On Fourier Multipliers of Homogeneous Besov Spaces

## Abstract Let __X__ be a Banach space. We show that each __m__ : ℝ \ {0} → __L__ (__X__ ) satisfying the Mikhlin condition sup~__x__ ≠0~(‖__m__ (__x__ )‖ + ‖__xm__ ′(__x__ )‖) < ∞ defines a Fourier multiplier on __B__ ^__s__^ ~__p,q__~ (ℝ; __X__ ) if and only if 1 < __p__ < ∞ and __X__ is isomorp

## Abstract Presented is a general Fourier multiplier theorem for operator–valued multiplier functions on vector–valued Besov spaces where the required smoothness of the multiplier functions depends on the geometry of the underlying Banach space (specifically, its Fourier type). The main result cov

## Abstract Using Herz spaces, we obtain a sufficient condition for a bounded measurable function on ℝ^__n__^ to be a Fourier multiplier on __H^p^~α~__ (ℝ^__n__^ ) for 0 < __p__ < 1 and –__n__ < α ≤ 0. Our result is sharp in a certain sense and generalizes a recent result obtained by Baernstein an

## Abstract The author establishes a full real interpolation theorem for inhomogeneous Besov and Triebel‐Lizorkin spaces on spaces of homogeneous type. The corresponding theorem for homogeneous Besov and Triebel‐Lizorkin spaces is also presented. Moreover, as an application, the author gives the re

## Abstract We discuss the existence and unicity of translation and dilation commuting realizations of the homogeneous spaces \documentclass{article}\usepackage{amssymb}\begin{document}\pagestyle{empty}$\dot{B}\_{{p},{q}}^{s}({\mathbb R}^n\!)$\end{document} and \documentclass{article}\usepackage{am

## Abstract We consider generalized Calderón–Zygmund operators whose kernel takes values in the space of all continuous linear operators between two Banach spaces. In the spirit of the __T__ (1) theorem of David and Journé we prove boundedness results for such operators on vector‐valued Besov space