Basic properties of Haar measures on real vector spaces #
Equations
- ⋯ = ⋯
Equations
- ⋯ = ⋯
The integral of f (R • x)
with respect to an additive Haar measure is a multiple of the
integral of f
. The formula we give works even when f
is not integrable or R = 0
thanks to the convention that a non-integrable function has integral zero.
The integral of f (R • x)
with respect to an additive Haar measure is a multiple of the
integral of f
. The formula we give works even when f
is not integrable or R = 0
thanks to the convention that a non-integrable function has integral zero.
The integral of f (R⁻¹ • x)
with respect to an additive Haar measure is a multiple of the
integral of f
. The formula we give works even when f
is not integrable or R = 0
thanks to the convention that a non-integrable function has integral zero.
The integral of f (R⁻¹ • x)
with respect to an additive Haar measure is a multiple of the
integral of f
. The formula we give works even when f
is not integrable or R = 0
thanks to the convention that a non-integrable function has integral zero.
Alias of MeasureTheory.Measure.setIntegral_comp_smul_of_pos
.