Trudinger's theorem

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 $\Omega$ be a bounded domain in $\mathbb {R} ^{n}$ satisfying the cone condition. Let $mp=n$ and $p>1$ . Set

A(t)=\exp \left(t^{n/(n-m)}\right)-1.

Then there exists the imbedding

W^{m,p}(\Omega )\hookrightarrow L_{A}(\Omega )

where

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}(\Omega )

is an example of an Orlicz space.

References

Moser, J. (1971), "A Sharp form of an Inequality by N. Trudinger", Indiana Univ. Math., 20: 1077–1092 .
Trudinger, N. S. (1967), "On imbeddings into Orlicz spaces and some applications", J. Math. Mech., 17: 473–483 .

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