One weight inequality for Bergman projection and Calder\'on operator induced by radial weight.

Let $\omega$ and $\nu$ be radial weights on the unit disc of the complex plane such that $\omega$ admits the doubling property $\sup_{0\le r<1}\frac{\int_r^1 \omega(s)\,ds}{\int_{\frac{1+r}{2}}^1 \omega(s)\,ds}<\infty$. Consider the one weight inequality \begin{equation}\label{ab1} \|P_\omega(f)\|_{L^p_\nu}\le C\|f\|_{L^p_\nu},\quad 1

Keywords:

• classical theorem
• Mathematics
• star
• Projection (relational algebra)
• Operator (physics)
• Unit (ring theory)
• Combinatorics
• Omega

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