Remarks on weighted mixed norm spaces (Q2906466)

Let \(\rho: (0,1]\to\mathbb{R}^{+}\) be a measurable function that is bounded on compact sets. For \(0<p,q\leq\infty\), the space \(L(p,q,\rho)\) consists of all measurable functions \(f\) on the unit disk such that NEWLINE\[NEWLINE\Big(\int_{0}^{1}\frac{\rho(1-r)}{1-r}M_{p}^{q}(f,r)\,dr\Big)^{1/q}<\infty,NEWLINE\]NEWLINENEWLINENEWLINEwhere \(M_{p}(f,r)\) is the \(p\)-norm of the function \(\theta\mapsto f(re^{i\theta})\) defined on \((0,2\pi)\). For an appropriate choice of \(\rho\), the space \(L(p,p,\rho)\) becomes a weighted Lebesgue space \(L^p(\mathbb{D},(1-|z|^2)^{\alpha}dA(z))\).NEWLINENEWLINEThe paper under review investigates the Bergman projection, the Berezin transform, and the averaging operator on \(L(p,q,\rho)\). For each operator, the author determines conditions on the weight \(\rho\) to guarantee its boundedness on \(L(p,q,\rho)\). The conditions involve the Dini condition \(D_{\epsilon}\) and the \(b_{\delta}\)-condition. These results extend previously known results for weighted Lebesgue spaces and for \(L(p,q,\alpha)\), which is \(L(p,q,\rho)\) with \(\rho(t)=t^{q\alpha}\).NEWLINENEWLINEFor the entire collection see [Zbl 1232.30005].