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   1. <dc:title lang="ca-ES">$L^p$ continuity of projectors of weighted harmonic Bergman spaces</dc:title>

   2. <dc:creator>Blasco, Óscar</dc:creator>

   3. <dc:creator>Pérez-Esteva, Salvador</dc:creator>

   4. <dc:description lang="ca-ES">In this paper we study spaces $A^p(w)$ consisting of harmonic functions in $B^n$ the unit ball in $\mathbb{R}^n$ and belonging to $L^p(w)$, where $dw(x)=w(1-\vert x\vert)dx$ and $w:(0,1]\rightarrow\mathbb{R}^+$ will denote a continuous integrable function. For weights satisfying certain Dini type conditions we construct families of projections of $L^p(w)$ onto $A^p(w)$. We use this to get for $1&lt;p&lt;\infty$ and $\frac{1}{p} + \frac{1}{p'} =1$, a duality $A^p(w)^\ast=A^{p'}(w')$, where $w'$ depends on $p$ and $w$.</dc:description>

   5. <dc:publisher lang="0">Universitat de Barcelona</dc:publisher>

   6. <dc:date>2000</dc:date>

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   12. <dc:identifier>2038-4815</dc:identifier>

   13. <dc:source lang="ca-ES">Collectanea Mathematica; 2000: Vol.: 51 Núm.: 1; p. 49-58</dc:source>

   14. <dc:source lang="0">0010-0757</dc:source>

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   18. <dc:rights>Aquesta revista ofereix el text complet de tots els seus articles, excepte els dels cinc darrers anys, que s'aniran alliberant periòdicament fins el 2010. A partir del 2011 requereix subscripció. Podeu accedir-hi aquí. L'accés als articles a text complet inclosos a RACO és gratuït, però els actes de reproducció, distribució, comunicació pública o transformació total o parcial estan subjectes a les condicions d'ús de cada revista i poden requerir el consentiment exprés i escrit dels autors i/o institucions editores.</dc:rights>

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      1. <subfield code="a">In this paper we study spaces $A^p(w)$ consisting of harmonic functions in $B^n$ the unit ball in $\mathbb{R}^n$ and belonging to $L^p(w)$, where $dw(x)=w(1-\vert x\vert)dx$ and $w:(0,1]\rightarrow\mathbb{R}^+$ will denote a continuous integrable function. For weights satisfying certain Dini type conditions we construct families of projections of $L^p(w)$ onto $A^p(w)$. We use this to get for $1&lt;p&lt;\infty$ and $\frac{1}{p} + \frac{1}{p'} =1$, a duality $A^p(w)^\ast=A^{p'}(w')$, where $w'$ depends on $p$ and $w$.</subfield>

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             1. <p>In this paper we study spaces $A^p(w)$ consisting of harmonic functions in $B^n$ the unit ball in $\mathbb{R}^n$ and belonging to $L^p(w)$, where $dw(x)=w(1-\vert x\vert)dx$ and $w:(0,1]\rightarrow\mathbb{R}^+$ will denote a continuous integrable function. For weights satisfying certain Dini type conditions we construct families of projections of $L^p(w)$ onto $A^p(w)$. We use this to get for $1&lt;p&lt;\infty$ and $\frac{1}{p} + \frac{1}{p'} =1$, a duality $A^p(w)^\ast=A^{p'}(w')$, where $w'$ depends on $p$ and $w$.</p>

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   2. <body>

      1. <p>Ho sentim, aquest no disposem del contingut d'aquest article.Lo sentimos, no disponemos del contenido de este artículo.Sorry, we do not have the content of this article.</p>

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