A Littlewood-Paley theorem for subharmonic functions (Q2724047)

The main result of this paper is as follows:NEWLINENEWLINENEWLINETheorem. Let \(u \geq 0\) be a subharmonic function in the unit disc \(D\) and let \(\mu\) be the Riesz measure of \(u\). If \(q \geq 1\) and \(I(u^q) = \sup_ {0<r<1} \int_0^{2\pi} [u(re^{it})]^q dt < \infty\) then there holds the inequality NEWLINE\[NEWLINE\int_D(1-|z|)^{-1}(\mu(E_\varepsilon(z)))^q dm(z) \leq C_q (I(u^q)-u(0)^q),NEWLINE\]NEWLINE where \(\varepsilon = 1/6\) and \(E_\varepsilon (z) =\{w:|w-z |< \varepsilon (1-|z |)\}\).NEWLINENEWLINENEWLINEA consequence of the theorem is the Littlewood-Paley inequality for harmonic functions.NEWLINENEWLINENEWLINEIn the case \(0<q<1\) the author proves a theorem in the oposite direction.