Concept in calculus of variation
In the calculus of variations , a field of mathematical analysis , the functional derivative (or variational derivative )[1] functional (a functional in this sense is a function that acts on functions) to a change in a function on which the functional depends.
In the calculus of variations, functionals are usually expressed in terms of an integral of functions, their arguments , and their derivatives . In an integrand L f δf δf δf
For example, consider the functional
J
[
f
]
=
∫
a
b
L
(
x
,
f
(
x
)
,
f
′
(
x
)
)
d
x
,
{\displaystyle J[f]=\int _{a}^{b}L(\,x,f(x),f\,'(x)\,)\,dx\ ,}
where
f ′(x ) ≡ df/dx . If
f is varied by adding to it a function
δf , and the resulting integrand
L (x, f +δf, f '+δf ′) is expanded in powers of
δf , then the change in the value of
J to first order in
δf can be expressed as follows:
[1] [Note 1]
δ
J
=
∫
a
b
(
∂
L
∂
f
δ
f
(
x
)
+
∂
L
∂
f
′
d
d
x
δ
f
(
x
)
)
d
x
=
∫
a
b
(
∂
L
∂
f
−
d
d
x
∂
L
∂
f
′
)
δ
f
(
x
)
d
x
+
∂
L
∂
f
′
(
b
)
δ
f
(
b
)
−
∂
L
∂
f
′
(
a
)
δ
f
(
a
)
{\displaystyle \delta J=\int _{a}^{b}\left({\frac {\partial L}{\partial f}}\delta f(x)+{\frac {\partial L}{\partial f'}}{\frac {d}{dx}}\delta f(x)\right)\,dx\,=\int _{a}^{b}\left({\frac {\partial L}{\partial f}}-{\frac {d}{dx}}{\frac {\partial L}{\partial f'}}\right)\delta f(x)\,dx\,+\,{\frac {\partial L}{\partial f'}}(b)\delta f(b)\,-\,{\frac {\partial L}{\partial f'}}(a)\delta f(a)\,}
where the variation in the derivative,
δf ′ was rewritten as the derivative of the variation
(δf ) ′ , and
integration by parts was used in these derivatives.
Definition [ edit ] In this section, the functional differential (or variation or first variation)[Note 2]
Functional differential [ edit ] Suppose
B
{\displaystyle B}
Banach space and
F
{\displaystyle F}
functional defined on
B
{\displaystyle B}
F
{\displaystyle F}
ρ
∈
B
{\displaystyle \rho \in B}
linear functional
δ
F
[
ρ
,
⋅
]
{\displaystyle \delta F[\rho ,\cdot ]}
B
{\displaystyle B}
[2]
ϕ
∈
B
{\displaystyle \phi \in B}
F
[
ρ
+
ϕ
]
−
F
[
ρ
]
=
δ
F
[
ρ
;
ϕ
]
+
ϵ
⋅
‖
ϕ
‖
{\displaystyle F[\rho +\phi ]-F[\rho ]=\delta F[\rho ;\phi ]+\epsilon \cdot \|\phi \|}
where
ϵ
{\displaystyle \epsilon }
is a real number that depends on
‖
ϕ
‖
{\displaystyle \|\phi \|}
in such a way that
ϵ
→
0
{\displaystyle \epsilon \to 0}
as
‖
ϕ
‖
→
0
{\displaystyle \|\phi \|\to 0}
. This means that
δ
F
[
ρ
,
⋅
]
{\displaystyle \delta F[\rho ,\cdot ]}
is the
Fréchet derivative of
F
{\displaystyle F}
at
ρ
{\displaystyle \rho }
.
However, this notion of functional differential is so strong it may not exist,[3] Gateaux derivative is preferred. In many practical cases, the functional differential is defined[4]
δ
F
[
ρ
,
ϕ
]
=
lim
ε
→
0
F
[
ρ
+
ε
ϕ
]
−
F
[
ρ
]
ε
=
[
d
d
ε
F
[
ρ
+
ε
ϕ
]
]
ε
=
0
.
{\displaystyle {\begin{aligned}\delta F[\rho ,\phi ]&=\lim _{\varepsilon \to 0}{\frac {F[\rho +\varepsilon \phi ]-F[\rho ]}{\varepsilon }}\\&=\left[{\frac {d}{d\varepsilon }}F[\rho +\varepsilon \phi ]\right]_{\varepsilon =0}.\end{aligned}}}
Note that this notion of the functional differential can even be defined without a norm.
Functional derivative [ edit ] In many applications, the domain of the functional
F
{\displaystyle F}
ρ
{\displaystyle \rho }
Ω
{\displaystyle \Omega }
F
{\displaystyle F}
F
[
ρ
]
=
∫
Ω
L
(
x
,
ρ
(
x
)
,
D
ρ
(
x
)
)
d
x
{\displaystyle F[\rho ]=\int _{\Omega }L(x,\rho (x),D\rho (x))\,dx}
for some function
L
(
x
,
ρ
(
x
)
,
D
ρ
(
x
)
)
{\displaystyle L(x,\rho (x),D\rho (x))}
that may depend on
x
{\displaystyle x}
, the value
ρ
(
x
)
{\displaystyle \rho (x)}
and the derivative
D
ρ
(
x
)
{\displaystyle D\rho (x)}
.
If this is the case and, moreover,
δ
F
[
ρ
,
ϕ
]
{\displaystyle \delta F[\rho ,\phi ]}
can be written as the integral of
ϕ
{\displaystyle \phi }
times another function (denoted
δF /δρ )
δ
F
[
ρ
,
ϕ
]
=
∫
Ω
δ
F
δ
ρ
(
x
)
ϕ
(
x
)
d
x
{\displaystyle \delta F[\rho ,\phi ]=\int _{\Omega }{\frac {\delta F}{\delta \rho }}(x)\ \phi (x)\ dx}
then this function
δF /δρ is called the
functional derivative of
F at
ρ .
[5] [6] If
F
{\displaystyle F}
is restricted to only certain functions
ρ
{\displaystyle \rho }
(for example, if there are some boundary conditions imposed) then
ϕ
{\displaystyle \phi }
is restricted to functions such that
ρ
+
ϵ
ϕ
{\displaystyle \rho +\epsilon \phi }
continues to satisfy these conditions.
Heuristically,
ϕ
{\displaystyle \phi }
ρ
{\displaystyle \rho }
ϕ
=
δ
ρ
{\displaystyle \phi =\delta \rho }
total differential of a function
F
(
ρ
1
,
ρ
2
,
…
,
ρ
n
)
{\displaystyle F(\rho _{1},\rho _{2},\dots ,\rho _{n})}
d
F
=
∑
i
=
1
n
∂
F
∂
ρ
i
d
ρ
i
,
{\displaystyle dF=\sum _{i=1}^{n}{\frac {\partial F}{\partial \rho _{i}}}\ d\rho _{i},}
where
ρ
1
,
ρ
2
,
…
,
ρ
n
{\displaystyle \rho _{1},\rho _{2},\dots ,\rho _{n}}
are independent variables.
Comparing the last two equations, the functional derivative
δ
F
/
δ
ρ
(
x
)
{\displaystyle \delta F/\delta \rho (x)}
has a role similar to that of the partial derivative
∂
F
/
∂
ρ
i
{\displaystyle \partial F/\partial \rho _{i}}
, where the variable of integration
x
{\displaystyle x}
is like a continuous version of the summation index
i
{\displaystyle i}
.
[7] One thinks of
δF /δρ as the gradient of
F at the point
ρ , so the value
δF /δρ(x) measures how much the functional
F will change if the function
ρ is changed at the point
x . Hence the formula
∫
δ
F
δ
ρ
(
x
)
ϕ
(
x
)
d
x
{\displaystyle \int {\frac {\delta F}{\delta \rho }}(x)\phi (x)\;dx}
is regarded as the directional derivative at point
ρ
{\displaystyle \rho }
in the direction of
ϕ
{\displaystyle \phi }
. This is analogous to vector calculus, where the inner product of a vector
v
{\displaystyle v}
with the gradient gives the directional derivative in the direction of
v
{\displaystyle v}
.
Properties [ edit ] Like the derivative of a function, the functional derivative satisfies the following properties, where F [ρ ]G [ρ ][Note 3]
Linearity:[8]
δ
(
λ
F
+
μ
G
)
[
ρ
]
δ
ρ
(
x
)
=
λ
δ
F
[
ρ
]
δ
ρ
(
x
)
+
μ
δ
G
[
ρ
]
δ
ρ
(
x
)
,
{\displaystyle {\frac {\delta (\lambda F+\mu G)[\rho ]}{\delta \rho (x)}}=\lambda {\frac {\delta F[\rho ]}{\delta \rho (x)}}+\mu {\frac {\delta G[\rho ]}{\delta \rho (x)}},}
λ , μ
Product rule:[9]
δ
(
F
G
)
[
ρ
]
δ
ρ
(
x
)
=
δ
F
[
ρ
]
δ
ρ
(
x
)
G
[
ρ
]
+
F
[
ρ
]
δ
G
[
ρ
]
δ
ρ
(
x
)
,
{\displaystyle {\frac {\delta (FG)[\rho ]}{\delta \rho (x)}}={\frac {\delta F[\rho ]}{\delta \rho (x)}}G[\rho ]+F[\rho ]{\frac {\delta G[\rho ]}{\delta \rho (x)}}\,,}
Chain rules:
If F G [10]
δ
F
[
G
[
ρ
]
]
δ
ρ
(
y
)
=
∫
d
x
δ
F
[
G
]
δ
G
(
x
)
G
=
G
[
ρ
]
⋅
δ
G
[
ρ
]
(
x
)
δ
ρ
(
y
)
.
{\displaystyle {\frac {\delta F[G[\rho ]]}{\delta \rho (y)}}=\int dx{\frac {\delta F[G]}{\delta G(x)}}_{G=G[\rho ]}\cdot {\frac {\delta G[\rho ](x)}{\delta \rho (y)}}\ .}
If G g [11]
δ
F
[
g
(
ρ
)
]
δ
ρ
(
y
)
=
δ
F
[
g
(
ρ
)
]
δ
g
[
ρ
(
y
)
]
d
g
(
ρ
)
d
ρ
(
y
)
.
{\displaystyle {\frac {\delta F[g(\rho )]}{\delta \rho (y)}}={\frac {\delta F[g(\rho )]}{\delta g[\rho (y)]}}\ {\frac {dg(\rho )}{d\rho (y)}}\ .}
Determining functional derivatives [ edit ] A formula to determine functional derivatives for a common class of functionals can be written as the integral of a function and its derivatives. This is a generalization of the Euler–Lagrange equation : indeed, the functional derivative was introduced in physics within the derivation of the Lagrange equation of the second kind from the principle of least action in Lagrangian mechanics (18th century). The first three examples below are taken from density functional theory (20th century), the fourth from statistical mechanics (19th century).
Formula [ edit ] Given a functional
F
[
ρ
]
=
∫
f
(
r
,
ρ
(
r
)
,
∇
ρ
(
r
)
)
d
r
,
{\displaystyle F[\rho ]=\int f({\boldsymbol {r}},\rho ({\boldsymbol {r}}),\nabla \rho ({\boldsymbol {r}}))\,d{\boldsymbol {r}},}
and a function
ϕ
(
r
)
{\displaystyle \phi ({\boldsymbol {r}})}
that vanishes on the boundary of the region of integration, from a previous section
Definition ,
∫
δ
F
δ
ρ
(
r
)
ϕ
(
r
)
d
r
=
[
d
d
ε
∫
f
(
r
,
ρ
+
ε
ϕ
,
∇
ρ
+
ε
∇
ϕ
)
d
r
]
ε
=
0
=
∫
(
∂
f
∂
ρ
ϕ
+
∂
f
∂
∇
ρ
⋅
∇
ϕ
)
d
r
=
∫
[
∂
f
∂
ρ
ϕ
+
∇
⋅
(
∂
f
∂
∇
ρ
ϕ
)
−
(
∇
⋅
∂
f
∂
∇
ρ
)
ϕ
]
d
r
=
∫
[
∂
f
∂
ρ
ϕ
−
(
∇
⋅
∂
f
∂
∇
ρ
)
ϕ
]
d
r
=
∫
(
∂
f
∂
ρ
−
∇
⋅
∂
f
∂
∇
ρ
)
ϕ
(
r
)
d
r
.
{\displaystyle {\begin{aligned}\int {\frac {\delta F}{\delta \rho ({\boldsymbol {r}})}}\,\phi ({\boldsymbol {r}})\,d{\boldsymbol {r}}&=\left[{\frac {d}{d\varepsilon }}\int f({\boldsymbol {r}},\rho +\varepsilon \phi ,\nabla \rho +\varepsilon \nabla \phi )\,d{\boldsymbol {r}}\right]_{\varepsilon =0}\\&=\int \left({\frac {\partial f}{\partial \rho }}\,\phi +{\frac {\partial f}{\partial \nabla \rho }}\cdot \nabla \phi \right)d{\boldsymbol {r}}\\&=\int \left[{\frac {\partial f}{\partial \rho }}\,\phi +\nabla \cdot \left({\frac {\partial f}{\partial \nabla \rho }}\,\phi \right)-\left(\nabla \cdot {\frac {\partial f}{\partial \nabla \rho }}\right)\phi \right]d{\boldsymbol {r}}\\&=\int \left[{\frac {\partial f}{\partial \rho }}\,\phi -\left(\nabla \cdot {\frac {\partial f}{\partial \nabla \rho }}\right)\phi \right]d{\boldsymbol {r}}\\&=\int \left({\frac {\partial f}{\partial \rho }}-\nabla \cdot {\frac {\partial f}{\partial \nabla \rho }}\right)\phi ({\boldsymbol {r}})\ d{\boldsymbol {r}}\,.\end{aligned}}}
The second line is obtained using the total derivative , where ∂f /∂∇'ρ is a derivative of a scalar with respect to a vector .[Note 4]
The third line was obtained by use of a product rule for divergence . The fourth line was obtained using the divergence theorem and the condition that
ϕ
=
0
{\displaystyle \phi =0}
ϕ
{\displaystyle \phi }
fundamental lemma of calculus of variations to the last line, the functional derivative is
δ
F
δ
ρ
(
r
)
=
∂
f
∂
ρ
−
∇
⋅
∂
f
∂
∇
ρ
{\displaystyle {\frac {\delta F}{\delta \rho ({\boldsymbol {r}})}}={\frac {\partial f}{\partial \rho }}-\nabla \cdot {\frac {\partial f}{\partial \nabla \rho }}}
where ρ = ρ (r f = f (r ρ , ∇ρ )F [ρ ]Coulomb potential energy functional .)
The above equation for the functional derivative can be generalized to the case that includes higher dimensions and higher order derivatives. The functional would be,
F
[
ρ
(
r
)
]
=
∫
f
(
r
,
ρ
(
r
)
,
∇
ρ
(
r
)
,
∇
(
2
)
ρ
(
r
)
,
…
,
∇
(
N
)
ρ
(
r
)
)
d
r
,
{\displaystyle F[\rho ({\boldsymbol {r}})]=\int f({\boldsymbol {r}},\rho ({\boldsymbol {r}}),\nabla \rho ({\boldsymbol {r}}),\nabla ^{(2)}\rho ({\boldsymbol {r}}),\dots ,\nabla ^{(N)}\rho ({\boldsymbol {r}}))\,d{\boldsymbol {r}},}
where the vector r R n ∇(i ) is a tensor whose ni i
[
∇
(
i
)
]
α
1
α
2
⋯
α
i
=
∂
i
∂
r
α
1
∂
r
α
2
⋯
∂
r
α
i
where
α
1
,
α
2
,
⋯
,
α
i
=
1
,
2
,
⋯
,
n
.
{\displaystyle \left[\nabla ^{(i)}\right]_{\alpha _{1}\alpha _{2}\cdots \alpha _{i}}={\frac {\partial ^{\,i}}{\partial r_{\alpha _{1}}\partial r_{\alpha _{2}}\cdots \partial r_{\alpha _{i}}}}\qquad \qquad {\text{where}}\quad \alpha _{1},\alpha _{2},\cdots ,\alpha _{i}=1,2,\cdots ,n\ .}
[Note 5] An analogous application of the definition of the functional derivative yields
δ
F
[
ρ
]
δ
ρ
=
∂
f
∂
ρ
−
∇
⋅
∂
f
∂
(
∇
ρ
)
+
∇
(
2
)
⋅
∂
f
∂
(
∇
(
2
)
ρ
)
+
⋯
+
(
−
1
)
N
∇
(
N
)
⋅
∂
f
∂
(
∇
(
N
)
ρ
)
=
∂
f
∂
ρ
+
∑
i
=
1
N
(
−
1
)
i
∇
(
i
)
⋅
∂
f
∂
(
∇
(
i
)
ρ
)
.
{\displaystyle {\begin{aligned}{\frac {\delta F[\rho ]}{\delta \rho }}&{}={\frac {\partial f}{\partial \rho }}-\nabla \cdot {\frac {\partial f}{\partial (\nabla \rho )}}+\nabla ^{(2)}\cdot {\frac {\partial f}{\partial \left(\nabla ^{(2)}\rho \right)}}+\dots +(-1)^{N}\nabla ^{(N)}\cdot {\frac {\partial f}{\partial \left(\nabla ^{(N)}\rho \right)}}\\&{}={\frac {\partial f}{\partial \rho }}+\sum _{i=1}^{N}(-1)^{i}\nabla ^{(i)}\cdot {\frac {\partial f}{\partial \left(\nabla ^{(i)}\rho \right)}}\ .\end{aligned}}}
In the last two equations, the ni
∂
f
∂
(
∇
(
i
)
ρ
)
{\displaystyle {\frac {\partial f}{\partial \left(\nabla ^{(i)}\rho \right)}}}
f ρ ,
[
∂
f
∂
(
∇
(
i
)
ρ
)
]
α
1
α
2
⋯
α
i
=
∂
f
∂
ρ
α
1
α
2
⋯
α
i
where
ρ
α
1
α
2
⋯
α
i
≡
∂
i
ρ
∂
r
α
1
∂
r
α
2
⋯
∂
r
α
i
,
{\displaystyle \left[{\frac {\partial f}{\partial \left(\nabla ^{(i)}\rho \right)}}\right]_{\alpha _{1}\alpha _{2}\cdots \alpha _{i}}={\frac {\partial f}{\partial \rho _{\alpha _{1}\alpha _{2}\cdots \alpha _{i}}}}\qquad \qquad {\text{where}}\quad \rho _{\alpha _{1}\alpha _{2}\cdots \alpha _{i}}\equiv {\frac {\partial ^{\,i}\rho }{\partial r_{\alpha _{1}}\,\partial r_{\alpha _{2}}\cdots \partial r_{\alpha _{i}}}}\ ,}
and the tensor scalar product is,
∇
(
i
)
⋅
∂
f
∂
(
∇
(
i
)
ρ
)
=
∑
α
1
,
α
2
,
⋯
,
α
i
=
1
n
∂
i
∂
r
α
1
∂
r
α
2
⋯
∂
r
α
i
∂
f
∂
ρ
α
1
α
2
⋯
α
i
.
{\displaystyle \nabla ^{(i)}\cdot {\frac {\partial f}{\partial \left(\nabla ^{(i)}\rho \right)}}=\sum _{\alpha _{1},\alpha _{2},\cdots ,\alpha _{i}=1}^{n}\ {\frac {\partial ^{\,i}}{\partial r_{\alpha _{1}}\,\partial r_{\alpha _{2}}\cdots \partial r_{\alpha _{i}}}}\ {\frac {\partial f}{\partial \rho _{\alpha _{1}\alpha _{2}\cdots \alpha _{i}}}}\ .}
[Note 6] Examples [ edit ] Thomas–Fermi kinetic energy functional [ edit ] The Thomas–Fermi model of 1927 used a kinetic energy functional for a noninteracting uniform electron gas in a first attempt of density-functional theory of electronic structure:
T
T
F
[
ρ
]
=
C
F
∫
ρ
5
/
3
(
r
)
d
r
.
{\displaystyle T_{\mathrm {TF} }[\rho ]=C_{\mathrm {F} }\int \rho ^{5/3}(\mathbf {r} )\,d\mathbf {r} \,.}
Since the integrand of
T TF [ρ ] does not involve derivatives of
ρ (r , the functional derivative of
T TF [ρ ] is,
[12]
δ
T
T
F
δ
ρ
(
r
)
=
C
F
∂
ρ
5
/
3
(
r
)
∂
ρ
(
r
)
=
5
3
C
F
ρ
2
/
3
(
r
)
.
{\displaystyle {\begin{aligned}{\frac {\delta T_{\mathrm {TF} }}{\delta \rho ({\boldsymbol {r}})}}&=C_{\mathrm {F} }{\frac {\partial \rho ^{5/3}(\mathbf {r} )}{\partial \rho (\mathbf {r} )}}\\&={\frac {5}{3}}C_{\mathrm {F} }\rho ^{2/3}(\mathbf {r} )\,.\end{aligned}}}
Coulomb potential energy functional [ edit ] For the electron-nucleus potential , Thomas and Fermi employed the Coulomb potential energy functional
V
[
ρ
]
=
∫
ρ
(
r
)
|
r
|
d
r
.
{\displaystyle V[\rho ]=\int {\frac {\rho ({\boldsymbol {r}})}{|{\boldsymbol {r}}|}}\ d{\boldsymbol {r}}.}
Applying the definition of functional derivative,
∫
δ
V
δ
ρ
(
r
)
ϕ
(
r
)
d
r
=
[
d
d
ε
∫
ρ
(
r
)
+
ε
ϕ
(
r
)
|
r
|
d
r
]
ε
=
0
=
∫
1
|
r
|
ϕ
(
r
)
d
r
.
{\displaystyle {\begin{aligned}\int {\frac {\delta V}{\delta \rho ({\boldsymbol {r}})}}\ \phi ({\boldsymbol {r}})\ d{\boldsymbol {r}}&{}=\left[{\frac {d}{d\varepsilon }}\int {\frac {\rho ({\boldsymbol {r}})+\varepsilon \phi ({\boldsymbol {r}})}{|{\boldsymbol {r}}|}}\ d{\boldsymbol {r}}\right]_{\varepsilon =0}\\&{}=\int {\frac {1}{|{\boldsymbol {r}}|}}\,\phi ({\boldsymbol {r}})\ d{\boldsymbol {r}}\,.\end{aligned}}}
So,
δ
V
δ
ρ
(
r
)
=
1
|
r
|
.
{\displaystyle {\frac {\delta V}{\delta \rho ({\boldsymbol {r}})}}={\frac {1}{|{\boldsymbol {r}}|}}\ .}
For the classical part of the electron-electron interaction , Thomas and Fermi employed the Coulomb potential energy functional
J
[
ρ
]
=
1
2
∬
ρ
(
r
)
ρ
(
r
′
)
|
r
−
r
′
|
d
r
d
r
′
.
{\displaystyle J[\rho ]={\frac {1}{2}}\iint {\frac {\rho (\mathbf {r} )\rho (\mathbf {r} ')}{|\mathbf {r} -\mathbf {r} '|}}\,d\mathbf {r} d\mathbf {r} '\,.}
From the
definition of the functional derivative ,
∫
δ
J
δ
ρ
(
r
)
ϕ
(
r
)
d
r
=
[
d
d
ϵ
J
[
ρ
+
ϵ
ϕ
]
]
ϵ
=
0
=
[
d
d
ϵ
(
1
2
∬
[
ρ
(
r
)
+
ϵ
ϕ
(
r
)
]
[
ρ
(
r
′
)
+
ϵ
ϕ
(
r
′
)
]
|
r
−
r
′
|
d
r
d
r
′
)
]
ϵ
=
0
=
1
2
∬
ρ
(
r
′
)
ϕ
(
r
)
|
r
−
r
′
|
d
r
d
r
′
+
1
2
∬
ρ
(
r
)
ϕ
(
r
′
)
|
r
−
r
′
|
d
r
d
r
′
{\displaystyle {\begin{aligned}\int {\frac {\delta J}{\delta \rho ({\boldsymbol {r}})}}\phi ({\boldsymbol {r}})d{\boldsymbol {r}}&{}=\left[{\frac {d\ }{d\epsilon }}\,J[\rho +\epsilon \phi ]\right]_{\epsilon =0}\\&{}=\left[{\frac {d\ }{d\epsilon }}\,\left({\frac {1}{2}}\iint {\frac {[\rho ({\boldsymbol {r}})+\epsilon \phi ({\boldsymbol {r}})]\,[\rho ({\boldsymbol {r}}')+\epsilon \phi ({\boldsymbol {r}}')]}{|{\boldsymbol {r}}-{\boldsymbol {r}}'|}}\,d{\boldsymbol {r}}d{\boldsymbol {r}}'\right)\right]_{\epsilon =0}\\&{}={\frac {1}{2}}\iint {\frac {\rho ({\boldsymbol {r}}')\phi ({\boldsymbol {r}})}{|{\boldsymbol {r}}-{\boldsymbol {r}}'|}}\,d{\boldsymbol {r}}d{\boldsymbol {r}}'+{\frac {1}{2}}\iint {\frac {\rho ({\boldsymbol {r}})\phi ({\boldsymbol {r}}')}{|{\boldsymbol {r}}-{\boldsymbol {r}}'|}}\,d{\boldsymbol {r}}d{\boldsymbol {r}}'\\\end{aligned}}}
The first and second terms on the right hand side of the last equation are equal, since
r and
r′ in the second term can be interchanged without changing the value of the integral. Therefore,
∫
δ
J
δ
ρ
(
r
)
ϕ
(
r
)
d
r
=
∫
(
∫
ρ
(
r
′
)
|
r
−
r
′
|
d
r
′
)
ϕ
(
r
)
d
r
{\displaystyle \int {\frac {\delta J}{\delta \rho ({\boldsymbol {r}})}}\phi ({\boldsymbol {r}})d{\boldsymbol {r}}=\int \left(\int {\frac {\rho ({\boldsymbol {r}}')}{|{\boldsymbol {r}}-{\boldsymbol {r}}'|}}d{\boldsymbol {r}}'\right)\phi ({\boldsymbol {r}})d{\boldsymbol {r}}}
and the functional derivative of the electron-electron Coulomb potential energy functional
J [
ρ ] is,
[13]
δ
J
δ
ρ
(
r
)
=
∫
ρ
(
r
′
)
|
r
−
r
′
|
d
r
′
.
{\displaystyle {\frac {\delta J}{\delta \rho ({\boldsymbol {r}})}}=\int {\frac {\rho ({\boldsymbol {r}}')}{|{\boldsymbol {r}}-{\boldsymbol {r}}'|}}d{\boldsymbol {r}}'\,.}
The second functional derivative is
δ
2
J
[
ρ
]
δ
ρ
(
r
′
)
δ
ρ
(
r
)
=
∂
∂
ρ
(
r
′
)
(
ρ
(
r
′
)
|
r
−
r
′
|
)
=
1
|
r
−
r
′
|
.
{\displaystyle {\frac {\delta ^{2}J[\rho ]}{\delta \rho (\mathbf {r} ')\delta \rho (\mathbf {r} )}}={\frac {\partial }{\partial \rho (\mathbf {r} ')}}\left({\frac {\rho (\mathbf {r} ')}{|\mathbf {r} -\mathbf {r} '|}}\right)={\frac {1}{|\mathbf {r} -\mathbf {r} '|}}.}
Weizsäcker kinetic energy functional [ edit ] In 1935 von Weizsäcker proposed to add a gradient correction to the Thomas-Fermi kinetic energy functional to make it better suit a molecular electron cloud:
T
W
[
ρ
]
=
1
8
∫
∇
ρ
(
r
)
⋅
∇
ρ
(
r
)
ρ
(
r
)
d
r
=
∫
t
W
d
r
,
{\displaystyle T_{\mathrm {W} }[\rho ]={\frac {1}{8}}\int {\frac {\nabla \rho (\mathbf {r} )\cdot \nabla \rho (\mathbf {r} )}{\rho (\mathbf {r} )}}d\mathbf {r} =\int t_{\mathrm {W} }\ d\mathbf {r} \,,}
where
t
W
≡
1
8
∇
ρ
⋅
∇
ρ
ρ
and
ρ
=
ρ
(
r
)
.
{\displaystyle t_{\mathrm {W} }\equiv {\frac {1}{8}}{\frac {\nabla \rho \cdot \nabla \rho }{\rho }}\qquad {\text{and}}\ \ \rho =\rho ({\boldsymbol {r}})\ .}
Using a previously derived
formula for the functional derivative,
δ
T
W
δ
ρ
(
r
)
=
∂
t
W
∂
ρ
−
∇
⋅
∂
t
W
∂
∇
ρ
=
−
1
8
∇
ρ
⋅
∇
ρ
ρ
2
−
(
1
4
∇
2
ρ
ρ
−
1
4
∇
ρ
⋅
∇
ρ
ρ
2
)
where
∇
2
=
∇
⋅
∇
,
{\displaystyle {\begin{aligned}{\frac {\delta T_{\mathrm {W} }}{\delta \rho ({\boldsymbol {r}})}}&={\frac {\partial t_{\mathrm {W} }}{\partial \rho }}-\nabla \cdot {\frac {\partial t_{\mathrm {W} }}{\partial \nabla \rho }}\\&=-{\frac {1}{8}}{\frac {\nabla \rho \cdot \nabla \rho }{\rho ^{2}}}-\left({\frac {1}{4}}{\frac {\nabla ^{2}\rho }{\rho }}-{\frac {1}{4}}{\frac {\nabla \rho \cdot \nabla \rho }{\rho ^{2}}}\right)\qquad {\text{where}}\ \ \nabla ^{2}=\nabla \cdot \nabla \ ,\end{aligned}}}
and the result is,
[14]
δ
T
W
δ
ρ
(
r
)
=
1
8
∇
ρ
⋅
∇
ρ
ρ
2
−
1
4
∇
2
ρ
ρ
.
{\displaystyle {\frac {\delta T_{\mathrm {W} }}{\delta \rho ({\boldsymbol {r}})}}=\ \ \,{\frac {1}{8}}{\frac {\nabla \rho \cdot \nabla \rho }{\rho ^{2}}}-{\frac {1}{4}}{\frac {\nabla ^{2}\rho }{\rho }}\ .}
Entropy [ edit ] The entropy of a discrete random variable is a functional of the probability mass function .
H
[
p
(
x
)
]
=
−
∑
x
p
(
x
)
log
p
(
x
)
{\displaystyle H[p(x)]=-\sum _{x}p(x)\log p(x)}
Thus,
∑
x
δ
H
δ
p
(
x
)
ϕ
(
x
)
=
[
d
d
ϵ
H
[
p
(
x
)
+
ϵ
ϕ
(
x
)
]
]
ϵ
=
0
=
[
−
d
d
ε
∑
x
[
p
(
x
)
+
ε
ϕ
(
x
)
]
log
[
p
(
x
)
+
ε
ϕ
(
x
)
]
]
ε
=
0
=
−
∑
x
[
1
+
log
p
(
x
)
]
ϕ
(
x
)
.
{\displaystyle {\begin{aligned}\sum _{x}{\frac {\delta H}{\delta p(x)}}\,\phi (x)&{}=\left[{\frac {d}{d\epsilon }}H[p(x)+\epsilon \phi (x)]\right]_{\epsilon =0}\\&{}=\left[-\,{\frac {d}{d\varepsilon }}\sum _{x}\,[p(x)+\varepsilon \phi (x)]\ \log[p(x)+\varepsilon \phi (x)]\right]_{\varepsilon =0}\\&{}=-\sum _{x}\,[1+\log p(x)]\ \phi (x)\,.\end{aligned}}}
Thus,
δ
H
δ
p
(
x
)
=
−
1
−
log
p
(
x
)
.
{\displaystyle {\frac {\delta H}{\delta p(x)}}=-1-\log p(x).}
Exponential [ edit ] Let
F
[
φ
(
x
)
]
=
e
∫
φ
(
x
)
g
(
x
)
d
x
.
{\displaystyle F[\varphi (x)]=e^{\int \varphi (x)g(x)dx}.}
Using the delta function as a test function,
δ
F
[
φ
(
x
)
]
δ
φ
(
y
)
=
lim
ε
→
0
F
[
φ
(
x
)
+
ε
δ
(
x
−
y
)
]
−
F
[
φ
(
x
)
]
ε
=
lim
ε
→
0
e
∫
(
φ
(
x
)
+
ε
δ
(
x
−
y
)
)
g
(
x
)
d
x
−
e
∫
φ
(
x
)
g
(
x
)
d
x
ε
=
e
∫
φ
(
x
)
g
(
x
)
d
x
lim
ε
→
0
e
ε
∫
δ
(
x
−
y
)
g
(
x
)
d
x
−
1
ε
=
e
∫
φ
(
x
)
g
(
x
)
d
x
lim
ε
→
0
e
ε
g
(
y
)
−
1
ε
=
e
∫
φ
(
x
)
g
(
x
)
d
x
g
(
y
)
.
{\displaystyle {\begin{aligned}{\frac {\delta F[\varphi (x)]}{\delta \varphi (y)}}&{}=\lim _{\varepsilon \to 0}{\frac {F[\varphi (x)+\varepsilon \delta (x-y)]-F[\varphi (x)]}{\varepsilon }}\\&{}=\lim _{\varepsilon \to 0}{\frac {e^{\int (\varphi (x)+\varepsilon \delta (x-y))g(x)dx}-e^{\int \varphi (x)g(x)dx}}{\varepsilon }}\\&{}=e^{\int \varphi (x)g(x)dx}\lim _{\varepsilon \to 0}{\frac {e^{\varepsilon \int \delta (x-y)g(x)dx}-1}{\varepsilon }}\\&{}=e^{\int \varphi (x)g(x)dx}\lim _{\varepsilon \to 0}{\frac {e^{\varepsilon g(y)}-1}{\varepsilon }}\\&{}=e^{\int \varphi (x)g(x)dx}g(y).\end{aligned}}}
Thus,
δ
F
[
φ
(
x
)
]
δ
φ
(
y
)
=
g
(
y
)
F
[
φ
(
x
)
]
.
{\displaystyle {\frac {\delta F[\varphi (x)]}{\delta \varphi (y)}}=g(y)F[\varphi (x)].}
This is particularly useful in calculating the correlation functions from the partition function in quantum field theory .
Functional derivative of a function [ edit ] A function can be written in the form of an integral like a functional. For example,
ρ
(
r
)
=
F
[
ρ
]
=
∫
ρ
(
r
′
)
δ
(
r
−
r
′
)
d
r
′
.
{\displaystyle \rho ({\boldsymbol {r}})=F[\rho ]=\int \rho ({\boldsymbol {r}}')\delta ({\boldsymbol {r}}-{\boldsymbol {r}}')\,d{\boldsymbol {r}}'.}
Since the integrand does not depend on derivatives of
ρ , the functional derivative of
ρ (r is,
δ
ρ
(
r
)
δ
ρ
(
r
′
)
≡
δ
F
δ
ρ
(
r
′
)
=
∂
∂
ρ
(
r
′
)
[
ρ
(
r
′
)
δ
(
r
−
r
′
)
]
=
δ
(
r
−
r
′
)
.
{\displaystyle {\begin{aligned}{\frac {\delta \rho ({\boldsymbol {r}})}{\delta \rho ({\boldsymbol {r}}')}}\equiv {\frac {\delta F}{\delta \rho ({\boldsymbol {r}}')}}&={\frac {\partial \ \ }{\partial \rho ({\boldsymbol {r}}')}}\,[\rho ({\boldsymbol {r}}')\delta ({\boldsymbol {r}}-{\boldsymbol {r}}')]\\&=\delta ({\boldsymbol {r}}-{\boldsymbol {r}}').\end{aligned}}}
Functional derivative of iterated function [ edit ] The functional derivative of the iterated function
f
(
f
(
x
)
)
{\displaystyle f(f(x))}
δ
f
(
f
(
x
)
)
δ
f
(
y
)
=
f
′
(
f
(
x
)
)
δ
(
x
−
y
)
+
δ
(
f
(
x
)
−
y
)
{\displaystyle {\frac {\delta f(f(x))}{\delta f(y)}}=f'(f(x))\delta (x-y)+\delta (f(x)-y)}
and
δ
f
(
f
(
f
(
x
)
)
)
δ
f
(
y
)
=
f
′
(
f
(
f
(
x
)
)
(
f
′
(
f
(
x
)
)
δ
(
x
−
y
)
+
δ
(
f
(
x
)
−
y
)
)
+
δ
(
f
(
f
(
x
)
)
−
y
)
{\displaystyle {\frac {\delta f(f(f(x)))}{\delta f(y)}}=f'(f(f(x))(f'(f(x))\delta (x-y)+\delta (f(x)-y))+\delta (f(f(x))-y)}
In general:
δ
f
N
(
x
)
δ
f
(
y
)
=
f
′
(
f
N
−
1
(
x
)
)
δ
f
N
−
1
(
x
)
δ
f
(
y
)
+
δ
(
f
N
−
1
(
x
)
−
y
)
{\displaystyle {\frac {\delta f^{N}(x)}{\delta f(y)}}=f'(f^{N-1}(x)){\frac {\delta f^{N-1}(x)}{\delta f(y)}}+\delta (f^{N-1}(x)-y)}
Putting in N = 0
δ
f
−
1
(
x
)
δ
f
(
y
)
=
−
δ
(
f
−
1
(
x
)
−
y
)
f
′
(
f
−
1
(
x
)
)
{\displaystyle {\frac {\delta f^{-1}(x)}{\delta f(y)}}=-{\frac {\delta (f^{-1}(x)-y)}{f'(f^{-1}(x))}}}
Using the delta function as a test function [ edit ] In physics, it is common to use the Dirac delta function
δ
(
x
−
y
)
{\displaystyle \delta (x-y)}
ϕ
(
x
)
{\displaystyle \phi (x)}
y
{\displaystyle y}
partial derivative is a component of the gradient):[15]
δ
F
[
ρ
(
x
)
]
δ
ρ
(
y
)
=
lim
ε
→
0
F
[
ρ
(
x
)
+
ε
δ
(
x
−
y
)
]
−
F
[
ρ
(
x
)
]
ε
.
{\displaystyle {\frac {\delta F[\rho (x)]}{\delta \rho (y)}}=\lim _{\varepsilon \to 0}{\frac {F[\rho (x)+\varepsilon \delta (x-y)]-F[\rho (x)]}{\varepsilon }}.}
This works in cases when
F
[
ρ
(
x
)
+
ε
f
(
x
)
]
{\displaystyle F[\rho (x)+\varepsilon f(x)]}
ε
{\displaystyle \varepsilon }
F
[
ρ
(
x
)
+
ε
δ
(
x
−
y
)
]
{\displaystyle F[\rho (x)+\varepsilon \delta (x-y)]}
The definition given in a previous section is based on a relationship that holds for all test functions
ϕ
(
x
)
{\displaystyle \phi (x)}
ϕ
(
x
)
{\displaystyle \phi (x)}
delta function . However, the latter is not a valid test function (it is not even a proper function).
In the definition, the functional derivative describes how the functional
F
[
ρ
(
x
)
]
{\displaystyle F[\rho (x)]}
ρ
(
x
)
{\displaystyle \rho (x)}
ρ
(
x
)
{\displaystyle \rho (x)}
x
{\displaystyle x}
ρ
(
x
)
{\displaystyle \rho (x)}
y
{\displaystyle y}
ρ
(
x
)
{\displaystyle \rho (x)}
^ According to Giaquinta & Hildebrandt (1996) , p. 18, this notation is customary in physical literature.
^ Called first variation in (Giaquinta & Hildebrandt 1996 , p. 3), variation or first variation in (Courant & Hilbert 1953 , p. 186), variation or differential in (Gelfand & Fomin 2000 , p. 11, § 3.2) and differential in (Parr & Yang 1989 , p. 246).
^
Here the notation
δ
F
δ
ρ
(
x
)
≡
δ
F
δ
ρ
(
x
)
{\displaystyle {\frac {\delta {F}}{\delta \rho }}(x)\equiv {\frac {\delta {F}}{\delta \rho (x)}}}
^ For a three-dimensional Cartesian coordinate system,
∂
f
∂
∇
ρ
=
∂
f
∂
ρ
x
i
^
+
∂
f
∂
ρ
y
j
^
+
∂
f
∂
ρ
z
k
^
,
{\displaystyle {\frac {\partial f}{\partial \nabla \rho }}={\frac {\partial f}{\partial \rho _{x}}}\mathbf {\hat {i}} +{\frac {\partial f}{\partial \rho _{y}}}\mathbf {\hat {j}} +{\frac {\partial f}{\partial \rho _{z}}}\mathbf {\hat {k}} \,,}
ρ
x
=
∂
ρ
∂
x
,
ρ
y
=
∂
ρ
∂
y
,
ρ
z
=
∂
ρ
∂
z
{\displaystyle \rho _{x}={\frac {\partial \rho }{\partial x}}\,,\ \rho _{y}={\frac {\partial \rho }{\partial y}}\,,\ \rho _{z}={\frac {\partial \rho }{\partial z}}}
i
^
{\displaystyle \mathbf {\hat {i}} }
j
^
{\displaystyle \mathbf {\hat {j}} }
k
^
{\displaystyle \mathbf {\hat {k}} }
^ For example, for the case of three dimensions (n = 3i = 2∇(2) has components,
[
∇
(
2
)
]
α
β
=
∂
2
∂
r
α
∂
r
β
where
α
,
β
=
1
,
2
,
3
.
{\displaystyle \left[\nabla ^{(2)}\right]_{\alpha \beta }={\frac {\partial ^{\,2}}{\partial r_{\alpha }\,\partial r_{\beta }}}\qquad \qquad {\text{where}}\quad \alpha ,\beta =1,2,3\,.}
^ For example, for the case n = 3i = 2
∇
(
2
)
⋅
∂
f
∂
(
∇
(
2
)
ρ
)
=
∑
α
,
β
=
1
3
∂
2
∂
r
α
∂
r
β
∂
f
∂
ρ
α
β
where
ρ
α
β
≡
∂
2
ρ
∂
r
α
∂
r
β
.
{\displaystyle \nabla ^{(2)}\cdot {\frac {\partial f}{\partial \left(\nabla ^{(2)}\rho \right)}}=\sum _{\alpha ,\beta =1}^{3}\ {\frac {\partial ^{\,2}}{\partial r_{\alpha }\,\partial r_{\beta }}}\ {\frac {\partial f}{\partial \rho _{\alpha \beta }}}\qquad {\text{where}}\ \ \rho _{\alpha \beta }\equiv {\frac {\partial ^{\,2}\rho }{\partial r_{\alpha }\,\partial r_{\beta }}}\ .}
^ a b (Giaquinta & Hildebrandt 1996 , p. 18)
^ (Gelfand & Fomin 2000 , p. 11).
^ (Giaquinta & Hildebrandt 1996 , p. 10).
^ (Giaquinta & Hildebrandt 1996 , p. 10).
^ (Parr & Yang 1989 , p. 246, Eq. A.2).
^ (Greiner & Reinhardt 1996 , p. 36,37).
^ (Parr & Yang 1989 , p. 246).
^ (Parr & Yang 1989 , p. 247, Eq. A.3).
^ (Parr & Yang 1989 , p. 247, Eq. A.4).
^ (Greiner & Reinhardt 1996 , p. 38, Eq. 6).
^ (Greiner & Reinhardt 1996 , p. 38, Eq. 7).
^ (Parr & Yang 1989 , p. 247, Eq. A.6).
^ (Parr & Yang 1989 , p. 248, Eq. A.11).
^ (Parr & Yang 1989 , p. 247, Eq. A.9).
^ Greiner & Reinhardt 1996 , p. 37
References [ edit ] Courant, Richard ; Hilbert, David (1953). "Chapter IV. The Calculus of Variations". Methods of Mathematical Physics . Vol. I (First English ed.). New York, New York: Interscience Publishers , Inc. pp. 164–274. ISBN 978-0471504474 MR 0065391 . Zbl 0001.00501 .Frigyik, Béla A.; Srivastava, Santosh; Gupta, Maya R. (January 2008), Introduction to Functional Derivatives (PDF) , UWEE Tech Report, vol. UWEETR-2008-0001, Seattle, WA: Department of Electrical Engineering at the University of Washington, p. 7, archived from the original (PDF) on 2017-02-17, retrieved 2013-10-23 Gelfand, I. M. ; Fomin, S. V. (2000) [1963], Calculus of variations Dover Publications , ISBN 978-0486414485 MR 0160139 , Zbl 0127.05402 Giaquinta, Mariano ; Hildebrandt, Stefan (1996), Calculus of Variations 1. The Lagrangian Formalism , Grundlehren der Mathematischen Wissenschaften, vol. 310 (1st ed.), Berlin: Springer-Verlag , ISBN 3-540-50625-X MR 1368401 , Zbl 0853.49001 Greiner, Walter ; Reinhardt, Joachim (1996), "Section 2.3 – Functional derivatives" , Field quantization , With a foreword by D. A. Bromley, Berlin–Heidelberg–New York: Springer-Verlag, pp. 36–38 , ISBN 3-540-59179-6 MR 1383589 , Zbl 0844.00006 Parr, R. G.; Yang, W. (1989). "Appendix A, Functionals". Density-Functional Theory of Atoms and Molecules ISBN 978-0195042795 External links [ edit ]
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![{\displaystyle J[f]=\int _{a}^{b}L(\,x,f(x),f\,'(x)\,)\,dx\ ,}](https://wikimedia.org/api/rest_v1/media/math/render/svg/68be973ffd7b1b84391c61f2dcacd0ecf74ca766)
![{\displaystyle \delta F[\rho ,\cdot ]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/7ed3949d5d1ca2eb1fd61ffd71821bec9c3fb741)
![{\displaystyle F[\rho +\phi ]-F[\rho ]=\delta F[\rho ;\phi ]+\epsilon \cdot \|\phi \|}](https://wikimedia.org/api/rest_v1/media/math/render/svg/b638e764a1754987ad6170eae5ff841ffd62fecd)
![{\displaystyle {\begin{aligned}\delta F[\rho ,\phi ]&=\lim _{\varepsilon \to 0}{\frac {F[\rho +\varepsilon \phi ]-F[\rho ]}{\varepsilon }}\\&=\left[{\frac {d}{d\varepsilon }}F[\rho +\varepsilon \phi ]\right]_{\varepsilon =0}.\end{aligned}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/c8d3971cb3b1f3bb6ec934b9f87f5a5da35b96a0)
![{\displaystyle F[\rho ]=\int _{\Omega }L(x,\rho (x),D\rho (x))\,dx}](https://wikimedia.org/api/rest_v1/media/math/render/svg/93d79643a98f004cefcc92b69321853aea13e53f)
![{\displaystyle \delta F[\rho ,\phi ]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/bf5edb11388181a49c9974fbe741dd7fcab23aaf)
![{\displaystyle \delta F[\rho ,\phi ]=\int _{\Omega }{\frac {\delta F}{\delta \rho }}(x)\ \phi (x)\ dx}](https://wikimedia.org/api/rest_v1/media/math/render/svg/199a3465c4243e4b47dab9328fa87629d722c780)
![{\displaystyle {\frac {\delta (\lambda F+\mu G)[\rho ]}{\delta \rho (x)}}=\lambda {\frac {\delta F[\rho ]}{\delta \rho (x)}}+\mu {\frac {\delta G[\rho ]}{\delta \rho (x)}},}](https://wikimedia.org/api/rest_v1/media/math/render/svg/a3855d2be1b75c59c9da233cf9c8c71eeed66eaf)
![{\displaystyle {\frac {\delta (FG)[\rho ]}{\delta \rho (x)}}={\frac {\delta F[\rho ]}{\delta \rho (x)}}G[\rho ]+F[\rho ]{\frac {\delta G[\rho ]}{\delta \rho (x)}}\,,}](https://wikimedia.org/api/rest_v1/media/math/render/svg/ee0421ecdfb105f4b62dcbd729c20e8ca587bda2)
![{\displaystyle {\frac {\delta F[G[\rho ]]}{\delta \rho (y)}}=\int dx{\frac {\delta F[G]}{\delta G(x)}}_{G=G[\rho ]}\cdot {\frac {\delta G[\rho ](x)}{\delta \rho (y)}}\ .}](https://wikimedia.org/api/rest_v1/media/math/render/svg/f89c5a56528b98b95ed70e2011242b78e9cadf91)
![{\displaystyle {\frac {\delta F[g(\rho )]}{\delta \rho (y)}}={\frac {\delta F[g(\rho )]}{\delta g[\rho (y)]}}\ {\frac {dg(\rho )}{d\rho (y)}}\ .}](https://wikimedia.org/api/rest_v1/media/math/render/svg/68fbcc664f79881c08549ade9a45a74d13db3dce)
![{\displaystyle F[\rho ]=\int f({\boldsymbol {r}},\rho ({\boldsymbol {r}}),\nabla \rho ({\boldsymbol {r}}))\,d{\boldsymbol {r}},}](https://wikimedia.org/api/rest_v1/media/math/render/svg/984500e18fa20fadb9f03147b92b046a166aafc7)
![{\displaystyle {\begin{aligned}\int {\frac {\delta F}{\delta \rho ({\boldsymbol {r}})}}\,\phi ({\boldsymbol {r}})\,d{\boldsymbol {r}}&=\left[{\frac {d}{d\varepsilon }}\int f({\boldsymbol {r}},\rho +\varepsilon \phi ,\nabla \rho +\varepsilon \nabla \phi )\,d{\boldsymbol {r}}\right]_{\varepsilon =0}\\&=\int \left({\frac {\partial f}{\partial \rho }}\,\phi +{\frac {\partial f}{\partial \nabla \rho }}\cdot \nabla \phi \right)d{\boldsymbol {r}}\\&=\int \left[{\frac {\partial f}{\partial \rho }}\,\phi +\nabla \cdot \left({\frac {\partial f}{\partial \nabla \rho }}\,\phi \right)-\left(\nabla \cdot {\frac {\partial f}{\partial \nabla \rho }}\right)\phi \right]d{\boldsymbol {r}}\\&=\int \left[{\frac {\partial f}{\partial \rho }}\,\phi -\left(\nabla \cdot {\frac {\partial f}{\partial \nabla \rho }}\right)\phi \right]d{\boldsymbol {r}}\\&=\int \left({\frac {\partial f}{\partial \rho }}-\nabla \cdot {\frac {\partial f}{\partial \nabla \rho }}\right)\phi ({\boldsymbol {r}})\ d{\boldsymbol {r}}\,.\end{aligned}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/364480cb1cb7bbad967750d4f4c2b2baa061f134)
![{\displaystyle F[\rho ({\boldsymbol {r}})]=\int f({\boldsymbol {r}},\rho ({\boldsymbol {r}}),\nabla \rho ({\boldsymbol {r}}),\nabla ^{(2)}\rho ({\boldsymbol {r}}),\dots ,\nabla ^{(N)}\rho ({\boldsymbol {r}}))\,d{\boldsymbol {r}},}](https://wikimedia.org/api/rest_v1/media/math/render/svg/e8d2a74e6ffc8d130e6540ae052afa4431152535)
![{\displaystyle \left[\nabla ^{(i)}\right]_{\alpha _{1}\alpha _{2}\cdots \alpha _{i}}={\frac {\partial ^{\,i}}{\partial r_{\alpha _{1}}\partial r_{\alpha _{2}}\cdots \partial r_{\alpha _{i}}}}\qquad \qquad {\text{where}}\quad \alpha _{1},\alpha _{2},\cdots ,\alpha _{i}=1,2,\cdots ,n\ .}](https://wikimedia.org/api/rest_v1/media/math/render/svg/56d037aa2a7b100d82e701c7c784e8fc1c4db99f)
![{\displaystyle {\begin{aligned}{\frac {\delta F[\rho ]}{\delta \rho }}&{}={\frac {\partial f}{\partial \rho }}-\nabla \cdot {\frac {\partial f}{\partial (\nabla \rho )}}+\nabla ^{(2)}\cdot {\frac {\partial f}{\partial \left(\nabla ^{(2)}\rho \right)}}+\dots +(-1)^{N}\nabla ^{(N)}\cdot {\frac {\partial f}{\partial \left(\nabla ^{(N)}\rho \right)}}\\&{}={\frac {\partial f}{\partial \rho }}+\sum _{i=1}^{N}(-1)^{i}\nabla ^{(i)}\cdot {\frac {\partial f}{\partial \left(\nabla ^{(i)}\rho \right)}}\ .\end{aligned}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/5e309ee6857a3699070ebbbb3e9380ededa6572d)
![{\displaystyle \left[{\frac {\partial f}{\partial \left(\nabla ^{(i)}\rho \right)}}\right]_{\alpha _{1}\alpha _{2}\cdots \alpha _{i}}={\frac {\partial f}{\partial \rho _{\alpha _{1}\alpha _{2}\cdots \alpha _{i}}}}\qquad \qquad {\text{where}}\quad \rho _{\alpha _{1}\alpha _{2}\cdots \alpha _{i}}\equiv {\frac {\partial ^{\,i}\rho }{\partial r_{\alpha _{1}}\,\partial r_{\alpha _{2}}\cdots \partial r_{\alpha _{i}}}}\ ,}](https://wikimedia.org/api/rest_v1/media/math/render/svg/75a055a108cb726caf3543357d6e379254a09dbf)
![{\displaystyle T_{\mathrm {TF} }[\rho ]=C_{\mathrm {F} }\int \rho ^{5/3}(\mathbf {r} )\,d\mathbf {r} \,.}](https://wikimedia.org/api/rest_v1/media/math/render/svg/805e085a9d15321704c17fcea9c5c2f3a1f8924b)
![{\displaystyle V[\rho ]=\int {\frac {\rho ({\boldsymbol {r}})}{|{\boldsymbol {r}}|}}\ d{\boldsymbol {r}}.}](https://wikimedia.org/api/rest_v1/media/math/render/svg/2c1593ae52b426aa72244fda7d98ac6aab5a6fd4)
![{\displaystyle {\begin{aligned}\int {\frac {\delta V}{\delta \rho ({\boldsymbol {r}})}}\ \phi ({\boldsymbol {r}})\ d{\boldsymbol {r}}&{}=\left[{\frac {d}{d\varepsilon }}\int {\frac {\rho ({\boldsymbol {r}})+\varepsilon \phi ({\boldsymbol {r}})}{|{\boldsymbol {r}}|}}\ d{\boldsymbol {r}}\right]_{\varepsilon =0}\\&{}=\int {\frac {1}{|{\boldsymbol {r}}|}}\,\phi ({\boldsymbol {r}})\ d{\boldsymbol {r}}\,.\end{aligned}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/c5feda7981e551ab3ef736601c97d676b5c93eeb)
![{\displaystyle J[\rho ]={\frac {1}{2}}\iint {\frac {\rho (\mathbf {r} )\rho (\mathbf {r} ')}{|\mathbf {r} -\mathbf {r} '|}}\,d\mathbf {r} d\mathbf {r} '\,.}](https://wikimedia.org/api/rest_v1/media/math/render/svg/30ff0a58eecdab9b69e1da85dc506f029c9b65b3)
![{\displaystyle {\begin{aligned}\int {\frac {\delta J}{\delta \rho ({\boldsymbol {r}})}}\phi ({\boldsymbol {r}})d{\boldsymbol {r}}&{}=\left[{\frac {d\ }{d\epsilon }}\,J[\rho +\epsilon \phi ]\right]_{\epsilon =0}\\&{}=\left[{\frac {d\ }{d\epsilon }}\,\left({\frac {1}{2}}\iint {\frac {[\rho ({\boldsymbol {r}})+\epsilon \phi ({\boldsymbol {r}})]\,[\rho ({\boldsymbol {r}}')+\epsilon \phi ({\boldsymbol {r}}')]}{|{\boldsymbol {r}}-{\boldsymbol {r}}'|}}\,d{\boldsymbol {r}}d{\boldsymbol {r}}'\right)\right]_{\epsilon =0}\\&{}={\frac {1}{2}}\iint {\frac {\rho ({\boldsymbol {r}}')\phi ({\boldsymbol {r}})}{|{\boldsymbol {r}}-{\boldsymbol {r}}'|}}\,d{\boldsymbol {r}}d{\boldsymbol {r}}'+{\frac {1}{2}}\iint {\frac {\rho ({\boldsymbol {r}})\phi ({\boldsymbol {r}}')}{|{\boldsymbol {r}}-{\boldsymbol {r}}'|}}\,d{\boldsymbol {r}}d{\boldsymbol {r}}'\\\end{aligned}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/e5ea4497d6c3471c141f5882e3e91e4c80e36c5f)
![{\displaystyle {\frac {\delta ^{2}J[\rho ]}{\delta \rho (\mathbf {r} ')\delta \rho (\mathbf {r} )}}={\frac {\partial }{\partial \rho (\mathbf {r} ')}}\left({\frac {\rho (\mathbf {r} ')}{|\mathbf {r} -\mathbf {r} '|}}\right)={\frac {1}{|\mathbf {r} -\mathbf {r} '|}}.}](https://wikimedia.org/api/rest_v1/media/math/render/svg/b6863a6705ea4606b99eda69a687aacb21964bc2)
![{\displaystyle T_{\mathrm {W} }[\rho ]={\frac {1}{8}}\int {\frac {\nabla \rho (\mathbf {r} )\cdot \nabla \rho (\mathbf {r} )}{\rho (\mathbf {r} )}}d\mathbf {r} =\int t_{\mathrm {W} }\ d\mathbf {r} \,,}](https://wikimedia.org/api/rest_v1/media/math/render/svg/0eafe31ae78208f4c75df2c3147f18c61ed02e29)
![{\displaystyle H[p(x)]=-\sum _{x}p(x)\log p(x)}](https://wikimedia.org/api/rest_v1/media/math/render/svg/5badc001355f04544f4992a05020910fadf0d19d)
![{\displaystyle {\begin{aligned}\sum _{x}{\frac {\delta H}{\delta p(x)}}\,\phi (x)&{}=\left[{\frac {d}{d\epsilon }}H[p(x)+\epsilon \phi (x)]\right]_{\epsilon =0}\\&{}=\left[-\,{\frac {d}{d\varepsilon }}\sum _{x}\,[p(x)+\varepsilon \phi (x)]\ \log[p(x)+\varepsilon \phi (x)]\right]_{\varepsilon =0}\\&{}=-\sum _{x}\,[1+\log p(x)]\ \phi (x)\,.\end{aligned}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/3a3d7804d80847c74e11341f823e94d5f1176333)
![{\displaystyle F[\varphi (x)]=e^{\int \varphi (x)g(x)dx}.}](https://wikimedia.org/api/rest_v1/media/math/render/svg/8cf62da868a4878d3d5c56043e0e7947d1a3789f)
![{\displaystyle {\begin{aligned}{\frac {\delta F[\varphi (x)]}{\delta \varphi (y)}}&{}=\lim _{\varepsilon \to 0}{\frac {F[\varphi (x)+\varepsilon \delta (x-y)]-F[\varphi (x)]}{\varepsilon }}\\&{}=\lim _{\varepsilon \to 0}{\frac {e^{\int (\varphi (x)+\varepsilon \delta (x-y))g(x)dx}-e^{\int \varphi (x)g(x)dx}}{\varepsilon }}\\&{}=e^{\int \varphi (x)g(x)dx}\lim _{\varepsilon \to 0}{\frac {e^{\varepsilon \int \delta (x-y)g(x)dx}-1}{\varepsilon }}\\&{}=e^{\int \varphi (x)g(x)dx}\lim _{\varepsilon \to 0}{\frac {e^{\varepsilon g(y)}-1}{\varepsilon }}\\&{}=e^{\int \varphi (x)g(x)dx}g(y).\end{aligned}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/ec4bb807430d52bf84582815526969c5182132bb)
![{\displaystyle {\frac {\delta F[\varphi (x)]}{\delta \varphi (y)}}=g(y)F[\varphi (x)].}](https://wikimedia.org/api/rest_v1/media/math/render/svg/e78f30af55466f2e117b3dc25af74e86a2db308c)
![{\displaystyle \rho ({\boldsymbol {r}})=F[\rho ]=\int \rho ({\boldsymbol {r}}')\delta ({\boldsymbol {r}}-{\boldsymbol {r}}')\,d{\boldsymbol {r}}'.}](https://wikimedia.org/api/rest_v1/media/math/render/svg/d4a462a8d7648c751791e624f6bb5abdfa985733)
![{\displaystyle {\begin{aligned}{\frac {\delta \rho ({\boldsymbol {r}})}{\delta \rho ({\boldsymbol {r}}')}}\equiv {\frac {\delta F}{\delta \rho ({\boldsymbol {r}}')}}&={\frac {\partial \ \ }{\partial \rho ({\boldsymbol {r}}')}}\,[\rho ({\boldsymbol {r}}')\delta ({\boldsymbol {r}}-{\boldsymbol {r}}')]\\&=\delta ({\boldsymbol {r}}-{\boldsymbol {r}}').\end{aligned}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/1583fde0b7d6e164506aced9aa3781e502395d53)
![{\displaystyle {\frac {\delta F[\rho (x)]}{\delta \rho (y)}}=\lim _{\varepsilon \to 0}{\frac {F[\rho (x)+\varepsilon \delta (x-y)]-F[\rho (x)]}{\varepsilon }}.}](https://wikimedia.org/api/rest_v1/media/math/render/svg/b01a2033e8c8afc08ec56de9981c0e29042885f6)
![{\displaystyle F[\rho (x)+\varepsilon f(x)]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/b979a338aa9020b6c02e0bcae441aaa605ec2a20)
![{\displaystyle F[\rho (x)+\varepsilon \delta (x-y)]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/659a52b75b432c570f6c2a7415fc5b4334bf3618)
![{\displaystyle F[\rho (x)]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/c7fab43f9b14ba7f5581e7767857988b966692be)
![{\displaystyle \left[\nabla ^{(2)}\right]_{\alpha \beta }={\frac {\partial ^{\,2}}{\partial r_{\alpha }\,\partial r_{\beta }}}\qquad \qquad {\text{where}}\quad \alpha ,\beta =1,2,3\,.}](https://wikimedia.org/api/rest_v1/media/math/render/svg/78cbff2c145d8b1d793a8318a07d6f72883d2f3d)
