Pointwise operations of sets #
This file defines pointwise algebraic operations on sets.
Main declarations #
For sets s
and t
and scalar a
:
s * t
: Multiplication, set of allx * y
wherex ∈ s
andy ∈ t
.s + t
: Addition, set of allx + y
wherex ∈ s
andy ∈ t
.s⁻¹
: Inversion, set of allx⁻¹
wherex ∈ s
.-s
: Negation, set of all-x
wherex ∈ s
.s / t
: Division, set of allx / y
wherex ∈ s
andy ∈ t
.s - t
: Subtraction, set of allx - y
wherex ∈ s
andy ∈ t
.s • t
: Scalar multiplication, set of allx • y
wherex ∈ s
andy ∈ t
.s +ᵥ t
: Scalar addition, set of allx +ᵥ y
wherex ∈ s
andy ∈ t
.s -ᵥ t
: Scalar subtraction, set of allx -ᵥ y
wherex ∈ s
andy ∈ t
.a • s
: Scaling, set of alla • x
wherex ∈ s
.a +ᵥ s
: Translation, set of alla +ᵥ x
wherex ∈ s
.
For α
a semigroup/monoid, Set α
is a semigroup/monoid.
As an unfortunate side effect, this means that n • s
, where n : ℕ
, is ambiguous between
pointwise scaling and repeated pointwise addition; the former has (2 : ℕ) • {1, 2} = {2, 4}
, while
the latter has (2 : ℕ) • {1, 2} = {2, 3, 4}
. See note [pointwise nat action].
Appropriate definitions and results are also transported to the additive theory via to_additive
.
Implementation notes #
- The following expressions are considered in simp-normal form in a group:
(fun h ↦ h * g) ⁻¹' s
,(fun h ↦ g * h) ⁻¹' s
,(fun h ↦ h * g⁻¹) ⁻¹' s
,(fun h ↦ g⁻¹ * h) ⁻¹' s
,s * t
,s⁻¹
,(1 : Set _)
(and similarly for additive variants). Expressions equal to one of these will be simplified. - We put all instances in the locale
Pointwise
, so that these instances are not available by default. Note that we do not mark them as reducible (as argued by note [reducible non-instances]) since we expect the locale to be open whenever the instances are actually used (and making the instances reducible changes the behavior ofsimp
.
Tags #
set multiplication, set addition, pointwise addition, pointwise multiplication, pointwise subtraction
0
/1
as sets #
Set negation/inversion #
The pointwise inversion of set s⁻¹
is defined as {x | x⁻¹ ∈ s}
in locale Pointwise
. It is
equal to {x⁻¹ | x ∈ s}
, see Set.image_inv_eq_inv
.
Equations
- Set.inv = { inv := Set.preimage Inv.inv }
Instances For
The pointwise negation of set -s
is defined as {x | -x ∈ s}
in locale Pointwise
.
It is equal to {-x | x ∈ s}
, see Set.image_neg_eq_neg
.
Equations
- Set.neg = { neg := Set.preimage Neg.neg }
Instances For
Equations
- Set.involutiveInv = InvolutiveInv.mk ⋯
Equations
- Set.involutiveNeg = InvolutiveNeg.mk ⋯
Set addition/multiplication #
Set subtraction/division #
Translation/scaling of sets #
Repeated pointwise multiplication/division (not the same as pointwise repeated
multiplication/division!) of a Set
. See note [pointwise nat action].
Instances For
Set α
is a Semigroup
under pointwise operations if α
is.
Equations
- Set.semigroup = Semigroup.mk ⋯
Instances For
Set α
is an AddSemigroup
under pointwise operations if α
is.
Equations
- Set.addSemigroup = AddSemigroup.mk ⋯
Instances For
Set α
is a CommSemigroup
under pointwise operations if α
is.
Equations
- Set.commSemigroup = CommSemigroup.mk ⋯
Instances For
Set α
is an AddCommSemigroup
under pointwise operations if α
is.
Equations
- Set.addCommSemigroup = AddCommSemigroup.mk ⋯
Instances For
Set α
is a MulOneClass
under pointwise operations if α
is.
Equations
- Set.mulOneClass = MulOneClass.mk ⋯ ⋯
Instances For
Set α
is an AddZeroClass
under pointwise operations if α
is.
Equations
- Set.addZeroClass = AddZeroClass.mk ⋯ ⋯
Instances For
The singleton operation as an AddMonoidHom
.
Equations
- Set.singletonAddMonoidHom = { toFun := Set.singletonAddHom.toFun, map_zero' := ⋯, map_add' := ⋯ }
Instances For
Set α
is an AddMonoid
under pointwise operations if α
is.
Equations
- Set.addMonoid = AddMonoid.mk ⋯ ⋯ nsmulRecAuto ⋯ ⋯
Instances For
Set α
is a CommMonoid
under pointwise operations if α
is.
Equations
- Set.commMonoid = CommMonoid.mk ⋯
Instances For
Set α
is an AddCommMonoid
under pointwise operations if α
is.
Equations
- Set.addCommMonoid = AddCommMonoid.mk ⋯
Instances For
Set α
is a division monoid under pointwise operations if α
is.
Equations
- Set.divisionMonoid = DivisionMonoid.mk ⋯ ⋯ ⋯
Instances For
Set α
is a subtraction monoid under pointwise operations if α
is.
Equations
- Set.subtractionMonoid = SubtractionMonoid.mk ⋯ ⋯ ⋯
Instances For
Set α
is a commutative division monoid under pointwise operations if α
is.
Equations
- Set.divisionCommMonoid = DivisionCommMonoid.mk ⋯
Instances For
Set α
is a commutative subtraction monoid under pointwise operations if α
is.
Equations
- Set.subtractionCommMonoid = SubtractionCommMonoid.mk ⋯
Instances For
Alias of the reverse direction of Set.not_one_mem_div_iff
.