L^2
space #
If E
is an inner product space over 𝕜
(ℝ
or ℂ
), then Lp E 2 μ
(defined in lp_space.lean
)
is also an inner product space, with inner product defined as inner f g = ∫ a, ⟪f a, g a⟫ ∂μ
.
Main results #
mem_L1_inner
: forf
andg
inLp E 2 μ
, the pointwise inner productfun x ↦ ⟪f x, g x⟫
belongs toLp 𝕜 1 μ
.integrable_inner
: forf
andg
inLp E 2 μ
, the pointwise inner productfun x ↦ ⟪f x, g x⟫
is integrable.L2.inner_product_space
:Lp E 2 μ
is an inner product space.
Equations
- One or more equations did not get rendered due to their size.
Equations
- MeasureTheory.L2.innerProductSpace = InnerProductSpace.mk ⋯ ⋯ ⋯ ⋯
The inner product in L2
of the indicator of a set indicatorConstLp 2 hs hμs c
and f
is
equal to the integral of the inner product over s
: ∫ x in s, ⟪c, f x⟫ ∂μ
.
The inner product in L2
of the indicator of a set indicatorConstLp 2 hs hμs c
and f
is
equal to the inner product of the constant c
and the integral of f
over s
.
The inner product in L2
of the indicator of a set indicatorConstLp 2 hs hμs (1 : 𝕜)
and
a real or complex function f
is equal to the integral of f
over s
.
For bounded continuous functions f
, g
on a finite-measure topological space α
, the L^2
inner product is the integral of their pointwise inner product.
For continuous functions f
, g
on a compact, finite-measure topological space α
, the L^2
inner product is the integral of their pointwise inner product.