Let HΟpβ(C+β),1\leq p <+\infty,0\leq \sigma < +\infty, be the space of all functions f analytic in the half plane \mathbb{C}_{+}= \{ z: \text {Re} z>0 \} and such that \|f\|:=\sup\limits_{\varphi\in (-\frac{\pi}{2};\frac{\pi}{2})}\left\{\int\limits_0^{+\infty} |f(re^{i\varphi})|^pe^{-p\sigma r|\sin \varphi|}dr\right\}^{1/p}<+\infty. We obtain some properties and description of zeros for functions from the space \bigcap\limits_{\sigma>0} H^{p}_{\sigma}(\mathbb C_{+}).</jats:p
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