Planned intervention: On Thursday 19/09 between 05:30-06:30 (UTC), Zenodo will be unavailable because of a scheduled upgrade in our storage cluster.

There is a newer version of the record available.

Published November 20, 2022 | Version v1
Dataset Open

Exhaustive Symbolic Regression Function Sets

  • 1. CNRS & Sorbonne Université, Institut d'Astrophysique de Paris and Astrophysics, University of Oxford
  • 2. Institute of Cosmology & Gravitation, University of Portsmouth
  • 3. Astrophysics, University of Oxford

Description

ESR (Exhaustive Symbolic Regression) is a symbolic regression algorithm which efficiently and systematically finds all possible equations at fixed complexity (defined to be the number of nodes in its tree representation) given a set of basis functions. This is achieved by identifying the unique equations, so that one minimises the number of equations which one would have to fit to data.

Here we provide the functions generated, the unique equations, and the mappings between all equations and unique ones using different sets of basis functions. These are:

  • "core_maths": \(\{x, a, {\rm inv}, +, -, \times, \div, {\rm pow} \}\)
  • "ext_maths": \(\{x, a, {\rm inv}, \sqrt{\cdot}, {\rm square}, \exp, +, -, \times, \div, {\rm pow} \}\)

where \(x\) is the input variable and \(a\) denotes a constant.

One can fit these functions to a data set of interest by using the ESR package.

Notes

DJB is supported by the Simons Collaboration on ``Learning the Universe'' and was supported by STFC and Oriel College, Oxford. HD is supported by a Royal Society University Research Fellowship (grant no. 211046). PGF acknowledges support from European Research Council Grant No: 693024 and the Beecroft Trust.

Files

core_maths.zip

Files (1.0 GB)

Name Size Download all
md5:da925e09c586f7dae78b711aa6526466
84.5 MB Preview Download
md5:87095338efd9956127df9f9839664396
961.7 MB Preview Download