Type of functions with finite support #
For any type α
and any type M
with zero, we define the type Finsupp α M
(notation: α →₀ M
)
of finitely supported functions from α
to M
, i.e. the functions which are zero everywhere
on α
except on a finite set.
Functions with finite support are used (at least) in the following parts of the library:
MonoidAlgebra R M
andAddMonoidAlgebra R M
are defined asM →₀ R
;polynomials and multivariate polynomials are defined as
AddMonoidAlgebra
s, hence they useFinsupp
under the hood;the linear combination of a family of vectors
v i
with coefficientsf i
(as used, e.g., to define linearly independent familyLinearIndependent
) is defined as a mapFinsupp.linearCombination : (ι → M) → (ι →₀ R) →ₗ[R] M
.
Some other constructions are naturally equivalent to α →₀ M
with some α
and M
but are defined
in a different way in the library:
Multiset α ≃+ α →₀ ℕ
;FreeAbelianGroup α ≃+ α →₀ ℤ
.
Most of the theory assumes that the range is a commutative additive monoid. This gives us the big
sum operator as a powerful way to construct Finsupp
elements, which is defined in
Algebra/BigOperators/Finsupp
.
-- Porting note: the semireducibility remark no longer applies in Lean 4, afaict.
Many constructions based on α →₀ M
use semireducible
type tags to avoid reusing unwanted type
instances. E.g., MonoidAlgebra
, AddMonoidAlgebra
, and types based on these two have
non-pointwise multiplication.
Main declarations #
Finsupp
: The type of finitely supported functions fromα
toβ
.Finsupp.single
: TheFinsupp
which is nonzero in exactly one point.Finsupp.update
: Changes one value of aFinsupp
.Finsupp.erase
: Replaces one value of aFinsupp
by0
.Finsupp.onFinset
: The restriction of a function to aFinset
as aFinsupp
.Finsupp.mapRange
: Composition of aZeroHom
with aFinsupp
.Finsupp.embDomain
: Maps the domain of aFinsupp
by an embedding.Finsupp.zipWith
: Postcomposition of twoFinsupp
s with a functionf
such thatf 0 0 = 0
.
Notations #
This file adds α →₀ M
as a global notation for Finsupp α M
.
We also use the following convention for Type*
variables in this file
α
,β
,γ
: types with no additional structure that appear as the first argument toFinsupp
somewhere in the statement;ι
: an auxiliary index type;M
,M'
,N
,P
: types withZero
or(Add)(Comm)Monoid
structure;M
is also used for a (semi)module over a (semi)ring.G
,H
: groups (commutative or not, multiplicative or additive);R
,S
: (semi)rings.
Implementation notes #
This file is a noncomputable theory
and uses classical logic throughout.
TODO #
- Expand the list of definitions and important lemmas to the module docstring.
Finsupp α M
, denoted α →₀ M
, is the type of functions f : α → M
such that
f x = 0
for all but finitely many x
.
- support : Finset α
The support of a finitely supported function (aka
Finsupp
). - toFun : α → M
The underlying function of a bundled finitely supported function (aka
Finsupp
). The witness that the support of a
Finsupp
is indeed the exact locus where its underlying function is nonzero.
Instances For
Finsupp α M
, denoted α →₀ M
, is the type of functions f : α → M
such that
f x = 0
for all but finitely many x
.
Equations
- «term_→₀_» = Lean.ParserDescr.trailingNode `term_→₀_ 25 26 (Lean.ParserDescr.binary `andthen (Lean.ParserDescr.symbol " →₀ ") (Lean.ParserDescr.cat `term 25))
Instances For
Equations
- f.instDecidableEq g = decidable_of_iff (f.support = g.support ∧ ∀ a ∈ f.support, f a = g a) ⋯
Given Finite α
, equivFunOnFinite
is the Equiv
between α →₀ β
and α → β
.
(All functions on a finite type are finitely supported.)
Equations
- Finsupp.equivFunOnFinite = { toFun := DFunLike.coe, invFun := fun (f : α → M) => { support := ⋯.toFinset, toFun := f, mem_support_toFun := ⋯ }, left_inv := ⋯, right_inv := ⋯ }
Instances For
If α
has a unique term, the type of finitely supported functions α →₀ β
is equivalent to β
.
Equations
- Equiv.finsuppUnique = Finsupp.equivFunOnFinite.trans (Equiv.funUnique ι M)
Instances For
Finsupp.single a b
is injective in b
. For the statement that it is injective in a
, see
Finsupp.single_left_injective
Finsupp.single a b
is injective in a
. For the statement that it is injective in b
, see
Finsupp.single_injective
Equations
- ⋯ = ⋯
Replace the value of a α →₀ M
at a given point a : α
by a given value b : M
.
If b = 0
, this amounts to removing a
from the Finsupp.support
.
Otherwise, if a
was not in the Finsupp.support
, it is added to it.
This is the finitely-supported version of Function.update
.
Equations
- f.update a b = { support := if b = 0 then f.support.erase a else insert a f.support, toFun := Function.update (⇑f) a b, mem_support_toFun := ⋯ }
Instances For
erase a f
is the finitely supported function equal to f
except at a
where it is equal to 0
.
If a
is not in the support of f
then erase a f = f
.
Equations
- Finsupp.erase a f = { support := f.support.erase a, toFun := fun (a' : α) => if a' = a then 0 else f a', mem_support_toFun := ⋯ }
Instances For
Finsupp.onFinset s f hf
is the finsupp function representing f
restricted to the finset s
.
The function must be 0
outside of s
. Use this when the set needs to be filtered anyways,
otherwise a better set representation is often available.
Equations
- Finsupp.onFinset s f hf = { support := Finset.filter (fun (x : α) => f x ≠ 0) s, toFun := f, mem_support_toFun := ⋯ }
Instances For
The natural Finsupp
induced by the function f
given that it has finite support.
Equations
- Finsupp.ofSupportFinite f hf = { support := hf.toFinset, toFun := f, mem_support_toFun := ⋯ }
Instances For
Equations
- ⋯ = ⋯
The composition of f : M → N
and g : α →₀ M
is mapRange f hf g : α →₀ N
,
which is well-defined when f 0 = 0
.
This preserves the structure on f
, and exists in various bundled forms for when f
is itself
bundled (defined in Data/Finsupp/Basic
):
Finsupp.mapRange.equiv
Finsupp.mapRange.zeroHom
Finsupp.mapRange.addMonoidHom
Finsupp.mapRange.addEquiv
Finsupp.mapRange.linearMap
Finsupp.mapRange.linearEquiv
Equations
- Finsupp.mapRange f hf g = Finsupp.onFinset g.support (f ∘ ⇑g) ⋯
Instances For
Given f : α ↪ β
and v : α →₀ M
, Finsupp.embDomain f v : β →₀ M
is the finitely supported function whose value at f a : β
is v a
.
For a b : β
outside the range of f
, it is zero.
Equations
- One or more equations did not get rendered due to their size.
Instances For
Given finitely supported functions g₁ : α →₀ M
and g₂ : α →₀ N
and function f : M → N → P
,
Finsupp.zipWith f hf g₁ g₂
is the finitely supported function α →₀ P
satisfying
zipWith f hf g₁ g₂ a = f (g₁ a) (g₂ a)
, which is well-defined when f 0 0 = 0
.
Equations
- Finsupp.zipWith f hf g₁ g₂ = Finsupp.onFinset (g₁.support ∪ g₂.support) (fun (a : α) => f (g₁ a) (g₂ a)) ⋯
Instances For
Additive monoid structure on α →₀ M
#
Equations
- Finsupp.instAdd = { add := Finsupp.zipWith (fun (x1 x2 : M) => x1 + x2) ⋯ }
Equations
- Finsupp.instAddZeroClass = Function.Injective.addZeroClass (fun (f : α →₀ M) => ⇑f) ⋯ ⋯ ⋯
Equations
- ⋯ = ⋯
When ι is finite and M is an AddMonoid, then Finsupp.equivFunOnFinite gives an AddEquiv
Equations
- Finsupp.addEquivFunOnFinite = { toEquiv := Finsupp.equivFunOnFinite, map_add' := ⋯ }
Instances For
AddEquiv between (ι →₀ M) and M, when ι has a unique element
Equations
- AddEquiv.finsuppUnique = { toEquiv := Equiv.finsuppUnique, map_add' := ⋯ }
Instances For
Equations
- ⋯ = ⋯
Equations
- ⋯ = ⋯
Finsupp.single
as an AddMonoidHom
.
See Finsupp.lsingle
in LinearAlgebra/Finsupp
for the stronger version as a linear map.
Equations
- Finsupp.singleAddHom a = { toFun := Finsupp.single a, map_zero' := ⋯, map_add' := ⋯ }
Instances For
Evaluation of a function f : α →₀ M
at a point as an additive monoid homomorphism.
See Finsupp.lapply
in LinearAlgebra/Finsupp
for the stronger version as a linear map.
Equations
- Finsupp.applyAddHom a = { toFun := fun (g : α →₀ M) => g a, map_zero' := ⋯, map_add' := ⋯ }
Instances For
Coercion from a Finsupp
to a function type is an AddMonoidHom
.
Equations
- Finsupp.coeFnAddHom = { toFun := DFunLike.coe, map_zero' := ⋯, map_add' := ⋯ }
Instances For
Finsupp.erase
as an AddMonoidHom
.
Equations
- Finsupp.eraseAddHom a = { toFun := Finsupp.erase a, map_zero' := ⋯, map_add' := ⋯ }
Instances For
If two additive homomorphisms from α →₀ M
are equal on each single a b
,
then they are equal.
If two additive homomorphisms from α →₀ M
are equal on each single a b
,
then they are equal.
We formulate this using equality of AddMonoidHom
s so that ext
tactic can apply a type-specific
extensionality lemma after this one. E.g., if the fiber M
is ℕ
or ℤ
, then it suffices to
verify f (single a 1) = g (single a 1)
.
Bundle Finsupp.embDomain f
as an additive map from α →₀ M
to β →₀ M
.
Equations
- Finsupp.embDomain.addMonoidHom f = { toFun := fun (v : α →₀ M) => Finsupp.embDomain f v, map_zero' := ⋯, map_add' := ⋯ }
Instances For
Equations
- Finsupp.instAddMonoid = Function.Injective.addMonoid (fun (f : α →₀ M) => ⇑f) ⋯ ⋯ ⋯ ⋯
Equations
- Finsupp.instAddCommMonoid = AddCommMonoid.mk ⋯
Equations
- Finsupp.instNeg = { neg := Finsupp.mapRange Neg.neg ⋯ }
Equations
- Finsupp.instSub = { sub := Finsupp.zipWith Sub.sub ⋯ }
Equations
- Finsupp.instAddGroup = AddGroup.mk ⋯
Equations
- Finsupp.instAddCommGroup = AddCommGroup.mk ⋯