Skip to content

Animal Breeding Linear Least-Squares Problems

Notifications You must be signed in to change notification settings

optimizers/animal

Folders and files

NameName
Last commit message
Last commit date

Latest commit

 

History

6 Commits
 
 
 
 
 
 
 
 
 
 
 
 

Repository files navigation

DOI

Animal Breeding Linear Least-Squares Problems

This is a copy of Markus Hegland's animal breeding linear least-squares problem test set, originally posted on the CERFACS ftp server.

Each problem is an overdetermined linear least-squares problem with a rank deficiency of 1. The problems are named according to their relative size. They all concern an animal breeding concept. We refer to the documentation for more information, under original/descr.ps.

A few changes to the Fortran source files that generate the data were necessary to get them to compile. This repository supplies updated Fortran source files along with the data files. The data is generated in Harwell-Boeing format by default.

What is in this repository?

  • Updated Fortran source files under original/Conv
  • the problems in Harwell-Boeing format under hb
  • the same problems in Rutherford-Boeing format under rb
  • solutions, also in Rutherford-Boeing format under mls.

I pre-generated the problems for you. However, if you would like to generate them again yourself, you will need to edit one of original/Conv/conv.f or original/Conv/conv2.f, uncomment the section corresponding to the problem size you are interested in, and compile the program. Any recent version of gfortran should be sufficient, no external dependency is required.

The tar archive containing the data files for the extreme-size problems appears to be cut off and I was not able to un-archive it or repair it. If you know of a way to repair it, or better yet, have done it, please consider submitting a pull request!

Solutions

Because each problem is rank deficient, the solution we elected to report is the minimum least-squares solution, i.e., among all the least-squares solutions, the one that has minimum Euclidean norm. Each solution was generated by way of a full orthogonal decomposition of the tall and thin problem matrix using Tim Davis' Factorize Matlab code. The problems in Harwell-Boeing format are read using hb_to_msm.m.

Each minimum least-squares solution was generated using the Matlab script write_mls.m found under matlab. My computer runs out of memory when trying to generate the minimum least-squares solution for very2. I have 16Gb of RAM. If you have more RAM and are able to generate the solution, please consider submitting a pull request!

It is important to note that each solution corresponds to a scaled problem, where each column of the matrix is scaled by its Euclidean norm if it is nonzero. For this reason, the solutions are named, e.g., small_scaled_mls.rb.

The Matlab code writes the solutions as simple vectors in a text file. The matrices, right-hand sides and solutions are subsequently converted to Rutherford-Boeing format using the Julia package HarwellRutherfordBoeing.jl.

References

Here are the original references for this test set. The second one is included in this repository, under original/descr.ps.

@Inbook{hegland-1990,
  author = {Hegland, M.},
  editor = {Burkhart, H.},
  title = {On the computation of breeding values},
  bookTitle = {CONPAR 90---VAPP IV: Joint International Conference on Vector and Parallel Processing Zurich, Switzerland, September 10--13, 1990 Proceedings},
  year = {1990},
  publisher = {Springer Berlin Heidelberg},
  address = {Berlin, Heidelberg},
  pages = {232--242},
  isbn = {978-3-540-46597-3},
  doi = {10.1007/3-540-53065-7_103},
}

@TechReport{hegland-1993,
  author = {Hegland, M.},
  title = {Description and Use of Animal Breeding Data for Large Least Squares Problems},
  institution = {CERFACS},
  year = {1993},
  type = {Technical Report},
  number = {TR/PA/93/50},
  address = {Toulouse, France},
}

About

Animal Breeding Linear Least-Squares Problems

Resources

Stars

Watchers

Forks

Packages

No packages published