Agmon's inequality

In mathematical analysis, Agmon's inequalities, named after Shmuel Agmon,^[1] consist of two closely related interpolation inequalities between the Lebesgue space ${\displaystyle L^{\mathrm{\infty }}}$ and the Sobolev spaces ${\displaystyle H^s}$. It is useful in the study of partial differential equations. Let ${\displaystyle u\in H^2(\mathrm{\Omega })\cap H_0^1(\mathrm{\Omega })}$ where ${\displaystyle \mathrm{\Omega }\subset {\mathbb{ℝ}}^3}$^[vague]. Then Agmon's inequalities in 3D state that there exists a constant ${\displaystyle C}$ such that

${\displaystyle {\displaystyle \Vert u{\Vert }_{L^{\mathrm{\infty }}(\mathrm{\Omega })}\le C\Vert u{\Vert }_{H^1(\mathrm{\Omega })}^{1/2}\Vert u{\Vert }_{H^2(\mathrm{\Omega })}^{1/2},}}$

and

${\displaystyle {\displaystyle \Vert u{\Vert }_{L^{\mathrm{\infty }}(\mathrm{\Omega })}\le C\Vert u{\Vert }_{L^2(\mathrm{\Omega })}^{1/4}\Vert u{\Vert }_{H^2(\mathrm{\Omega })}^{3/4}.}}$

In 2D, the first inequality still holds, but not the second: let ${\displaystyle u\in H^2(\mathrm{\Omega })\cap H_0^1(\mathrm{\Omega })}$ where ${\displaystyle \mathrm{\Omega }\subset {\mathbb{ℝ}}^2}$. Then Agmon's inequality in 2D states that there exists a constant ${\displaystyle C}$ such that

${\displaystyle {\displaystyle \Vert u{\Vert }_{L^{\mathrm{\infty }}(\mathrm{\Omega })}\le C\Vert u{\Vert }_{L^2(\mathrm{\Omega })}^{1/2}\Vert u{\Vert }_{H^2(\mathrm{\Omega })}^{1/2}.}}$

For the ${\displaystyle n}$-dimensional case, choose ${\displaystyle s_1}$ and ${\displaystyle s_2}$ such that ${\displaystyle s_1<\frac{n}{2}<s_2}$. Then, if ${\displaystyle 0<\theta <1}$ and ${\displaystyle \frac{n}{2}=\theta s_1+(1-\theta )s_2}$, the following inequality holds for any ${\displaystyle u\in H^{s_2}(\mathrm{\Omega })}$

${\displaystyle {\displaystyle \Vert u{\Vert }_{L^{\mathrm{\infty }}(\mathrm{\Omega })}\le C\Vert u{\Vert }_{H^{s_1}(\mathrm{\Omega })}^{\theta }\Vert u{\Vert }_{H^{s_2}(\mathrm{\Omega })}^{1-\theta }}}$

• Ladyzhenskaya inequality
• Brezis–Gallouet inequality

• Agmon, Shmuel (2010). Lectures on elliptic boundary value problems. Providence, RI: AMS Chelsea Publishing. ISBN 978-0-8218-4910-1. 
• Foias, Ciprian; Manley, O.; Rosa, R.; Temam, R. (2001). Navier-Stokes Equations and Turbulence. Cambridge: Cambridge University Press. ISBN 0-521-36032-3. https://archive.org/details/navierstokesequa0000unse. 

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