Thickened indicators #
This file is about thickened indicators of sets in (pseudo e)metric spaces. For a decreasing sequence of thickening radii tending to 0, the thickened indicators of a closed set form a decreasing pointwise converging approximation of the indicator function of the set, where the members of the approximating sequence are nonnegative bounded continuous functions.
Main definitions #
thickenedIndicatorAux δ E
: Theδ
-thickened indicator of a setE
as an unbundledℝ≥0∞
-valued function.thickenedIndicator δ E
: Theδ
-thickened indicator of a setE
as a bundled bounded continuousℝ≥0
-valued function.
Main results #
- For a sequence of thickening radii tending to 0, the
δ
-thickened indicators of a setE
tend pointwise to the indicator ofclosure E
.thickenedIndicatorAux_tendsto_indicator_closure
: The version is for the unbundledℝ≥0∞
-valued functions.thickenedIndicator_tendsto_indicator_closure
: The version is for the bundledℝ≥0
-valued bounded continuous functions.
The δ
-thickened indicator of a set E
is the function that equals 1
on E
and 0
outside a δ
-thickening of E
and interpolates (continuously) between
these values using infEdist _ E
.
thickenedIndicatorAux
is the unbundled ℝ≥0∞
-valued function. See thickenedIndicator
for the (bundled) bounded continuous function with ℝ≥0
-values.
Equations
- thickenedIndicatorAux δ E x = 1 - EMetric.infEdist x E / ENNReal.ofReal δ
Instances For
As the thickening radius δ tends to 0, the δ-thickened indicator of a set E (in α) tends
pointwise (i.e., w.r.t. the product topology on α → ℝ≥0∞
) to the indicator function of the
closure of E.
This statement is for the unbundled ℝ≥0∞
-valued functions thickenedIndicatorAux δ E
, see
thickenedIndicator_tendsto_indicator_closure
for the version for bundled ℝ≥0
-valued
bounded continuous functions.
The δ
-thickened indicator of a set E
is the function that equals 1
on E
and 0
outside a δ
-thickening of E
and interpolates (continuously) between
these values using infEdist _ E
.
thickenedIndicator
is the (bundled) bounded continuous function with ℝ≥0
-values.
See thickenedIndicatorAux
for the unbundled ℝ≥0∞
-valued function.
Equations
- thickenedIndicator δ_pos E = { toContinuousMap := { toFun := fun (x : α) => (thickenedIndicatorAux δ E x).toNNReal, continuous_toFun := ⋯ }, map_bounded' := ⋯ }
Instances For
As the thickening radius δ tends to 0, the δ-thickened indicator of a set E (in α) tends pointwise to the indicator function of the closure of E.
Note: This version is for the bundled bounded continuous functions, but the topology is not
the topology on α →ᵇ ℝ≥0
. Coercions to functions α → ℝ≥0
are done first, so the topology
instance is the product topology (the topology of pointwise convergence).
Pointwise, the indicators of δ-thickenings of a set eventually coincide with the indicator of the set as δ>0 tends to zero.
Pointwise, the multiplicative indicators of δ-thickenings of a set eventually coincide with the multiplicative indicator of the set as δ>0 tends to zero.
Pointwise, the indicators of closed δ-thickenings of a set eventually coincide with the indicator of the set as δ tends to zero.
Pointwise, the multiplicative indicators of closed δ-thickenings of a set eventually coincide with the multiplicative indicator of the set as δ tends to zero.
The indicators of δ-thickenings of a set tend pointwise to the indicator of the set, as δ>0 tends to zero.
The multiplicative indicators of δ-thickenings of a set tend pointwise to the multiplicative indicator of the set, as δ>0 tends to zero.
The indicators of closed δ-thickenings of a set tend pointwise to the indicator of the set, as δ tends to zero.
The multiplicative indicators of closed δ-thickenings of a set tend pointwise to the multiplicative indicator of the set, as δ tends to zero.