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Zbl 1022.46018
Machihara, Shuji; Ozawa, Tohru
Interpolation inequalities in Besov spaces.
(English)
[J] Proc. Am. Math. Soc. 131, No.5, 1553-1556 (2003). ISSN 0002-9939; ISSN 1088-6826/e

In the paper under review, the authors prove an interpolation inequality which extends various well-known inequalities in special cases. More specifically, they show that for $\lambda,$ $\mu$, $p,q,r$, $\theta$ satisfying $\lambda, \mu \in \Bbb R,$ $1\leq p,q\leq r\leq \infty$, $0<\theta<1$; $\lambda>\frac {n}{p}-\frac{n}{r},$ $\mu<\frac{n}{q}-\frac{n}{r},$ $\theta(\lambda-\frac{n}{p}+\frac{n}{r})+(1-\theta)(\mu-\frac{n}{q}+\frac{n}{r})=0$, there exists a constant $C>0$ such that $$||f;\overset \cdot \to B^{0}_{r,1}||\leq C||f;\overset\cdot\to B^{\lambda}_{p,\infty}||^{\theta}||f;\overset\cdot\to B^{\mu}_{q,\infty}||^{1-\theta}$$ for all $f\in \overset\cdot\to B^{\lambda}_{p,\infty}\cap \overset\cdot \to B^{\mu}_{q,\infty}$.
[Nicolae Popa (Bucureşti)]
MSC 2000:
*46B70 Interpolation between normed linear spaces
46M35 Abstract interpolation of topological linear spaces
46E35 Sobolev spaces and generalizations

Keywords: Besov space; interpolation inequality

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