Left Homology of short complexes #
Given a short complex S : ShortComplex C
, which consists of two composable
maps f : X₁ ⟶ X₂
and g : X₂ ⟶ X₃
such that f ≫ g = 0
, we shall define
here the "left homology" S.leftHomology
of S
. For this, we introduce the
notion of "left homology data". Such an h : S.LeftHomologyData
consists of the
data of morphisms i : K ⟶ X₂
and π : K ⟶ H
such that i
identifies
K
with the kernel of g : X₂ ⟶ X₃
, and that π
identifies H
with the cokernel
of the induced map f' : X₁ ⟶ K
.
When such a S.LeftHomologyData
exists, we shall say that [S.HasLeftHomology]
and we define S.leftHomology
to be the H
field of a chosen left homology data.
Similarly, we define S.cycles
to be the K
field.
The dual notion is defined in RightHomologyData.lean
. In Homology.lean
,
when S
has two compatible left and right homology data (i.e. they give
the same H
up to a canonical isomorphism), we shall define [S.HasHomology]
and S.homology
.
A left homology data for a short complex S
consists of morphisms i : K ⟶ S.X₂
and
π : K ⟶ H
such that i
identifies K
to the kernel of g : S.X₂ ⟶ S.X₃
,
and that π
identifies H
to the cokernel of the induced map f' : S.X₁ ⟶ K
- K : C
a choice of kernel of
S.g : S.X₂ ⟶ S.X₃
- H : C
- i : self.K ⟶ S.X₂
the inclusion of cycles in
S.X₂
- π : self.K ⟶ self.H
the projection from cycles to the (left) homology
- wi : CategoryTheory.CategoryStruct.comp self.i S.g = 0
the kernel condition for
i
- hi : CategoryTheory.Limits.IsLimit (CategoryTheory.Limits.KernelFork.ofι self.i ⋯)
- wπ : CategoryTheory.CategoryStruct.comp (self.hi.lift (CategoryTheory.Limits.KernelFork.ofι S.f ⋯)) self.π = 0
the cokernel condition for
π
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The chosen kernels and cokernels of the limits API give a LeftHomologyData
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- ⋯ = ⋯
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- ⋯ = ⋯
Any morphism k : A ⟶ S.X₂
that is a cycle (i.e. k ≫ S.g = 0
) lifts
to a morphism A ⟶ K
Equations
- CategoryTheory.ShortComplex.LeftHomologyData.liftK h k hk = h.hi.lift (CategoryTheory.Limits.KernelFork.ofι k hk)
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The (left) homology class A ⟶ H
attached to a cycle k : A ⟶ S.X₂
Equations
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Given h : LeftHomologyData S
, this is morphism S.X₁ ⟶ h.K
induced
by S.f : S.X₁ ⟶ S.X₂
and the fact that h.K
is a kernel of S.g : S.X₂ ⟶ S.X₃
.
Equations
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For h : S.LeftHomologyData
, this is a restatement of h.hπ
, saying that
π : h.K ⟶ h.H
is a cokernel of h.f' : S.X₁ ⟶ h.K
.
Equations
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The morphism H ⟶ A
induced by a morphism k : K ⟶ A
such that f' ≫ k = 0
Equations
- CategoryTheory.ShortComplex.LeftHomologyData.descH h k hk = h.hπ.desc (CategoryTheory.Limits.CokernelCofork.ofπ k hk)
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When the second map S.g
is zero, this is the left homology data on S
given
by any colimit cokernel cofork of S.f
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When the second map S.g
is zero, this is the left homology data on S
given by
the chosen cokernel S.f
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When the first map S.f
is zero, this is the left homology data on S
given
by any limit kernel fork of S.g
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When the first map S.f
is zero, this is the left homology data on S
given
by the chosen kernel S.g
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When both S.f
and S.g
are zero, the middle object S.X₂
gives a left homology data on S
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A short complex S
has left homology when there exists a S.LeftHomologyData
- condition : Nonempty (CategoryTheory.ShortComplex.LeftHomologyData S)
Instances
A chosen S.LeftHomologyData
for a short complex S
that has left homology
Equations
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- ⋯ = ⋯
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- ⋯ = ⋯
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- ⋯ = ⋯
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- ⋯ = ⋯
Given left homology data h₁
and h₂
for two short complexes S₁
and S₂
,
a LeftHomologyMapData
for a morphism φ : S₁ ⟶ S₂
consists of a description of the induced morphisms on the K
(cycles)
and H
(left homology) fields of h₁
and h₂
.
- φK : h₁.K ⟶ h₂.K
the induced map on cycles
- φH : h₁.H ⟶ h₂.H
the induced map on left homology
- commi : CategoryTheory.CategoryStruct.comp self.φK h₂.i = CategoryTheory.CategoryStruct.comp h₁.i φ.τ₂
commutation with
i
- commf' : CategoryTheory.CategoryStruct.comp (CategoryTheory.ShortComplex.LeftHomologyData.f' h₁) self.φK = CategoryTheory.CategoryStruct.comp φ.τ₁ (CategoryTheory.ShortComplex.LeftHomologyData.f' h₂)
commutation with
f'
- commπ : CategoryTheory.CategoryStruct.comp h₁.π self.φH = CategoryTheory.CategoryStruct.comp self.φK h₂.π
commutation with
π
Instances For
The left homology map data associated to the zero morphism between two short complexes.
Equations
- CategoryTheory.ShortComplex.LeftHomologyMapData.zero h₁ h₂ = { φK := 0, φH := 0, commi := ⋯, commf' := ⋯, commπ := ⋯ }
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The left homology map data associated to the identity morphism of a short complex.
Equations
- CategoryTheory.ShortComplex.LeftHomologyMapData.id h = { φK := CategoryTheory.CategoryStruct.id h.K, φH := CategoryTheory.CategoryStruct.id h.H, commi := ⋯, commf' := ⋯, commπ := ⋯ }
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The composition of left homology map data.
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- ⋯ = ⋯
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When S₁.f
, S₁.g
, S₂.f
and S₂.g
are all zero, the action on left homology of a
morphism φ : S₁ ⟶ S₂
is given by the action φ.τ₂
on the middle objects.
Equations
- CategoryTheory.ShortComplex.LeftHomologyMapData.ofZeros φ hf₁ hg₁ hf₂ hg₂ = { φK := φ.τ₂, φH := φ.τ₂, commi := ⋯, commf' := ⋯, commπ := ⋯ }
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When S₁.g
and S₂.g
are zero and we have chosen colimit cokernel coforks c₁
and c₂
for S₁.f
and S₂.f
respectively, the action on left homology of a morphism φ : S₁ ⟶ S₂
of
short complexes is given by the unique morphism f : c₁.pt ⟶ c₂.pt
such that
φ.τ₂ ≫ c₂.π = c₁.π ≫ f
.
Equations
- CategoryTheory.ShortComplex.LeftHomologyMapData.ofIsColimitCokernelCofork φ hg₁ c₁ hc₁ hg₂ c₂ hc₂ f comm = { φK := φ.τ₂, φH := f, commi := ⋯, commf' := ⋯, commπ := ⋯ }
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When S₁.f
and S₂.f
are zero and we have chosen limit kernel forks c₁
and c₂
for S₁.g
and S₂.g
respectively, the action on left homology of a morphism φ : S₁ ⟶ S₂
of
short complexes is given by the unique morphism f : c₁.pt ⟶ c₂.pt
such that
c₁.ι ≫ φ.τ₂ = f ≫ c₂.ι
.
Equations
- CategoryTheory.ShortComplex.LeftHomologyMapData.ofIsLimitKernelFork φ hf₁ c₁ hc₁ hf₂ c₂ hc₂ f comm = { φK := f, φH := f, commi := ⋯, commf' := ⋯, commπ := ⋯ }
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When both maps S.f
and S.g
of a short complex S
are zero, this is the left homology map
data (for the identity of S
) which relates the left homology data ofZeros
and
ofIsColimitCokernelCofork
.
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When both maps S.f
and S.g
of a short complex S
are zero, this is the left homology map
data (for the identity of S
) which relates the left homology data
LeftHomologyData.ofIsLimitKernelFork
and ofZeros
.
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The left homology of a short complex, given by the H
field of a chosen left homology data.
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The cycles of a short complex, given by the K
field of a chosen left homology data.
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The "homology class" map S.cycles ⟶ S.leftHomology
.
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The inclusion S.cycles ⟶ S.X₂
.
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The "boundaries" map S.X₁ ⟶ S.cycles
. (Note that in this homology API, we make no use
of the "image" of this morphism, which under some categorical assumptions would be a subobject
of S.X₂
contained in S.cycles
.)
Equations
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Equations
- ⋯ = ⋯
Equations
- ⋯ = ⋯
When S.g = 0
, this is the canonical isomorphism S.cycles ≅ S.X₂
induced by S.iCycles
.
Equations
- CategoryTheory.ShortComplex.cyclesIsoX₂ S hg = let_fun this := ⋯; CategoryTheory.asIso (CategoryTheory.ShortComplex.iCycles S)
Instances For
When S.f = 0
, this is the canonical isomorphism S.cycles ≅ S.leftHomology
induced
by S.leftHomologyπ
.
Equations
- CategoryTheory.ShortComplex.cyclesIsoLeftHomology S hf = let_fun this := ⋯; CategoryTheory.asIso (CategoryTheory.ShortComplex.leftHomologyπ S)
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The (unique) left homology map data associated to a morphism of short complexes that are both equipped with left homology data.
Equations
- CategoryTheory.ShortComplex.leftHomologyMapData φ h₁ h₂ = default
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Given a morphism φ : S₁ ⟶ S₂
of short complexes and left homology data h₁
and h₂
for S₁
and S₂
respectively, this is the induced left homology map h₁.H ⟶ h₁.H
.
Equations
- CategoryTheory.ShortComplex.leftHomologyMap' φ h₁ h₂ = (CategoryTheory.ShortComplex.leftHomologyMapData φ h₁ h₂).φH
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Given a morphism φ : S₁ ⟶ S₂
of short complexes and left homology data h₁
and h₂
for S₁
and S₂
respectively, this is the induced morphism h₁.K ⟶ h₁.K
on cycles.
Equations
- CategoryTheory.ShortComplex.cyclesMap' φ h₁ h₂ = (CategoryTheory.ShortComplex.leftHomologyMapData φ h₁ h₂).φK
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The (left) homology map S₁.leftHomology ⟶ S₂.leftHomology
induced by a morphism
S₁ ⟶ S₂
of short complexes.
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The morphism S₁.cycles ⟶ S₂.cycles
induced by a morphism S₁ ⟶ S₂
of short complexes.
Equations
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An isomorphism of short complexes S₁ ≅ S₂
induces an isomorphism on the H
fields
of left homology data of S₁
and S₂
.
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Equations
- ⋯ = ⋯
An isomorphism of short complexes S₁ ≅ S₂
induces an isomorphism on the K
fields
of left homology data of S₁
and S₂
.
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Equations
- ⋯ = ⋯
The isomorphism S₁.leftHomology ≅ S₂.leftHomology
induced by an isomorphism of
short complexes S₁ ≅ S₂
.
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Equations
- ⋯ = ⋯
The isomorphism S₁.cycles ≅ S₂.cycles
induced by an isomorphism
of short complexes S₁ ≅ S₂
.
Equations
- CategoryTheory.ShortComplex.cyclesMapIso e = { hom := CategoryTheory.ShortComplex.cyclesMap e.hom, inv := CategoryTheory.ShortComplex.cyclesMap e.inv, hom_inv_id := ⋯, inv_hom_id := ⋯ }
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Equations
- ⋯ = ⋯
The isomorphism S.leftHomology ≅ h.H
induced by a left homology data h
for a
short complex S
.
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The isomorphism S.cycles ≅ h.K
induced by a left homology data h
for a
short complex S
.
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The left homology functor ShortComplex C ⥤ C
, where the left homology of a
short complex S
is understood as a cokernel of the obvious map S.toCycles : S.X₁ ⟶ S.cycles
where S.cycles
is a kernel of S.g : S.X₂ ⟶ S.X₃
.
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The cycles functor ShortComplex C ⥤ C
which sends a short complex S
to S.cycles
which is a kernel of S.g : S.X₂ ⟶ S.X₃
.
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The natural transformation S.cycles ⟶ S.leftHomology
for all short complexes S
.
Equations
- CategoryTheory.ShortComplex.leftHomologyπNatTrans C = { app := fun (S : CategoryTheory.ShortComplex C) => CategoryTheory.ShortComplex.leftHomologyπ S, naturality := ⋯ }
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The natural transformation S.cycles ⟶ S.X₂
for all short complexes S
.
Equations
- CategoryTheory.ShortComplex.iCyclesNatTrans C = { app := fun (S : CategoryTheory.ShortComplex C) => CategoryTheory.ShortComplex.iCycles S, naturality := ⋯ }
Instances For
The natural transformation S.X₁ ⟶ S.cycles
for all short complexes S
.
Equations
- CategoryTheory.ShortComplex.toCyclesNatTrans C = { app := fun (S : CategoryTheory.ShortComplex C) => CategoryTheory.ShortComplex.toCycles S, naturality := ⋯ }
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If φ : S₁ ⟶ S₂
is a morphism of short complexes such that φ.τ₁
is epi, φ.τ₂
is an iso
and φ.τ₃
is mono, then a left homology data for S₁
induces a left homology data for S₂
with
the same K
and H
fields. The inverse construction is ofEpiOfIsIsoOfMono'
.
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If φ : S₁ ⟶ S₂
is a morphism of short complexes such that φ.τ₁
is epi, φ.τ₂
is an iso
and φ.τ₃
is mono, then a left homology data for S₂
induces a left homology data for S₁
with
the same K
and H
fields. The inverse construction is ofEpiOfIsIsoOfMono
.
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- One or more equations did not get rendered due to their size.
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If e : S₁ ≅ S₂
is an isomorphism of short complexes and h₁ : LeftHomologyData S₁
,
this is the left homology data for S₂
deduced from the isomorphism.
Equations
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This left homology map data expresses compatibilities of the left homology data
constructed by LeftHomologyData.ofEpiOfIsIsoOfMono
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This left homology map data expresses compatibilities of the left homology data
constructed by LeftHomologyData.ofEpiOfIsIsoOfMono'
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Equations
- ⋯ = ⋯
If a morphism of short complexes φ : S₁ ⟶ S₂
is such that φ.τ₁
is epi, φ.τ₂
is an iso,
and φ.τ₃
is mono, then the induced morphism on left homology is an isomorphism.
Equations
- ⋯ = ⋯
A morphism k : A ⟶ S.X₂
such that k ≫ S.g = 0
lifts to a morphism A ⟶ S.cycles
.
Equations
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Via S.iCycles : S.cycles ⟶ S.X₂
, the object S.cycles
identifies to the
kernel of S.g : S.X₂ ⟶ S.X₃
.
Equations
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The canonical isomorphism S.cycles ≅ kernel S.g
.
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- One or more equations did not get rendered due to their size.
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The morphism A ⟶ S.leftHomology
obtained from a morphism k : A ⟶ S.X₂
such that k ≫ S.g = 0.
Equations
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Via S.leftHomologyπ : S.cycles ⟶ S.leftHomology
, the object S.leftHomology
identifies
to the cokernel of S.toCycles : S.X₁ ⟶ S.cycles
.
Equations
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The left homology of a short complex S
identifies to the cokernel of the canonical
morphism S.X₁ ⟶ kernel S.g
.
Equations
- CategoryTheory.ShortComplex.leftHomologyIsoCokernelLift = CategoryTheory.ShortComplex.LeftHomologyData.leftHomologyIso (CategoryTheory.ShortComplex.LeftHomologyData.ofHasKernelOfHasCokernel S)
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The following lemmas and instance gives a sufficient condition for a morphism of short complexes to induce an isomorphism on cycles.
Equations
- ⋯ = ⋯