Pi types of modules #
This file defines constructors for linear maps whose domains or codomains are pi types.
It contains theorems relating these to each other, as well as to LinearMap.ker
.
Main definitions #
- pi types in the codomain:
- pi types in the domain:
pi
construction for linear functions. From a family of linear functions it produces a linear
function into a family of modules.
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The projections from a family of modules are linear maps.
Note: known here as LinearMap.proj
, this construction is in other categories called eval
, for
example Pi.evalMonoidHom
, Pi.evalRingHom
.
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- (_ : LinearMap.CompatibleSMul M (ι → N) R S) = (_ : LinearMap.CompatibleSMul M (ι → N) R S)
Linear map between the function spaces I → M₂
and I → M₃
, induced by a linear map f
between M₂
and M₃
.
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The LinearMap
version of AddMonoidHom.single
and Pi.single
.
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The linear equivalence between linear functions on a finite product of modules and families of functions on these modules. See note [bundled maps over different rings].
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This is used as the ext lemma instead of LinearMap.pi_ext
for reasons explained in
note [partially-applied ext lemmas].
If I
and J
are disjoint index sets, the product of the kernels of the J
th projections of
φ
is linearly equivalent to the product over I
.
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diag i j
is the identity map if i = j
. Otherwise it is the constant 0 map.
Equations
- LinearMap.diag i j = Function.update 0 i LinearMap.id j
Instances For
A linear map f
applied to x : ι → R
can be computed using the image under f
of elements
of the canonical basis.
A version of Set.pi
for submodules. Given an index set I
and a family of submodules
p : (i : ι) → Submodule R (φ i)
, pi I s
is the submodule of dependent functions
f : (i : ι) → φ i
such that f i
belongs to p a
whenever i ∈ I
.
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Combine a family of linear equivalences into a linear equivalence of pi
-types.
This is Equiv.piCongrRight
as a LinearEquiv
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Transport dependent functions through an equivalence of the base space.
This is Equiv.piCongrLeft'
as a LinearEquiv
.
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Transporting dependent functions through an equivalence of the base, expressed as a "simplification".
This is Equiv.piCongrLeft
as a LinearEquiv
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- LinearEquiv.piCongrLeft R φ e = LinearEquiv.symm (LinearEquiv.piCongrLeft' R φ e.symm)
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This is Equiv.piOptionEquivProd
as a LinearEquiv
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Linear equivalence between linear functions Rⁿ → M
and Mⁿ
. The spaces Rⁿ
and Mⁿ
are represented as ι → R
and ι → M
, respectively, where ι
is a finite type.
This as an S
-linear equivalence, under the assumption that S
acts on M
commuting with R
.
When R
is commutative, we can take this to be the usual action with S = R
.
Otherwise, S = ℕ
shows that the equivalence is additive.
See note [bundled maps over different rings].
Equations
- LinearEquiv.piRing R M ι S = LinearEquiv.trans (LinearEquiv.symm (LinearMap.lsum R (fun (x : ι) => R) S)) (LinearEquiv.piCongrRight fun (x : ι) => LinearMap.ringLmapEquivSelf R S M)
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Equiv.sumArrowEquivProdArrow
as a linear equivalence.
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Linear equivalence between dependent functions (i : Fin 2) → M i
and M 0 × M 1
.
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Function.extend s f 0
as a bundled linear map.
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Bundled versions of Matrix.vecCons
and Matrix.vecEmpty
#
The idea of these definitions is to be able to define a map as x ↦ ![f₁ x, f₂ x, f₃ x]
, where
f₁ f₂ f₃
are already linear maps, as f₁.vecCons <| f₂.vecCons <| f₃.vecCons <| vecEmpty
.
While the same thing could be achieved using LinearMap.pi ![f₁, f₂, f₃]
, this is not
definitionally equal to the result using LinearMap.vecCons
, as Fin.cases
and function
application do not commute definitionally.
Versions for when f₁ f₂ f₃
are bilinear maps are also provided.
The linear map defeq to Matrix.vecEmpty
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A linear map into Fin n.succ → M₃
can be built out of a map into M₃
and a map into
Fin n → M₃
.
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The empty bilinear map defeq to Matrix.vecEmpty
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A bilinear map into Fin n.succ → M₃
can be built out of a map into M₃
and a map into
Fin n → M₃
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