where the solutions are naturally expressed as tree structures. evolve LISP programs to solve a problem evolve solutions in an indirect manner, by using the GP trees to build solutions to problems. Your approach will be to determine the functions & terminals that constitute your trees, and how to interpret the resulting trees as solutions to your problem.

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