Sets in subtypes #
This file is about sets in Set A
when A
is a set.
It defines notation ↓∩
for sets in a type pulled down to sets in a subtype, as an inverse
operation to the coercion that lifts sets in a subtype up to sets in the ambient type.
This module also provides lemmas for ↓∩
and this coercion.
Notation #
Let α
be a Type
, A B : Set α
two sets in α
, and C : Set A
a set in the subtype ↑A
.
A ↓∩ B
denotes(Subtype.val ⁻¹' B : Set A)
(that is,{x : ↑A | ↑x ∈ B}
).↑C
denotesSubtype.val '' C
(that is,{x : α | ∃ y ∈ C, ↑y = x}
).
This notation, (together with the ↑
notation for Set.CoeHead
)
is defined in Mathlib.Data.Set.Notation
and is scoped to the Set.Notation
namespace.
To enable it, use open Set.Notation
.
Naming conventions #
Theorem names refer to ↓∩
as preimage_val
.
Tags #
subsets
The following simp lemmas try to transform operations in the subtype into operations in the ambient type, if possible.
Relations between restriction and coercion.