2365 docstrings not included in the manual: fqPolyRepPolyRingElem sub :: Tuple{TorQuadModule, Vector{TorQuadModuleElem}} sub :: Union{Tuple{GrpAbFinGen, Integer}, Tuple{GrpAbFinGen, Integer, Bool}, Tuple{GrpAbFinGen, Integer, Bool, Hecke.RelLattice{GrpAbFinGen, ZZMatrix}}} sub :: Union{Tuple{GrpAbFinGen, Vector{GrpAbFinGenElem}}, Tuple{GrpAbFinGen, Vector{GrpAbFinGenElem}, Bool}, Tuple{GrpAbFinGen, Vector{GrpAbFinGenElem}, Bool, Hecke.RelLattice{GrpAbFinGen, ZZMatrix}}} sub :: Union{Tuple{GrpAbFinGen, ZZMatrix}, Tuple{GrpAbFinGen, ZZMatrix, Bool}, Tuple{GrpAbFinGen, ZZMatrix, Bool, Hecke.RelLattice{GrpAbFinGen, ZZMatrix}}} sub :: Tuple{GrpGen, Vector{GrpGenElem}} sub :: Union{Tuple{GrpAbFinGen, ZZRingElem}, Tuple{GrpAbFinGen, ZZRingElem, Bool}, Tuple{GrpAbFinGen, ZZRingElem, Bool, Hecke.RelLattice{GrpAbFinGen, ZZMatrix}}} sub :: Union{Tuple{Vector{GrpAbFinGenElem}}, Tuple{Vector{GrpAbFinGenElem}, Bool}, Tuple{Vector{GrpAbFinGenElem}, Bool, Hecke.RelLattice{GrpAbFinGen, ZZMatrix}}} left_order :: Tuple{Hecke.AlgAssAbsOrdIdl} left_order :: Tuple{Hecke.AlgAssRelOrdIdl} extend_easy :: Tuple{Hecke.NfOrdToFqNmodMor, AnticNumberField} fq_nmod_poly HessQRModule is_isotropic :: Tuple{AbstractSpace} absolute_basis :: Tuple{Hecke.AlgAssRelOrdIdl} is_torsion_point :: Union{Tuple{EllCrvPt{T}}, Tuple{T}} where T<:Union{QQFieldElem, nf_elem} is_torsion_point :: Tuple{EllCrvPt{fqPolyRepFieldElem}} has_matrix_action :: Union{Tuple{Hecke.ModAlgAss{S, T, U}}, Tuple{U}, Tuple{T}, Tuple{S}} where {S, T, U} FqPolyRepMatrix content :: Tuple{MPolyRingElem, Int64} set_assert_level NmodRelSeriesRing qadic integral_split :: Tuple{Hecke.NfAbsOrdFracIdl} integral_split :: Tuple{AbstractAlgebra.Generic.FunctionFieldElem, Hecke.GenOrd} isprime_power component :: Tuple{Type{Field}, Hecke.AbsAlgAss, Int64} torsion_unit_order :: Tuple{NfOrdElem, Int64} global_minimality_class :: Tuple{EllCrv{nf_elem}} gfp_fmpz_abs_series is_nonnegative :: Tuple{RealFieldElem} is_nonnegative :: Tuple{arb} center :: Union{Tuple{AlgMat{T, S}}, Tuple{S}, Tuple{T}} where {T, S} center :: Union{Tuple{AlgAss{T}}, Tuple{T}} where T center :: Union{Tuple{AlgGrp{T}}, Tuple{T}} where T ZZMPolyRing ^ :: Tuple{TorQuadModuleMor, Integer} ^ :: Tuple{AlgMatElem, Int64} ^ :: Tuple{Hecke.AbsAlgAssIdl, Int64} ^ :: Tuple{Hecke.AlgAssRelOrdIdl, Int64} ^ :: Tuple{Hecke.AlgAssAbsOrdIdl, Int64} ^ :: Tuple{Union{Hecke.AlgAssAbsOrdElem, Hecke.AlgAssRelOrdElem}, ZZRingElem} midpoint :: Tuple{RealFieldElem} midpoint :: Tuple{arb} is_real :: Tuple{InfPlc} _doc_stub_nf fq_default_mpoly lll_with_removal :: Union{Tuple{ZZMatrix, ZZRingElem}, Tuple{ZZMatrix, ZZRingElem, lll_ctx}} biproduct :: Union{Tuple{Vector{T}}, Tuple{T}} where T<:AbstractSpace biproduct :: Union{Tuple{Vector{T}}, Tuple{T}} where T<:AbstractLat biproduct :: Tuple{Vararg{GrpAbFinGen}} coprime_base :: Tuple{Any} id_hom :: Tuple{TorQuadModule} isleaf abelian_group_homomorphism :: Tuple{TorQuadModuleMor} fq_nmod_rel_series fixed_field :: Union{Tuple{T}, Tuple{SimpleNumField, T}} where T<:Hecke.NumFieldMor fixed_field :: Tuple{ClassField, GrpAbFinGen} _M_p :: Tuple{Any, Any} ZZFracIdl formal_differential_form :: Union{Tuple{EllCrv}, Tuple{EllCrv, Int64}} setintersection :: Union{Tuple{RealFieldElem, RealFieldElem}, Tuple{RealFieldElem, RealFieldElem, Int64}} setintersection :: Tuple{arb, arb} infinite_uniformizers :: Tuple{AnticNumberField} symbol :: Tuple{ZZLocalGenus} sqrt :: Tuple{FpRelPowerSeriesRingElem} sqrt :: Tuple{qqbar} sqrt :: Tuple{ca} sqrt :: Tuple{fpAbsPowerSeriesRingElem} sqrt :: Tuple{fpRelPowerSeriesRingElem} sqrt :: Tuple{FpAbsPowerSeriesRingElem} strong_echelon_form :: Tuple{zzModMatrix} strong_echelon_form :: Tuple{fpMatrix} strong_echelon_form :: Tuple{ZZModMatrix} is_zero :: Tuple{Divisor} fqPolyRepMatrixSpace dot