Topological lattices #
In this file we define mixin classes ContinuousInf
and ContinuousSup
. We define the
class TopologicalLattice
as a topological space and lattice L
extending ContinuousInf
and
ContinuousSup
.
References #
- [Gierz et al, A Compendium of Continuous Lattices][GierzEtAl1980]
Tags #
topological, lattice
Let L
be a topological space and let L×L
be equipped with the product topology and let
⊓:L×L → L
be an infimum. Then L
is said to have (jointly) continuous infimum if the map
⊓:L×L → L
is continuous.
- continuous_inf : Continuous fun (p : L × L) => p.1 ⊓ p.2
The infimum is continuous
Instances
Let L
be a topological space and let L×L
be equipped with the product topology and let
⊓:L×L → L
be a supremum. Then L
is said to have (jointly) continuous supremum if the map
⊓:L×L → L
is continuous.
- continuous_sup : Continuous fun (p : L × L) => p.1 ⊔ p.2
The supremum is continuous
Instances
Equations
- ⋯ = ⋯
Equations
- ⋯ = ⋯
Let L
be a lattice equipped with a topology such that L
has continuous infimum and supremum.
Then L
is said to be a topological lattice.
- continuous_inf : Continuous fun (p : L × L) => p.1 ⊓ p.2
- continuous_sup : Continuous fun (p : L × L) => p.1 ⊔ p.2
Instances
Equations
- ⋯ = ⋯
Equations
- ⋯ = ⋯