Essential supremum and infimum #
We define the essential supremum and infimum of a function f : α → β
with respect to a measure
μ
on α
. The essential supremum is the infimum of the constants c : β
such that f x ≤ c
almost everywhere.
TODO: The essential supremum of functions α → ℝ≥0∞
is used in particular to define the norm in
the L∞
space (see MeasureTheory/LpSpace.lean).
There is a different quantity which is sometimes also called essential supremum: the least
upper-bound among measurable functions of a family of measurable functions (in an almost-everywhere
sense). We do not define that quantity here, which is simply the supremum of a map with values in
α →ₘ[μ] β
(see MeasureTheory/AEEqFun.lean).
Main definitions #
Essential supremum of f
with respect to measure μ
: the smallest c : β
such that
f x ≤ c
a.e.
Equations
- essSup f μ = Filter.limsup f (MeasureTheory.Measure.ae μ)
Instances For
Essential infimum of f
with respect to measure μ
: the greatest c : β
such that
c ≤ f x
a.e.
Equations
- essInf f μ = Filter.liminf f (MeasureTheory.Measure.ae μ)