Shape-constrained Symbolic Regression - Improving Extrapolation with Prior Knowledge
Created by W.Langdon from
gp-bibliography.bib Revision:1.8051
- @Article{Kronberger:EC,
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author = "G. Kronberger and F. O. {de Franca} and B. Burlacu and
C. Haider and M. Kommenda",
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title = "Shape-constrained Symbolic Regression - Improving
Extrapolation with Prior Knowledge",
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journal = "Evolutionary Computation",
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year = "2022",
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volume = "30",
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number = "1",
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pages = "75--98",
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month = "03",
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keywords = "genetic algorithms, genetic programming, Symbolic
regression, Shape-constrained regression",
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ISSN = "1063-6560",
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URL = "https://arxiv.org/abs/2103.15624",
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broken = "https://direct.mit.edu/evco/article-pdf/doi/10.1162/evco_a_00294/1905665/evco_a_00294.pdf",
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DOI = "doi:10.1162/evco_a_00294",
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size = "24 pages",
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abstract = "We investigate the addition of constraints on the
function image and its derivatives for the
incorporation of prior knowledge in symbolic
regression. The approach is called shape-constrained
symbolic regression and allows us to enforce e.g.
monotonicity of the function over selected inputs. The
aim is to find models which conform to expected
behaviour and which have improved extrapolation
capabilities. We demonstrate the feasibility of the
idea and propose and compare two evolutionary
algorithms for shapeconstrained symbolic regression:
(i) an extension of tree-based genetic programming
which discards infeasible solutions in the selection
step, and (ii) a two population evolutionary algorithm
that separates the feasible from the infeasible
solutions. In both algorithms we use interval
arithmetic to approximate bounds for models and their
partial derivatives. The algorithms are tested on a set
of 19 synthetic and four real-world regression
problems. Both algorithms are able to identify models
which conform to shape constraints which is not the
case for the unmodified symbolic regression algorithms.
However, the predictive accuracy of models with
constraints is worse on the training set and the test
set. Shape-constrained polynomial regression produces
the best results for the test set but also
significantly larger models.",
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notes = "Josef Ressel Center for Symbolic Regression,
University of Applied Sciences Upper Austria,
Softwarepark 11, 4232 Hagenberg, Austria",
- }
Genetic Programming entries for
Gabriel Kronberger
Fabricio Olivetti de Franca
Bogdan Burlacu
Christian Haider
Michael Kommenda
Citations