(Redirected from Moser–Trudinger inequality )
In mathematical analysis , Trudinger's theorem or the Trudinger inequality (also sometimes called the Moser–Trudinger inequality ) is a result of functional analysis on Sobolev spaces . It is named after Neil Trudinger (and Jürgen Moser ).
It provides an inequality between a certain Sobolev space norm and an Orlicz space norm of a function. The inequality is a limiting case of Sobolev imbedding and can be stated as the following theorem:
Let
Ω
{\displaystyle \Omega }
R
n
{\displaystyle \mathbb {R} ^{n}}
cone condition . Let
m
p
=
n
{\displaystyle mp=n}
p
>
1
{\displaystyle p>1}
A
(
t
)
=
exp
(
t
n
/
(
n
−
m
)
)
−
1.
{\displaystyle A(t)=\exp \left(t^{n/(n-m)}\right)-1.}
Then there exists the embedding
W
m
,
p
(
Ω
)
↪
L
A
(
Ω
)
{\displaystyle W^{m,p}(\Omega )\hookrightarrow L_{A}(\Omega )}
where
L
A
(
Ω
)
=
{
u
∈
M
f
(
Ω
)
:
‖
u
‖
A
,
Ω
=
inf
{
k
>
0
:
∫
Ω
A
(
|
u
(
x
)
|
k
)
d
x
≤
1
}
<
∞
}
.
{\displaystyle L_{A}(\Omega )=\left\{u\in M_{f}(\Omega ):\|u\|_{A,\Omega }=\inf\{k>0:\int _{\Omega }A\left({\frac {|u(x)|}{k}}\right)~dx\leq 1\}<\infty \right\}.}
The space
L
A
(
Ω
)
{\displaystyle L_{A}(\Omega )}
is an example of an Orlicz space .
References
Categories :
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