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Bump dependencies #2796

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6 changes: 3 additions & 3 deletions Project.toml
Original file line number Diff line number Diff line change
Expand Up @@ -24,13 +24,13 @@ UUIDs = "cf7118a7-6976-5b1a-9a39-7adc72f591a4"
cohomCalg_jll = "5558cf25-a90e-53b0-b813-cadaa3ae7ade"

[compat]
AbstractAlgebra = "0.31.1"
AbstractAlgebra = "0.32.1"
AlgebraicSolving = "0.3.3"
DocStringExtensions = "0.8, 0.9"
GAP = "0.9.4"
Hecke = "0.20"
Hecke = "0.21"
JSON = "^0.20, ^0.21"
Nemo = "0.35.1"
Nemo = "0.36"
Polymake = "0.11.1"
Preferences = "1"
RandomExtensions = "0.4.3"
Expand Down
2 changes: 1 addition & 1 deletion docs/src/CommutativeAlgebra/rings.md
Original file line number Diff line number Diff line change
Expand Up @@ -190,7 +190,7 @@ Fraction field

```jldoctest
julia> ZZ
Integer Ring
Integer ring

```

Expand Down
2 changes: 1 addition & 1 deletion docs/src/Rings/integer.md
Original file line number Diff line number Diff line change
Expand Up @@ -40,7 +40,7 @@ The parent of an OSCAR integer is the ring of integers `ZZ`.

```jldoctest
julia> ZZ
Integer Ring
Integer ring

```

Expand Down
3 changes: 0 additions & 3 deletions experimental/GModule/GModule.jl
Original file line number Diff line number Diff line change
Expand Up @@ -1095,9 +1095,6 @@ function hom_base(C::GModule{<:Any, <:AbstractAlgebra.FPModule{nf_elem}}, D::GMo
end
end

#T this belongs to Nemo and should be moved there
Oscar.nbits(a::QQFieldElem) = nbits(numerator(a)) + nbits(denominator(a))

function hom_base(C::_T, D::_T) where _T <: GModule{<:Any, <:AbstractAlgebra.FPModule{QQFieldElem}}
@assert base_ring(C) == base_ring(D)

Expand Down
2 changes: 1 addition & 1 deletion experimental/Matrix/matrix.jl
Original file line number Diff line number Diff line change
Expand Up @@ -24,7 +24,7 @@ Compute the JuliaMatrixRep of `m` in GAP.
julia> m = matrix(ZZ, [0 1 ; -1 0]);

julia> Oscar._wrap_for_gap(m)
GAP: <matrix object of dimensions 2x2 over Integer Ring>
GAP: <matrix object of dimensions 2x2 over Integer ring>
```
"""
_wrap_for_gap(m::MatrixElem) = GAP.Globals.MakeJuliaMatrixRep(m)
Expand Down
54 changes: 3 additions & 51 deletions experimental/QuadFormAndIsom/src/lattices_with_isometry.jl
Original file line number Diff line number Diff line change
Expand Up @@ -1043,19 +1043,7 @@ Integer lattice of rank 5 and degree 5
[0 0 0 1 0]

julia> Lh, inj = direct_sum(Lf, Lg)
(Integer lattice with isometry of finite order 10, AbstractSpaceMor[Map with following data
Domain:
=======
Quadratic space of dimension 5
Codomain:
=========
Quadratic space of dimension 10, Map with following data
Domain:
=======
Quadratic space of dimension 5
Codomain:
=========
Quadratic space of dimension 10])
(Integer lattice with isometry of finite order 10, AbstractSpaceMor[Map: quadratic space -> quadratic space, Map: quadratic space -> quadratic space])

julia> Lh
Integer lattice of rank 10 and degree 10
Expand Down Expand Up @@ -1136,19 +1124,7 @@ Integer lattice of rank 5 and degree 5
[0 0 0 1 0]

julia> Lh, proj = direct_product(Lf, Lg)
(Integer lattice with isometry of finite order 10, AbstractSpaceMor[Map with following data
Domain:
=======
Quadratic space of dimension 10
Codomain:
=========
Quadratic space of dimension 5, Map with following data
Domain:
=======
Quadratic space of dimension 10
Codomain:
=========
Quadratic space of dimension 5])
(Integer lattice with isometry of finite order 10, AbstractSpaceMor[Map: quadratic space -> quadratic space, Map: quadratic space -> quadratic space])

julia> Lh
Integer lattice of rank 10 and degree 10
Expand Down Expand Up @@ -1232,31 +1208,7 @@ Integer lattice of rank 5 and degree 5
[0 0 0 1 0]

julia> Lh, inj, proj = biproduct(Lf, Lg)
(Integer lattice with isometry of finite order 10, AbstractSpaceMor[Map with following data
Domain:
=======
Quadratic space of dimension 5
Codomain:
=========
Quadratic space of dimension 10, Map with following data
Domain:
=======
Quadratic space of dimension 5
Codomain:
=========
Quadratic space of dimension 10], AbstractSpaceMor[Map with following data
Domain:
=======
Quadratic space of dimension 10
Codomain:
=========
Quadratic space of dimension 5, Map with following data
Domain:
=======
Quadratic space of dimension 10
Codomain:
=========
Quadratic space of dimension 5])
(Integer lattice with isometry of finite order 10, AbstractSpaceMor[Map: quadratic space -> quadratic space, Map: quadratic space -> quadratic space], AbstractSpaceMor[Map: quadratic space -> quadratic space, Map: quadratic space -> quadratic space])

julia> Lh
Integer lattice of rank 10 and degree 10
Expand Down
54 changes: 3 additions & 51 deletions experimental/QuadFormAndIsom/src/spaces_with_isometry.jl
Original file line number Diff line number Diff line change
Expand Up @@ -510,19 +510,7 @@ Quadratic space of dimension 2
[0 -1]

julia> Vf3, inj = direct_sum(Vf1, Vf2)
(Quadratic space with isometry of finite order 2, AbstractSpaceMor[Map with following data
Domain:
=======
Quadratic space of dimension 2
Codomain:
=========
Quadratic space of dimension 4, Map with following data
Domain:
=======
Quadratic space of dimension 2
Codomain:
=========
Quadratic space of dimension 4])
(Quadratic space with isometry of finite order 2, AbstractSpaceMor[Map: quadratic space -> quadratic space, Map: quadratic space -> quadratic space])

julia> Vf3
Quadratic space of dimension 4
Expand Down Expand Up @@ -605,19 +593,7 @@ Quadratic space of dimension 2
[0 -1]

julia> Vf3, proj = direct_product(Vf1, Vf2)
(Quadratic space with isometry of finite order 2, AbstractSpaceMor[Map with following data
Domain:
=======
Quadratic space of dimension 4
Codomain:
=========
Quadratic space of dimension 2, Map with following data
Domain:
=======
Quadratic space of dimension 4
Codomain:
=========
Quadratic space of dimension 2])
(Quadratic space with isometry of finite order 2, AbstractSpaceMor[Map: quadratic space -> quadratic space, Map: quadratic space -> quadratic space])

julia> Vf3
Quadratic space of dimension 4
Expand Down Expand Up @@ -701,31 +677,7 @@ Quadratic space of dimension 2
[0 -1]

julia> Vf3, inj, proj = biproduct(Vf1, Vf2)
(Quadratic space with isometry of finite order 2, AbstractSpaceMor[Map with following data
Domain:
=======
Quadratic space of dimension 2
Codomain:
=========
Quadratic space of dimension 4, Map with following data
Domain:
=======
Quadratic space of dimension 2
Codomain:
=========
Quadratic space of dimension 4], AbstractSpaceMor[Map with following data
Domain:
=======
Quadratic space of dimension 4
Codomain:
=========
Quadratic space of dimension 2, Map with following data
Domain:
=======
Quadratic space of dimension 4
Codomain:
=========
Quadratic space of dimension 2])
(Quadratic space with isometry of finite order 2, AbstractSpaceMor[Map: quadratic space -> quadratic space, Map: quadratic space -> quadratic space], AbstractSpaceMor[Map: quadratic space -> quadratic space, Map: quadratic space -> quadratic space])

julia> Vf3
Quadratic space of dimension 4
Expand Down
6 changes: 3 additions & 3 deletions experimental/Schemes/AlgebraicCycles.jl
Original file line number Diff line number Diff line change
Expand Up @@ -191,7 +191,7 @@ julia> R = ZZ;
julia> algebraic_cycle(Ycov, R)
Zero algebraic cycle
on scheme over QQ covered with 3 patches
with coefficients in integer Ring
with coefficients in integer ring
```
"""
algebraic_cycle(X::AbsCoveredScheme, R::Ring) = AlgebraicCycle(X, R)
Expand Down Expand Up @@ -229,7 +229,7 @@ julia> R = ZZ;
julia> algebraic_cycle(II, R)
Effective algebraic cycle
on scheme over QQ covered with 3 patches
with coefficients in integer Ring
with coefficients in integer ring
given as the formal sum of
1 * sheaf of ideals

Expand Down Expand Up @@ -270,7 +270,7 @@ julia> R = ZZ;
julia> algebraic_cycle(II, R)
Effective algebraic cycle
on scheme over QQ covered with 3 patches
with coefficients in integer Ring
with coefficients in integer ring
given as the formal sum of
1 * sheaf of ideals
```
Expand Down
2 changes: 1 addition & 1 deletion experimental/Schemes/CartierDivisor.jl
Original file line number Diff line number Diff line change
Expand Up @@ -168,7 +168,7 @@ defined by
julia> cartier_divisor(E)
Cartier divisor
on scheme over QQ covered with 3 patches
with coefficients in integer Ring
with coefficients in integer ring
defined by the formal sum of
1 * sheaf of ideals
```
Expand Down
2 changes: 1 addition & 1 deletion experimental/Schemes/WeilDivisor.jl
Original file line number Diff line number Diff line change
Expand Up @@ -138,7 +138,7 @@ julia> II = IdealSheaf(Y, I);
julia> weil_divisor(II)
Effective weil divisor
on scheme over QQ covered with 3 patches
with coefficients in integer Ring
with coefficients in integer ring
given as the formal sum of
1 * sheaf of ideals
```
Expand Down
Original file line number Diff line number Diff line change
Expand Up @@ -378,7 +378,7 @@ julia> dim(X)
julia> Y = affine_space(ZZ, 2)
Spectrum
of multivariate polynomial ring in 2 variables x1, x2
over integer Ring
over integer ring

julia> dim(Y) # one dimension comes from ZZ and two from x1 and x2
3
Expand Down
Original file line number Diff line number Diff line change
Expand Up @@ -270,13 +270,7 @@ Projective space of dimension 2
with homogeneous coordinates [x, y, z]
julia> affine_cone(P)
(Spec of quotient of multivariate polynomial ring, Map with following data
Domain:
=======
S
Codomain:
=========
Quotient of multivariate polynomial ring by ideal with 1 generator)
(Spec of quotient of multivariate polynomial ring, Map: graded multivariate polynomial ring -> quotient of multivariate polynomial ring)
```
"""
affine_cone(P::AbsProjectiveScheme)
Expand Down
Original file line number Diff line number Diff line change
Expand Up @@ -648,13 +648,7 @@ Return the map from the character lattice to the group of principal divisors of
julia> p2 = projective_space(NormalToricVariety, 2);

julia> map_from_character_lattice_to_torusinvariant_weil_divisor_group(p2)
Map with following data
Domain:
=======
Abelian group with structure: Z^2
Codomain:
=========
Abelian group with structure: Z^3
Map: GrpAb: Z^2 -> GrpAb: Z^3
```
"""
@attr GrpAbFinGenMap function map_from_character_lattice_to_torusinvariant_weil_divisor_group(v::NormalToricVarietyType)
Expand Down Expand Up @@ -717,13 +711,7 @@ Return the map from the group of Weil divisors to the class of group of a normal
julia> p2 = projective_space(NormalToricVariety, 2);

julia> map_from_torusinvariant_weil_divisor_group_to_class_group(p2)
Map with following data
Domain:
=======
Abelian group with structure: Z^3
Codomain:
=========
Abelian group with structure: Z
Map: GrpAb: Z^3 -> GrpAb: Z
```
"""
@attr GrpAbFinGenMap function map_from_torusinvariant_weil_divisor_group_to_class_group(v::NormalToricVarietyType)
Expand All @@ -745,13 +733,7 @@ julia> p2 = projective_space(NormalToricVariety, 2)
Normal, non-affine, smooth, projective, gorenstein, fano, 2-dimensional toric variety without torusfactor

julia> map_from_torusinvariant_cartier_divisor_group_to_torusinvariant_weil_divisor_group(p2)
Map with following data
Domain:
=======
Abelian group with structure: Z^3
Codomain:
=========
Abelian group with structure: Z^3
Map: GrpAb: Z^3 -> GrpAb: Z^3
```
"""
@attr Map{GrpAbFinGen, GrpAbFinGen} function map_from_torusinvariant_cartier_divisor_group_to_torusinvariant_weil_divisor_group(v::NormalToricVarietyType)
Expand Down Expand Up @@ -845,13 +827,7 @@ julia> p2 = projective_space(NormalToricVariety, 2)
Normal, non-affine, smooth, projective, gorenstein, fano, 2-dimensional toric variety without torusfactor

julia> map_from_torusinvariant_cartier_divisor_group_to_class_group(p2)
Map with following data
Domain:
=======
Abelian group with structure: Z^3
Codomain:
=========
Abelian group with structure: Z
Map: GrpAb: Z^3 -> GrpAb: Z
```
"""
@attr GrpAbFinGenMap function map_from_torusinvariant_cartier_divisor_group_to_class_group(v::NormalToricVarietyType)
Expand All @@ -876,13 +852,7 @@ julia> p2 = projective_space(NormalToricVariety, 2)
Normal, non-affine, smooth, projective, gorenstein, fano, 2-dimensional toric variety without torusfactor

julia> map_from_torusinvariant_cartier_divisor_group_to_picard_group(p2)
Map with following data
Domain:
=======
Abelian group with structure: Z^3
Codomain:
=========
Abelian group with structure: Z
Map: GrpAb: Z^3 -> GrpAb: Z
```
"""
@attr GrpAbFinGenMap function map_from_torusinvariant_cartier_divisor_group_to_picard_group(v::NormalToricVarietyType)
Expand Down Expand Up @@ -925,13 +895,7 @@ julia> p2 = projective_space(NormalToricVariety, 2)
Normal, non-affine, smooth, projective, gorenstein, fano, 2-dimensional toric variety without torusfactor

julia> map_from_picard_group_to_class_group(p2)
Map with following data
Domain:
=======
Abelian group with structure: Z
Codomain:
=========
Abelian group with structure: Z
Map: GrpAb: Z -> GrpAb: Z
```
"""
@attr GrpAbFinGenMap function map_from_picard_group_to_class_group(v::NormalToricVarietyType)
Expand Down
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