Hecke algebras¶
In Sage a “Hecke algebra” always refers to an algebra of endomorphisms of some explicit module, rather than the abstract Hecke algebra of double cosets attached to a subgroup of the modular group.
We distinguish between “anemic Hecke algebras”, which are algebras of Hecke operators whose indices do not divide some integer N (the level), and “full Hecke algebras”, which include Hecke operators coprime to the level. Morphisms in the category of Hecke modules are not required to commute with the action of the full Hecke algebra, only with the anemic algebra.
- sage.modular.hecke.algebra.AnemicHeckeAlgebra¶
- sage.modular.hecke.algebra.HeckeAlgebra¶
- class sage.modular.hecke.algebra.HeckeAlgebra_anemic(M)¶
Bases:
sage.modular.hecke.algebra.HeckeAlgebra_base
An anemic Hecke algebra, generated by Hecke operators with index coprime to the level.
- gens()¶
Return a generator over all Hecke operator \(T_n\) for \(n = 1, 2, 3, \ldots\), with \(n\) coprime to the level. This is an infinite sequence.
EXAMPLES:
sage: T = ModularSymbols(12,2).anemic_hecke_algebra() sage: g = T.gens() sage: next(g) Hecke operator T_1 on Modular Symbols space of dimension 5 for Gamma_0(12) of weight 2 with sign 0 over Rational Field sage: next(g) Hecke operator T_5 on Modular Symbols space of dimension 5 for Gamma_0(12) of weight 2 with sign 0 over Rational Field
- hecke_operator(n)¶
Return the \(n\)-th Hecke operator, for \(n\) any positive integer coprime to the level.
EXAMPLES:
sage: T = ModularSymbols(Gamma1(5),3).anemic_hecke_algebra() sage: T.hecke_operator(2) Hecke operator T_2 on Modular Symbols space of dimension 4 for Gamma_1(5) of weight 3 with sign 0 over Rational Field sage: T.hecke_operator(5) Traceback (most recent call last): ... IndexError: Hecke operator T_5 not defined in the anemic Hecke algebra
- is_anemic()¶
Return True, since this is the anemic Hecke algebra.
EXAMPLES:
sage: H = CuspForms(3, 12).anemic_hecke_algebra() sage: H.is_anemic() True
- class sage.modular.hecke.algebra.HeckeAlgebra_base(M)¶
Bases:
sage.structure.unique_representation.CachedRepresentation
,sage.rings.ring.CommutativeAlgebra
Base class for algebras of Hecke operators on a fixed Hecke module.
INPUT:
M
- a Hecke module
EXAMPLES:
sage: CuspForms(1, 12).hecke_algebra() # indirect doctest Full Hecke algebra acting on Cuspidal subspace of dimension 1 of Modular Forms space of dimension 2 for Modular Group SL(2,Z) of weight 12 over Rational Field
- basis()¶
Return a basis for this Hecke algebra as a free module over its base ring.
EXAMPLES:
sage: ModularSymbols(Gamma1(3), 3).hecke_algebra().basis() (Hecke operator on Modular Symbols space of dimension 2 for Gamma_1(3) of weight 3 with sign 0 over Rational Field defined by: [1 0] [0 1], Hecke operator on Modular Symbols space of dimension 2 for Gamma_1(3) of weight 3 with sign 0 over Rational Field defined by: [0 0] [0 2]) sage: M = ModularSymbols(Gamma0(22), sign=1) sage: H = M.hecke_algebra() sage: B = H.basis() sage: len(B) 5 sage: all(b in H for b in B) True sage: [B[0, 0] for B in M.anemic_hecke_algebra().basis()] Traceback (most recent call last): ... NotImplementedError: basis not implemented for anemic Hecke algebra
- diamond_bracket_matrix(d)¶
Return the matrix of the diamond bracket operator \(\langle d \rangle\).
EXAMPLES:
sage: T = ModularSymbols(Gamma1(7), 4).hecke_algebra() sage: d3 = T.diamond_bracket_matrix(3) sage: x = d3.charpoly().variables()[0] sage: d3.charpoly() == (x^3-1)^4 True
- diamond_bracket_operator(d)¶
Return the diamond bracket operator \(\langle d \rangle\).
EXAMPLES:
sage: T = ModularSymbols(Gamma1(7), 4).hecke_algebra() sage: T.diamond_bracket_operator(3) Diamond bracket operator <3> on Modular Symbols space of dimension 12 for Gamma_1(7) of weight 4 with sign 0 over Rational Field
- discriminant()¶
Return the discriminant of this Hecke algebra.
This is the determinant of the matrix \({\rm Tr}(x_i x_j)\) where \(x_1, \dots,x_d\) is a basis for self, and \({\rm Tr}(x)\) signifies the trace (in the sense of linear algebra) of left multiplication by \(x\) on the algebra (not the trace of the operator \(x\) acting on the underlying Hecke module!). For further discussion and conjectures see Calegari + Stein, Conjectures about discriminants of Hecke algebras of prime level, Springer LNCS 3076.
EXAMPLES:
sage: BrandtModule(3, 4).hecke_algebra().discriminant() 1 sage: ModularSymbols(65, sign=1).cuspidal_submodule().hecke_algebra().discriminant() 6144 sage: ModularSymbols(1,4,sign=1).cuspidal_submodule().hecke_algebra().discriminant() 1 sage: H = CuspForms(1, 24).hecke_algebra() sage: H.discriminant() 83041344
- gen(n)¶
Return the \(n\)-th Hecke operator.
EXAMPLES:
sage: T = ModularSymbols(11).hecke_algebra() sage: T.gen(2) Hecke operator T_2 on Modular Symbols space of dimension 3 for Gamma_0(11) of weight 2 with sign 0 over Rational Field
- gens()¶
Return a generator over all Hecke operator \(T_n\) for \(n = 1, 2, 3, \ldots\). This is infinite.
EXAMPLES:
sage: T = ModularSymbols(1,12).hecke_algebra() sage: g = T.gens() sage: next(g) Hecke operator T_1 on Modular Symbols space of dimension 3 for Gamma_0(1) of weight 12 with sign 0 over Rational Field sage: next(g) Hecke operator T_2 on Modular Symbols space of dimension 3 for Gamma_0(1) of weight 12 with sign 0 over Rational Field
- hecke_matrix(n, *args, **kwds)¶
Return the matrix of the n-th Hecke operator \(T_n\).
EXAMPLES:
sage: T = ModularSymbols(1,12).hecke_algebra() sage: T.hecke_matrix(2) [ -24 0 0] [ 0 -24 0] [4860 0 2049]
- hecke_operator(n)¶
Return the \(n\)-th Hecke operator \(T_n\).
EXAMPLES:
sage: T = ModularSymbols(1,12).hecke_algebra() sage: T.hecke_operator(2) Hecke operator T_2 on Modular Symbols space of dimension 3 for Gamma_0(1) of weight 12 with sign 0 over Rational Field
- is_noetherian()¶
Return True if this Hecke algebra is Noetherian as a ring. This is true if and only if the base ring is Noetherian.
EXAMPLES:
sage: CuspForms(1, 12).anemic_hecke_algebra().is_noetherian() True
- level()¶
Return the level of this Hecke algebra, which is (by definition) the level of the Hecke module on which it acts.
EXAMPLES:
sage: ModularSymbols(37).hecke_algebra().level() 37
- matrix_space()¶
Return the underlying matrix space of this module.
EXAMPLES:
sage: CuspForms(3, 24, base_ring=Qp(5)).anemic_hecke_algebra().matrix_space() Full MatrixSpace of 7 by 7 dense matrices over 5-adic Field with capped relative precision 20
- module()¶
The Hecke module on which this algebra is acting.
EXAMPLES:
sage: T = ModularSymbols(1,12).hecke_algebra() sage: T.module() Modular Symbols space of dimension 3 for Gamma_0(1) of weight 12 with sign 0 over Rational Field
- ngens()¶
The size of the set of generators returned by gens(), which is clearly infinity. (This is not necessarily a minimal set of generators.)
EXAMPLES:
sage: CuspForms(1, 12).anemic_hecke_algebra().ngens() +Infinity
- rank()¶
The rank of this Hecke algebra as a module over its base ring. Not implemented at present.
EXAMPLES:
sage: ModularSymbols(Gamma1(3), 3).hecke_algebra().rank() Traceback (most recent call last): ... NotImplementedError
- class sage.modular.hecke.algebra.HeckeAlgebra_full(M)¶
Bases:
sage.modular.hecke.algebra.HeckeAlgebra_base
A full Hecke algebra (including the operators \(T_n\) where \(n\) is not assumed to be coprime to the level).
- anemic_subalgebra()¶
The subalgebra of self generated by the Hecke operators of index coprime to the level.
EXAMPLES:
sage: H = CuspForms(3, 12).hecke_algebra() sage: H.anemic_subalgebra() Anemic Hecke algebra acting on Cuspidal subspace of dimension 3 of Modular Forms space of dimension 5 for Congruence Subgroup Gamma0(3) of weight 12 over Rational Field
- is_anemic()¶
Return False, since this the full Hecke algebra.
EXAMPLES:
sage: H = CuspForms(3, 12).hecke_algebra() sage: H.is_anemic() False
- sage.modular.hecke.algebra.is_HeckeAlgebra(x)¶
Return True if x is of type HeckeAlgebra.
EXAMPLES:
sage: from sage.modular.hecke.algebra import is_HeckeAlgebra sage: is_HeckeAlgebra(CuspForms(1, 12).anemic_hecke_algebra()) True sage: is_HeckeAlgebra(ZZ) False