Version 18 (modified by gkronber, 7 years ago) (diff) |
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Genetic Programming Problem Definition Language (GPDL)
Gabriel Kronberger, last update 8th of July, 2013 gkronber@heuristiclab.com
The aim of GPDL is to make it easier to use GP-systems. Currently, it is very cumbersome to implement new problems in GP-systems, because of several factors including among others:
- a lot of boiler-plate code has to be written to integrate into the GP framework,
- it is necessary to learn APIs of different GP system,
- problem implementations cannot be re-used to try different GP systems (e.g. ECJ, HeuristicLab, GEVA, JGAP, ...).
We argue, that the uptake of GP for real world applications has only been limited so far, because it is difficult to use the available high-quality implementations of GP, and it takes a lot of time to implement more complex GP problems.
GPDL separates the implementation of problem details from the intricacies of algorithm implementations. Only the details of the problem are specified in a framework-independent way. A compiler can transform the problem description to source code for different GP systems. This way, it will be much easier to implement problems and to use different GP implementations or even other kinds of solvers!
GPDL is based on the concept of attributed grammars with semantic actions that are usually used in compiler construction. Basically, GP can be described as search over a space of sentences of a formal language. The goal is to find a sentence with optimal objective function value. Therefore, a GP problem can be defined as a tuple of a formal language, defined e.g. via a grammar, and an objective function for sentences. Therefore, our idea is to specify GP problems via an attributed grammar with semantic actions for the interpretation of sentences, and an objective function to be minimized or maximized. Below, you will find an example for the definition of a symbolic regression problem in GPDL.
GPDL is not limited to C# or Java, and it is not limited to HeuristicLab (however, it is the only system we implemented a compiler for so far).
On this page we provide a first specification of the GPDL language and a reference implementation for a GPDL compiler for HeuristicLab.
Documentation
- GECCO 2013 Paper: GPDL: A Framework-Independent Problem Definition Language for Grammar Guided Genetic Programming (GECCO 2013)
- GECCO 2013 Presentation in the "Evolutionary Software Systems Workshop"
Syntax Definition
Reference Implementation for HeuristicLab
Tools
- Coco-2 (executables and frame files, .NET-version)
- Coco-2 helper classes (to compile Coco-2 generated classes)
Example Problem Definitions
- Koza-style symbolic regression
- Symbolic regression with evolution of constants
- Artificial Ant
- Factorial function
- Fibonacci function
- Multi-output multiplier
Motivating Example: Symbolic Regression
This is a fully self-contained specification of a symbolic regression problem (Poly-10 benchmark). This file can be compiled using our reference GPDL compiler for HeuristicLab to create a solver for this problem. Different kinds of solvers available in HeuristicLab can be used to solve the problem without any changes to the problem specification.
PROBLEM SymbRegKoza CODE << double[,] x; double[] y; string[] variableNames; Dictionary<string,int> nameToCol; double GetValue(double[,] data, string varName, int row) { if(nameToCol == null) { /* init mapping */ nameToCol = new Dictionary<string, int>(); for(int i=0; i<variableNames.Length; i++) { nameToCol[variableNames[i]] = i; } } return x[row, nameToCol[varName]]; } double RSquared(IEnumerable<double> xs, IEnumerable<double> ys) { HeuristicLab.Problems.DataAnalysis.OnlineCalculatorError error; var r2 = HeuristicLab.Problems.DataAnalysis.OnlinePearsonsRSquaredCalculator.Calculate(xs, ys, out error); if(error == HeuristicLab.Problems.DataAnalysis.OnlineCalculatorError.None) return r2; else return 0.0; } >> INIT << // generate 500 case of poly-10 benchmark function int n = 500; variableNames = new string[] {"x1", "x2", "x3", "x4", "x5", "x6", "x7", "x8", "x9", "x10" }; var rand = new System.Random(); x = new double[n, 10]; y = new double[n]; for(int row = 0; row < 500; row++) { for(int col = 0; col < 10; col++) { x[row, col] = rand.NextDouble() * 2.0 - 1.0; } y[row] = x[row, 0] * x[row, 1] + x[row, 2] * x[row, 3] + x[row, 4] * x[row, 5] + x[row, 0] * x[row, 6] + x[row, 8] + x[row, 2] * x[row, 5] + x[row, 9]; } >> /* non-terminals of the problem */ NONTERMINALS Model<<int row, out double val>>. RPB<<int row, out double val>>. Addition<<int row, out double val>>. Subtraction<<int row, out double val>>. Multiplication<<int row, out double val>>. Division<<int row, out double val>>. /* terminals of the problem: random constants (ERC) and variables */ TERMINALS ERC<<out double val>> CONSTRAINTS val IN RANGE <<-100>> .. <<100>> . Var<<out string varName>> CONSTRAINTS varName IN SET <<variableNames>> . /* grammar rules for the problem with interleaved semantic actions */ RULES Model<<int row, out double val>> = RPB<<row, out val>> . RPB<<int row, out double val>> = LOCAL << string varName; >> Addition<<row, out val>> | Subtraction<<row, out val>> | Division<<row, out val>> | Multiplication<<row, out val>> | Var<<out varName>> SEM << val = GetValue(x, varName, row); >> | ERC<<out val>> . Addition<<int row, out double val>> = LOCAL << double x1, x2; >> RPB<<row, out x1>> RPB<<row, out x2>> SEM<< val = x1 + x2; >> . Subtraction<<int row, out double val>> = LOCAL << double x1, x2; >> RPB<<row, out x1>> RPB<<row, out x2>> SEM<< val = x1 - x2; >> . Division<<int row, out double val>> = LOCAL << double x1, x2; >> RPB<<row, out x1>> RPB<<row, out x2>> SEM<< val = x1 / x2; >> . Multiplication<<int row, out double val>> = LOCAL << double x1, x2; >> RPB<<row, out x1>> RPB<<row, out x2>> SEM<< val = x1 * x2; >> . /* objective function */ MAXIMIZE /* could also use the keyword MINIMIZE here */ << var rows = System.Linq.Enumerable.Range(0, x.GetLength(0)); var predicted = rows.Select(r => { double result; Model(r, out result); /* we can call the root symbol directly */ return result; }); return RSquared(predicted, y); >> END SymbRegKoza.
Attachments (3)
- gpdl-kronberger-2013.pdf (497.7 KB) - added by gkronber 7 years ago.
- Presentation Gecco 2013.pdf (853.8 KB) - added by gkronber 7 years ago.
- GPDL-compiler-reference.png (20.4 KB) - added by gkronber 7 years ago.
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