added final_hil_pol

This commit is contained in:
Andre 2023-06-16 18:22:23 -04:00
parent aac88adc02
commit 19ef96ef49

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@ -4,6 +4,12 @@ import Mathlib.Algebra.Module.GradedModule
import Mathlib.RingTheory.Ideal.AssociatedPrime import Mathlib.RingTheory.Ideal.AssociatedPrime
import Mathlib.RingTheory.Artinian import Mathlib.RingTheory.Artinian
import Mathlib.Order.Height import Mathlib.Order.Height
import Mathlib.RingTheory.Ideal.Quotient
import Mathlib.RingTheory.SimpleModule
import Mathlib.Algebra.Module.LinearMap
import Mathlib.Algebra.Field.Defs
import CommAlg.krull
-- Setting for "library_search" -- Setting for "library_search"
@ -25,6 +31,7 @@ macro "obviously" : tactic =>
| ring; done; dbg_trace "it was ring" | ring; done; dbg_trace "it was ring"
| trivial; done; dbg_trace "it was trivial" | trivial; done; dbg_trace "it was trivial"
-- | nlinarith; done -- | nlinarith; done
| aesop; done; dbg_trace "it was aesop"
| fail "No, this is not obvious.")) | fail "No, this is not obvious."))
@ -39,8 +46,7 @@ section
-- Definition of polynomail of type d -- Definition of polynomail of type d
def PolyType (f : ) (d : ) := ∃ Poly : Polynomial , ∃ (N : ), ∀ (n : ), N ≤ n → f n = Polynomial.eval (n : ) Poly ∧ d = Polynomial.degree Poly def PolyType (f : ) (d : ) := ∃ Poly : Polynomial , ∃ (N : ), ∀ (n : ), N ≤ n → f n = Polynomial.eval (n : ) Poly ∧ d = Polynomial.degree Poly
noncomputable def length ( A : Type _) (M : Type _)
[CommRing A] [AddCommGroup M] [Module A M] := Set.chainHeight {M' : Submodule A M | M' < }
-- Make instance of M_i being an R_0-module -- Make instance of M_i being an R_0-module
instance tada1 (𝒜 : → Type _) (𝓜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)] [DirectSum.GCommRing 𝒜] instance tada1 (𝒜 : → Type _) (𝓜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)] [DirectSum.GCommRing 𝒜]
@ -67,15 +73,30 @@ instance tada3 (𝒜 : → Type _) (𝓜 : → Type _) [∀ i, AddCommGr
-- Definition of a Hilbert function of a graded module -- Definition of a Hilbert function of a graded module
section section
noncomputable def length ( A : Type _) (M : Type _)
[CommRing A] [AddCommGroup M] [Module A M] := Set.chainHeight {M' : Submodule A M | M' < }
noncomputable def dimensionmodule ( A : Type _) (M : Type _)
[CommRing A] [AddCommGroup M] [Module A M] := Ideal.krullDim (A (( : Submodule A M).annihilator))
noncomputable def hilbert_function (𝒜 : → Type _) (𝓜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)] noncomputable def hilbert_function (𝒜 : → Type _) (𝓜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)]
[DirectSum.GCommRing 𝒜] [DirectSum.GCommRing 𝒜]
[DirectSum.Gmodule 𝒜 𝓜] (hilb : ) := ∀ i, hilb i = (ENat.toNat (length (𝒜 0) (𝓜 i))) [DirectSum.Gmodule 𝒜 𝓜] (hilb : ) := ∀ i, hilb i = (ENat.toNat (length (𝒜 0) (𝓜 i)))
noncomputable def dimensionring { A: Type _}
[CommRing A] := krullDim (PrimeSpectrum A)
noncomputable def dimensionmodule ( A : Type _) (M : Type _) lemma lengthfield ( k : Type _) [Field k] : length (k) (k) = 1 := by
[CommRing A] [AddCommGroup M] [Module A M] := krullDim (PrimeSpectrum (A (( : Submodule A M).annihilator)) ) sorry
lemma equaldim ( A : Type _) [CommRing A] (I : Ideal A): dimensionmodule (A) (A I) = Ideal.krullDim (A I) := by
sorry
lemma dim_iso ( A : Type _) (M : Type _) (N : Type _) [CommRing A] [AddCommGroup M] [Module A M] [AddCommGroup N] [Module A N] (h : Nonempty (M →ₗ[A] N)) : dimensionmodule A M = dimensionmodule A N := by
sorry
end end
@ -108,6 +129,7 @@ instance {𝒜 : → Type _} [∀ i, AddCommGroup (𝒜 i)] [DirectSum.GComm
sorry) sorry)
class StandardGraded (𝒜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [DirectSum.GCommRing 𝒜] : Prop where class StandardGraded (𝒜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [DirectSum.GCommRing 𝒜] : Prop where
gen_in_first_piece : gen_in_first_piece :
Algebra.adjoin (𝒜 0) (DirectSum.of _ 1 : 𝒜 1 →+ ⨁ i, 𝒜 i).range = ( : Subalgebra (𝒜 0) (⨁ i, 𝒜 i)) Algebra.adjoin (𝒜 0) (DirectSum.of _ 1 : 𝒜 1 →+ ⨁ i, 𝒜 i).range = ( : Subalgebra (𝒜 0) (⨁ i, 𝒜 i))
@ -120,66 +142,109 @@ def Component_of_graded_as_addsubgroup (𝒜 : → Type _)
sorry sorry
def graded_morphism (𝒜 : → Type _) (𝓜 : → Type _) (𝓝 : → Type _) def graded_ring_morphism (𝒜 : → Type _) ( : → Type _)
[∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup ( i)]
[DirectSum.GCommRing 𝒜] [DirectSum.GCommRing ] (f : (⨁ i, 𝒜 i) →+* (⨁ i, i)) := ∀ i, ∀ (r : 𝒜 i), ∀ j, (j ≠ i → f (DirectSum.of _ i r) j = 0)
structure GradedLinearMap (𝒜 : → Type _) (𝓜 : → Type _) (𝓝 : → Type _)
[∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)] [∀ i, AddCommGroup (𝓝 i)] [∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)] [∀ i, AddCommGroup (𝓝 i)]
[DirectSum.GCommRing 𝒜] [DirectSum.Gmodule 𝒜 𝓜] [DirectSum.Gmodule 𝒜 𝓝] [DirectSum.GCommRing 𝒜] [DirectSum.Gmodule 𝒜 𝓜] [DirectSum.Gmodule 𝒜 𝓝]
(f : (⨁ i, 𝓜 i) →ₗ[(⨁ i, 𝒜 i)] (⨁ i, 𝓝 i)) extends LinearMap (RingHom.id (⨁ i, 𝒜 i)) (⨁ i, 𝓜 i) (⨁ i, 𝓝 i) where
: ∀ i, ∀ (r : 𝓜 i), ∀ j, (j ≠ i → f (DirectSum.of _ i r) j = 0) respects_grading (i : ) (r : 𝓜 i) (j : ) : j ≠ i → toFun (DirectSum.of _ i r) j = 0
∧ (IsLinearMap (⨁ i, 𝒜 i) f) := by
sorry
#check graded_morphism /-- `𝓜 →ᵍₗ[𝒜] 𝓝` denotes the type of graded `𝒜`-linear maps from `𝓜` to `𝓝`. -/
notation:25 𝓜 " →ᵍₗ[" 𝒜:25 "] " 𝓝:0 => GradedLinearMap 𝒜 𝓜 𝓝
def graded_isomorphism (𝒜 : → Type _) (𝓜 : → Type _) (𝓝 : → Type _) structure GradedLinearEquiv (𝒜 : → Type _) (𝓜 : → Type _) (𝓝 : → Type _)
[∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)] [∀ i, AddCommGroup (𝓝 i)] [∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)] [∀ i, AddCommGroup (𝓝 i)]
[DirectSum.GCommRing 𝒜] [DirectSum.Gmodule 𝒜 𝓜][DirectSum.Gmodule 𝒜 𝓝] [DirectSum.GCommRing 𝒜] [DirectSum.Gmodule 𝒜 𝓜][DirectSum.Gmodule 𝒜 𝓝]
(f : (⨁ i, 𝓜 i) →ₗ[(⨁ i, 𝒜 i)] (⨁ i, 𝓝 i)) extends (⨁ i, 𝓜 i) ≃ (⨁ i, 𝓝 i), 𝓜 →ᵍₗ[𝒜] 𝓝
: IsLinearEquiv f := by
sorry
-- f ∈ (⨁ i, 𝓜 i) ≃ₗ[(⨁ i, 𝒜 i)] (⨁ i, 𝓝 i)
-- LinearEquivClass f (⨁ i, 𝒜 i) (⨁ i, 𝓜 i) (⨁ i, 𝓝 i)
-- #print IsLinearEquiv
#check graded_isomorphism
/-- `𝓜 ≃ᵍₗ[𝒜] 𝓝` denotes the type of graded `𝒜`-linear isomorphisms from `(⨁ i, 𝓜 i)` to `(⨁ i, 𝓝 i)`. -/
notation:25 𝓜 " ≃ᵍₗ[" 𝒜:25 "] " 𝓝:0 => GradedLinearEquiv 𝒜 𝓜 𝓝
def graded_ring_isomorphism (𝒜 : → Type _) (𝓑 : → Type _)
[∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓑 i)]
[DirectSum.GCommRing 𝒜] [DirectSum.GCommRing 𝓑]
(f : (⨁ i, 𝒜 i) →+* (⨁ i, 𝓑 i))
:= (graded_ring_morphism 𝒜 𝓑 f) ∧ (Function.Bijective f)
def graded_submodule def graded_ring_isomorphic (𝒜 : → Type _) (𝓑 : → Type _)
(𝒜 : → Type _) (𝓜 : → Type u) (𝓝 : → Type u) [∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓑 i)]
[∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)] [∀ i, AddCommGroup (𝓝 i)] [DirectSum.GCommRing 𝒜] [DirectSum.GCommRing 𝓑] := ∃ (f : (⨁ i, 𝒜 i) →+* (⨁ i, 𝓑 i)), graded_ring_isomorphism 𝒜 𝓑 f
[DirectSum.GCommRing 𝒜] [DirectSum.Gmodule 𝒜 𝓜][DirectSum.Gmodule 𝒜 𝓝]
(opn : Submodule (⨁ i, 𝒜 i) (⨁ i, 𝓜 i)) (opnis : opn = (⨁ i, 𝓝 i)) (i : ) -- def graded_submodule
: ∃(piece : Submodule (𝒜 0) (𝓜 i)), piece = 𝓝 i := by -- (𝒜 : → Type _) (𝓜 : → Type _) (𝓝 : → Type _)
sorry -- [∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)] [∀ i, AddCommGroup (𝓝 i)]
-- [DirectSum.GCommRing 𝒜] [DirectSum.Gmodule 𝒜 𝓜][DirectSum.Gmodule 𝒜 𝓝]
-- (h (⨁ i, 𝓝 i) : Submodule (⨁ i, 𝒜 i) (⨁ i, 𝓜 i)) :
-- Prop :=
-- ∃ (piece : Submodule (𝒜 0) (𝓜 i)), piece = 𝓝 i
end end
class DirectSum.GalgebrA
-- @Quotient of a graded ring R by a graded ideal p is a graded R-Mod, preserving each component
instance Quotient_of_graded_is_graded
(𝒜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [DirectSum.GCommRing 𝒜] (𝒜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [DirectSum.GCommRing 𝒜]
(p : Ideal (⨁ i, 𝒜 i)) (hp : Ideal.IsHomogeneous' 𝒜 p) (𝓜 : → Type _) [∀ i, AddCommGroup (𝓜 i)] [DirectSum.GCommRing 𝓜]
: DirectSum.Gmodule 𝒜 (fun i => (𝒜 i)(Component_of_graded_as_addsubgroup 𝒜 p hp i)) := by extends DirectSum.Gmodule 𝒜 𝓜
-- def graded_algebra_morphism (𝒜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [DirectSum.GCommRing 𝒜]
-- (𝓜 : → Type _) [∀ i, AddCommGroup (𝓜 i)] [DirectSum.GCommRing 𝓜] [DirectSum.GalgebrA 𝒜 𝓜]
-- (𝓝 : → Type _) [∀ i, AddCommGroup (𝓝 i)] [DirectSum.GCommRing 𝓝] [DirectSum.GalgebrA 𝒜 𝓝]
-- (f : (⨁ i, 𝓜 i) → (⨁ i, 𝓝 i)) := (graded_ring_morphism 𝓜 𝓝 f) ∧ (GradedLinearMap 𝒜 𝓜 𝓝 toFun)
-- @Quotient of a graded ring R by a graded ideal p is a graded R-alg, preserving each component
instance Quotient_of_graded_gradedring
(𝒜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [DirectSum.GCommRing 𝒜]
(p : Ideal (⨁ i, 𝒜 i)) (hp : Ideal.IsHomogeneous' 𝒜 p) :
DirectSum.GCommRing (fun i => (𝒜 i)(Component_of_graded_as_addsubgroup 𝒜 p hp i)) := by
sorry sorry
-- instance Quotient_of_graded_is_gradedalg
lemma sss (𝒜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [DirectSum.GCommRing 𝒜]
: true := by (p : Ideal (⨁ i, 𝒜 i)) (hp : Ideal.IsHomogeneous' 𝒜 p) :
DirectSum.GalgebrA 𝒜 (fun i => (𝒜 i)(Component_of_graded_as_addsubgroup 𝒜 p hp i)) := by
sorry sorry
section
variable (𝒜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [DirectSum.GCommRing 𝒜]
[LocalRing (𝒜 0)] (m : LocalRing.maximalIdeal (𝒜 0))
-- check if `Pi.Single` or something writes this more elegantly
def GradedOneComponent (i : ) : Type _ := ite (i = 0) (𝒜 0 LocalRing.maximalIdeal (𝒜 0)) PUnit
instance (i : ) : AddMonoid (GradedOneComponent 𝒜 i) := by
unfold GradedOneComponent
sorry -- split into 0 and nonzero cases and then `inferInstance`
instance : DirectSum.Gmodule 𝒜 (GradedOneComponent 𝒜) := by sorry
lemma Graded_local [StandardGraded 𝒜] (I : Ideal (⨁ i, 𝒜 i)) (hp : (HomogeneousMax 𝒜 I)) [∀ i, Module (𝒜 0) ((𝒜 i)(Component_of_graded_as_addsubgroup 𝒜 I hp.2 i))] (art: IsArtinianRing (𝒜 0)) : (∀ (i : ), (i ≠ 0 → Nonempty (((𝒜 i)(Component_of_graded_as_addsubgroup 𝒜 I hp.2 i)) →ₗ[𝒜 0] (𝒜 i))) ) := by
sorry
end
lemma Quotient_of_graded_ringiso (𝒜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [DirectSum.GCommRing 𝒜](p : Ideal (⨁ i, 𝒜 i)) (hp : Ideal.IsHomogeneous' 𝒜 p)
-- (hm : 𝓜 = (fun i => (𝒜 i)(Component_of_graded_as_addsubgroup 𝒜 p hp i)))
: Nonempty (((⨁ i, (𝒜 i))p) →ₗ[(⨁ i, 𝒜 i)] (⨁ i, (𝒜 i)(Component_of_graded_as_addsubgroup 𝒜 p hp i))) := by
sorry
def Is.Graded_local (𝒜 : → Type _)
[∀ i, AddCommGroup (𝒜 i)][DirectSum.GCommRing 𝒜] := ∃! ( I : Ideal ((⨁ i, 𝒜 i))),(HomogeneousMax 𝒜 I)
lemma hilfun_eq (𝒜 : → Type _) (𝓜 : → Type _) (𝓝 : → Type _)
[∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)] [∀ i, AddCommGroup (𝓝 i)]
[DirectSum.GCommRing 𝒜] [DirectSum.Gmodule 𝒜 𝓜][DirectSum.Gmodule 𝒜 𝓝] (iso : GradedLinearEquiv 𝒜 𝓜 𝓝)(hilbm : ) (Hhilbm: hilbert_function 𝒜 𝓜 hilbm) (hilbn : ) (Hhilbn: hilbert_function 𝒜 𝓝 hilbn) : ∀ (n : ), hilbm n = hilbn n := by
sorry
-- If A_0 is Artinian and local, then A is graded local -- If A_0 is Artinian and local, then A is graded local
lemma Graded_local_if_zero_component_Artinian_and_local (𝒜 : → Type _) (𝓜 : → Type _)
[∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)]
[DirectSum.GCommRing 𝒜] [DirectSum.Gmodule 𝒜 𝓜] (art: IsArtinianRing (𝒜 0)) (loc : LocalRing (𝒜 0)) : ∃ ( I : Ideal ((⨁ i, 𝒜 i))),(HomogeneousMax 𝒜 I) := by
sorry
-- @Existence of a chain of submodules of graded submoduels of a f.g graded R-mod M -- @Existence of a chain of submodules of graded submoduels of a f.g graded R-mod M
@ -213,11 +278,10 @@ lemma Associated_prime_of_graded_is_graded
-- If M is a finite graed R-Mod of dimension d ≥ 1, then the Hilbert function H(M, n) is of polynomial type (d - 1) -- If M is a finite graed R-Mod of dimension d ≥ 1, then the Hilbert function H(M, n) is of polynomial type (d - 1)
theorem Hilbert_polynomial_d_ge_1 (d : ) (d1 : 1 ≤ d) (𝒜 : → Type _) (𝓜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)] theorem Hilbert_polynomial_d_ge_1 (d : ) (d1 : 1 ≤ d) (𝒜 : → Type _) (𝓜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)]
[DirectSum.GCommRing 𝒜] [DirectSum.GCommRing 𝒜]
[DirectSum.Gmodule 𝒜 𝓜] (st: StandardGraded 𝒜) (art: IsArtinianRing (𝒜 0)) (loc : LocalRing (𝒜 0)) [DirectSum.Gmodule 𝒜 𝓜] [StandardGraded 𝒜] (art: IsArtinianRing (𝒜 0)) (loc : LocalRing (𝒜 0))
(fingen : IsNoetherian (⨁ i, 𝒜 i) (⨁ i, 𝓜 i)) (fingen : IsNoetherian (⨁ i, 𝒜 i) (⨁ i, 𝓜 i))
(findim : dimensionmodule (⨁ i, 𝒜 i) (⨁ i, 𝓜 i) = d) (findim : dimensionmodule (⨁ i, 𝒜 i) (⨁ i, 𝓜 i) = d)
(hilb : ) (Hhilb: hilbert_function 𝒜 𝓜 hilb) (hilb : ) (Hhilb: hilbert_function 𝒜 𝓜 hilb)
: PolyType hilb (d - 1) := by : PolyType hilb (d - 1) := by
sorry sorry
@ -228,7 +292,7 @@ theorem Hilbert_polynomial_d_ge_1_reduced
(d : ) (d1 : 1 ≤ d) (d : ) (d1 : 1 ≤ d)
(𝒜 : → Type _) (𝓜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)] (𝒜 : → Type _) (𝓜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)]
[DirectSum.GCommRing 𝒜] [DirectSum.GCommRing 𝒜]
[DirectSum.Gmodule 𝒜 𝓜] (st: StandardGraded 𝒜) (art: IsArtinianRing (𝒜 0)) (loc : LocalRing (𝒜 0)) [DirectSum.Gmodule 𝒜 𝓜] [StandardGraded 𝒜] (art: IsArtinianRing (𝒜 0)) (loc : LocalRing (𝒜 0))
(fingen : IsNoetherian (⨁ i, 𝒜 i) (⨁ i, 𝓜 i)) (fingen : IsNoetherian (⨁ i, 𝒜 i) (⨁ i, 𝓜 i))
(findim : dimensionmodule (⨁ i, 𝒜 i) (⨁ i, 𝓜 i) = d) (findim : dimensionmodule (⨁ i, 𝒜 i) (⨁ i, 𝓜 i) = d)
(hilb : ) (Hhilb: hilbert_function 𝒜 𝓜 hilb) (hilb : ) (Hhilb: hilbert_function 𝒜 𝓜 hilb)
@ -242,48 +306,9 @@ theorem Hilbert_polynomial_d_ge_1_reduced
-- If M is a finite graed R-Mod of dimension zero, then the Hilbert function H(M, n) = 0 for n >> 0 -- If M is a finite graed R-Mod of dimension zero, then the Hilbert function H(M, n) = 0 for n >> 0
theorem Hilbert_polynomial_d_0 (𝒜 : → Type _) (𝓜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)] theorem Hilbert_polynomial_d_0 (𝒜 : → Type _) (𝓜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)]
[DirectSum.GCommRing 𝒜] [DirectSum.GCommRing 𝒜]
[DirectSum.Gmodule 𝒜 𝓜] (st: StandardGraded 𝒜) (art: IsArtinianRing (𝒜 0)) (loc : LocalRing (𝒜 0)) [DirectSum.Gmodule 𝒜 𝓜] [StandardGraded 𝒜] (art: IsArtinianRing (𝒜 0)) (loc : LocalRing (𝒜 0))
(fingen : IsNoetherian (⨁ i, 𝒜 i) (⨁ i, 𝓜 i)) (fingen : IsNoetherian (⨁ i, 𝒜 i) (⨁ i, 𝓜 i))
(findim : dimensionmodule (⨁ i, 𝒜 i) (⨁ i, 𝓜 i) = 0) (findim : dimensionmodule (⨁ i, 𝒜 i) (⨁ i, 𝓜 i) = 0)
(hilb : ) (Hhilb : hilbert_function 𝒜 𝓜 hilb) (hilb : ) (Hhilb : hilbert_function 𝒜 𝓜 hilb)
: (∃ (N : ), ∀ (n : ), n ≥ N → hilb n = 0) := by : (∃ (N : ), ∀ (n : ), n ≥ N → hilb n = 0) := by
sorry sorry
-- (reduced version) [BH, 4.1.3] when d = 0
-- If M is a finite graed R-Mod of dimension zero, and M = R 𝓅 for a graded prime ideal 𝓅, then the Hilbert function H(M, n) = 0 for n >> 0
theorem Hilbert_polynomial_d_0_reduced
(𝒜 : → Type _) (𝓜 : → Type _) [∀ i, AddCommGroup (𝒜 i)] [∀ i, AddCommGroup (𝓜 i)]
[DirectSum.GCommRing 𝒜]
[DirectSum.Gmodule 𝒜 𝓜] (st: StandardGraded 𝒜) (art: IsArtinianRing (𝒜 0)) (loc : LocalRing (𝒜 0))
(fingen : IsNoetherian (⨁ i, 𝒜 i) (⨁ i, 𝓜 i))
(findim : dimensionmodule (⨁ i, 𝒜 i) (⨁ i, 𝓜 i) = 0)
(hilb : ) (Hhilb : hilbert_function 𝒜 𝓜 hilb)
(p : Ideal (⨁ i, 𝒜 i)) (hp : Ideal.IsHomogeneous' 𝒜 p)
(hm : 𝓜 = (fun i => (𝒜 i)(Component_of_graded_as_addsubgroup 𝒜 p hp i)))
: (∃ (N : ), ∀ (n : ), n ≥ N → hilb n = 0) := by
sorry