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A comprehensive open source computer algebra system for computations in algebra, geometry, and number theory.

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Oscar.jl

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Welcome to the OSCAR project, a visionary new computer algebra system which combines the capabilities of four cornerstone systems: GAP, Polymake, Antic and Singular.

Installation

OSCAR requires Julia 1.6 or newer. In principle it can be installed and used like any other Julia package; doing so will take a couple of minutes:

julia> using Pkg
julia> Pkg.add("Oscar")
julia> using Oscar

However, some of OSCAR's components have additional requirements. For more detailed information, please consult the installation instructions on our website.

Contributing to OSCAR

Please read the introduction for new developers in the OSCAR manual to learn more on how to contribute to OSCAR.

Examples of usage

julia> using Oscar
 -----    -----    -----      -      -----
|     |  |     |  |     |    | |    |     |
|     |  |        |         |   |   |     |
|     |   -----   |        |     |  |-----
|     |        |  |        |-----|  |   |
|     |  |     |  |     |  |     |  |    |
 -----    -----    -----   -     -  -     -

...combining (and extending) ANTIC, GAP, Polymake and Singular
Version 0.14.0-DEV ...
... which comes with absolutely no warranty whatsoever
Type: '?Oscar' for more information
(c) 2019-2023 by The OSCAR Development Team

julia> k, a = quadratic_field(-5)
(Imaginary quadratic field defined by x^2 + 5, sqrt(-5))

julia> zk = maximal_order(k)
Maximal order of Imaginary quadratic field defined by x^2 + 5
with basis nf_elem[1, sqrt(-5)]

julia> factorisations(zk(6))
2-element Vector{Fac{NfOrdElem}}:
 -1 * (-sqrt(-5) - 1) * (-sqrt(-5) + 1)
 -1 * -3 * 2

julia> Qx, x = polynomial_ring(QQ, [:x1,:x2])
(Multivariate polynomial ring in 2 variables over QQ, QQMPolyRingElem[x1, x2])

julia> R = grade(Qx, [1,2])[1]
Multivariate polynomial ring in 2 variables over QQ graded by
  x1 -> [1]
  x2 -> [2]

julia> f = R(x[1]^2+x[2])
x1^2 + x2

julia> degree(f)
[2]

julia> F = free_module(R, 1)
Free module of rank 1 over R

julia> s = sub(F, [f*F[1]])[1]
Submodule with 1 generator
1 -> (x1^2 + x2)*e[1]
represented as subquotient with no relations.

julia> H, mH = hom(s, quo(F, s)[1])
(hom of (s, Subquotient of
1 -> e[1]
by
1 -> (x1^2 + x2)*e[1]), Map: hom of (s, Subquotient of
1 -> e[1]
by
1 -> (x1^2 + x2)*e[1]) -> set of all homomorphisms from Submodule with 1 generator
1 -> (x1^2 + x2)*e[1]
represented as subquotient with no relations. to Subquotient of Submodule with 1 generator
1 -> e[1]
by Submodule with 1 generator
1 -> (x1^2 + x2)*e[1])

julia> mH(H[1])
Map with following data
Domain:
=======
Submodule with 1 generator
1 -> (x1^2 + x2)*e[1]
represented as subquotient with no relations.
Codomain:
=========
Subquotient of Submodule with 1 generator
1 -> e[1]
by Submodule with 1 generator
1 -> (x1^2 + x2)*e[1]

Of course, the cornerstones are also available directly:

julia> C = Polymake.polytope.cube(3);

julia> C.F_VECTOR
pm::Vector<pm::Integer>
8 12 6

julia> RP2 = Polymake.topaz.real_projective_plane();

julia> RP2.HOMOLOGY
pm::Array<topaz::HomologyGroup<pm::Integer> >
({} 0)
({(2 1)} 0)
({} 0)

Citing OSCAR

If you have used OSCAR in the preparation of a paper please cite it as described below:

[OSCAR]
    OSCAR -- Open Source Computer Algebra Research system, Version 0.14.0-DEV, The OSCAR Team, 2023. (https://www.oscar-system.org)
[OSCAR-book]
    Wolfram Decker, Christian Eder, Claus Fieker, Max Horn, Michael Joswig, The OSCAR book, 2024.

If you are using BibTeX, you can use the following BibTeX entries:

@misc{OSCAR,
  key          = {OSCAR},
  organization = {The OSCAR Team},
  title        = {OSCAR -- Open Source Computer Algebra Research system,
                  Version 0.14.0-DEV},
  year         = {2023},
  url          = {https://www.oscar-system.org},
  }

@Book{OSCAR-book,
  editor = {Decker, Wolfram and Eder, Christian and Fieker, Claus and Horn, Max and Joswig, Michael},
  title = {The OSCAR book},
  year = {2024},
}

Funding

The development of this Julia package is supported by the Deutsche Forschungsgemeinschaft DFG within the Collaborative Research Center TRR 195.

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A comprehensive open source computer algebra system for computations in algebra, geometry, and number theory.

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