/// \defgroup PkgAlgebraicFoundations Algebraic Foundations Reference

/// \defgroup PkgAlgebraicFoundationsAlgebraicStructuresConcepts Concepts
/// \ingroup PkgAlgebraicFoundations

/*!
\addtogroup PkgAlgebraicFoundations
\todo check generated documentation

\cgalPkgDescriptionBegin{Algebraic Foundations,PkgAlgebraicFoundationsSummary}
\cgalPkgPicture{Algebraic_foundations2.png}
\cgalPkgSummaryBegin
\cgalPkgAuthor{Michael Hemmer}
\cgalPkgDesc{This package defines what algebra means for \cgal, in terms of concepts, classes and functions. The main features are: (i) explicit concepts for interoperability of types  (ii) separation between algebraic types (not necessarily embeddable into the reals), and number types (embeddable into the reals).}
\cgalPkgManuals{Chapter_Algebraic_Foundations,PkgAlgebraicFoundations}
\cgalPkgSummaryEnd
\cgalPkgShortInfoBegin
\cgalPkgSince{3.3}
\cgalPkgBib{cgal:h-af}
\cgalPkgLicense{\ref licensesLGPL "LGPL"}
\cgalPkgShortInfoEnd
\cgalPkgDescriptionEnd

\cgalClassifedRefPages

## Algebraic Structures ##

### Concepts ###

- `IntegralDomainWithoutDivision`
- `IntegralDomain`
- `UniqueFactorizationDomain`
- `EuclideanRing`
- `Field`
- `FieldWithSqrt`
- `FieldWithKthRoot`
- `FieldWithRootOf`

- `AlgebraicStructureTraits`
- `AlgebraicStructureTraits_::IsZero`
- `AlgebraicStructureTraits_::IsOne`
- `AlgebraicStructureTraits_::Square`
- `AlgebraicStructureTraits_::Simplify`
- `AlgebraicStructureTraits_::UnitPart`
- `AlgebraicStructureTraits_::IntegralDivision`
- `AlgebraicStructureTraits_::Divides`
- `AlgebraicStructureTraits_::Gcd`
- `AlgebraicStructureTraits_::DivMod`
- `AlgebraicStructureTraits_::Div`
- `AlgebraicStructureTraits_::Mod`
- `AlgebraicStructureTraits_::Inverse`
- `AlgebraicStructureTraits_::Sqrt`
- `AlgebraicStructureTraits_::IsSquare`
- `AlgebraicStructureTraits_::KthRoot`
- `AlgebraicStructureTraits_::RootOf`

### Classes ###

- `CGAL::Algebraic_structure_traits<T>`
- `CGAL::Integral_domain_without_division_tag`
- `CGAL::Integral_domain_tag`
- `CGAL::Field_tag`
- `CGAL::Field_with_sqrt_tag`
- `CGAL::Unique_factorization_domain_tag`
- `CGAL::Euclidean_ring_tag`

### Global Functions ###

- `CGAL::is_zero()`
- `CGAL::is_one()`
- `CGAL::square()`
- `CGAL::simplify()`
- `CGAL::unit_part()`
- `CGAL::integral_division()`
- `CGAL::is_square()`
- `CGAL::gcd()`
- `CGAL::div_mod()`
- `CGAL::div()`
- `CGAL::mod()`
- `CGAL::inverse()`
- `CGAL::sqrt()`
- `CGAL::kth_root()`
- `CGAL::root_of()`

## Real Embeddable ##

### Concepts ###

- `RealEmbeddable`

- `RealEmbeddableTraits`
- `RealEmbeddableTraits_::IsZero`
- `RealEmbeddableTraits_::Abs`
- `RealEmbeddableTraits_::Sgn`
- `RealEmbeddableTraits_::IsPositive`
- `RealEmbeddableTraits_::IsNegative`
- `RealEmbeddableTraits_::Compare`
- `RealEmbeddableTraits_::ToDouble`
- `RealEmbeddableTraits_::ToInterval`

### Classes ###

- `CGAL::Real_embeddable_traits<T>`

### Global Functions ###

- `CGAL::is_zero()`
- `CGAL::abs()`
- `CGAL::sign()`
- `CGAL::is_positive()`
- `CGAL::is_negative()`
- `CGAL::compare()`
- `CGAL::to_double()`
- `CGAL::to_interval()`

## Real Number Types ##

### Concepts ###

- `RingNumberType`
- `FieldNumberType`

## Interoperability ##

### Concepts ###

- `ExplicitInteroperable`
- `ImplicitInteroperable`

### Classes ###

- `CGAL::Coercion_traits<A,B>`

## Fractions ##

### Concepts ###

- `Fraction`
- `FractionTraits`
- `FractionTraits_::Decompose`
- `FractionTraits_::Compose`
- `FractionTraits_::CommonFactor`

### Classes ###

- `CGAL::Fraction_traits<T>`

## Miscellaneous ##

### Concepts ###
- `FromIntConstructible`
- `FromDoubleConstructible`

*/

