The weighted weak local Hardy spaces (Q2453646)

Local Hardy spaces, \(h^p\), have been investigated since the beginnings of the modern theory of Hardy spaces on \(\mathbb R^n\). Their study was extended to weighted Hardy spaces, \(h^p_{\omega}, \omega \in A_p\), where \(A_p\) is the Muckenhoupt class of weights. Weak Hardy spaces are defined by replacing the condition that a maximal function belongs to \(L^p\) by the condition that it belongs to weak \(L^p\), or \(L^{p, \infty}\). The author considers weighted weak local Hardy spaces where now the weights also satisfy a local condition. Instead of \(\omega \in A_p\), which requires the existence of a constant \[ A_p(\omega) = \sup_Q \frac{1}{|Q|^p} \left( \int_Q \omega(x) \, dx \right) \left( \int_Q \omega(x)^{-p^{\prime}/p} (x) \, dx \right)^{p/p^{\prime}} < \infty, \] the sup for \(A_p^{ \text{loc}}(\omega) \) is taken over small cubes, \(|Q| \leq 1\), although as the author indicates the size does not matter and it is equivalent to consider cubes with \(|Q| \leq C\) for some \(C>0\). The spaces considered are \(h^p_{\omega}\), but now \(\omega \in A_p^{ \text{loc}} \). The author shows there is a weighted atomic decomposition of these spaces, and that truncated Riesz transforms and classical pseudo-differential operators are bounded on the weighted weak local Hardy spaces, even for a slightly larger class of weights.