(Co)product of a family of filters #
In this file we define two filters on Π i, α i
and prove some basic properties of these filters.
-
Filter.pi (f : Π i, Filter (α i))
to be the maximal filter onΠ i, α i
such that∀ i, Filter.Tendsto (Function.eval i) (Filter.pi f) (f i)
. It is defined asΠ i, Filter.comap (Function.eval i) (f i)
. This is a generalization ofFilter.prod
to indexed products. -
Filter.coprodᵢ (f : Π i, Filter (α i))
: a generalization ofFilter.coprod
; it is the supremum ofcomap (eval i) (f i)
.
The product of an indexed family of filters.
Equations
- Filter.pi f = ⨅ (i : ι), Filter.comap (Function.eval i) (f i)
Instances For
Equations
- ⋯ = ⋯
If a function tends to a product Filter.pi f
of filters, then its i
-th component tends to
f i
. See also Filter.Tendsto.apply_nhds
for the special case of converging to a point in a
product of topological spaces.
Equations
- ⋯ = ⋯
Equations
- ⋯ = ⋯
n
-ary coproducts of filters #
Coproduct of filters.
Equations
- Filter.coprodᵢ f = ⨆ (i : ι), Filter.comap (Function.eval i) (f i)