Package Release Info

gap-numericalsgps-1.1.5-bp152.3.13

Update Info: Base Release
Available in Package Hub : 15 SP2

platforms

AArch64
ppc64le
s390x
x86-64

subpackages

gap-numericalsgps

Change Logs

Version: 1.1.5-bp150.1.3
* Mon Dec 25 2017 jengelh@inai.de
- Update to new upstream release 1.1.5
  * GBASIS is not set while loading singular; it is set inside
    functions calling Gröbner basis for methods using singular.
  * Type is now an operation (clash with FinIng), and
    TypeOfNumericalSemigroup remains an attribute
  * Inequalities was used in MatricesForHomalg as an operation,
    and so we turned it an operation; the corresponding attribute
    is AffineSemigroupInequalities
  * Removed all methods in singular using SingularLibrary (this
    was producing unexpected issues if the required software for
    the singular libraries was not well installed)
  * Removed [0,..,0] from GraverBasis in some methods (and thus
    in the testify)
  * Fixed issue with GeneratorsOfKernelCongruence and
    MinimalPresentationOfAffineSemigroup when it was empty
    (singular method)
* Thu Sep 14 2017 jengelh@inai.de
- Update to new upstream release 1.0.1
  * Added functions to find the set of numerical semigroups (or a
    random numerical semigroup) with a given set of
    pseudo-Frobenius numbers.
  * Fixed bug in the definition of proportionaly modular
    semigroups (affected the case a < c (in this case it should
    return the entire N) -- )
* Fri Feb 07 2014 jengelh@inai.de
- Update to new upstream release 0.980
  * Gluings of numerical semigroups added to the manual.
  * New functions for almost symmetric numerical semigroups
  * New functions for complete intersection numerical semigroups
  * The output of BettiElementsOfNumericalSemigroup is now a set
  * NumericalSemigroupsWithGenus(0) now returns []
  * New functions for maximal embedding dimension numerical
  semigroups
  * New functions related to factorizations of integers
  * New functions for Apery sets added
  * New synonym included: S-I denotes (0+S)-I, the oposite or dual
  of the ideal I
  * Factorizations of an integer (expressions as sums with
  nonnegative coefficients of elements in a list) are now
  performed with RestrictedPartitions, with a speed up of the
  functions that deal with factorizations
* Fri May 10 2013 jengelh@inai.de
- Split numericalsgps (version 0.971) off the gap RPM package