$$A_p$$ weights on nonhomogeneous trees equipped with measures of exponential growth

Alessandro Ottazzi, Federico Santagati, Maria Vallarino
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Abstract

This paper aims to study \(A_p\) weights in the context of a class of metric measure spaces with exponential volume growth, namely infinite trees with root at infinity equipped with the geodesic distance and flow measures. Our main result is a Muckenhoupt Theorem, which is a characterization of the weights for which a suitable Hardy–Littlewood maximal operator is bounded on the corresponding weighted \(L^p\) spaces. We emphasise that this result does not require any geometric assumption on the tree or any condition on the flow measure. We also prove a reverse Hölder inequality in the case when the flow measure is locally doubling. We finally show that the logarithm of an \(A_p\) weight is in BMO and discuss the connection between \(A_p\) weights and quasisymmetric mappings.

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配备指数增长措施的非均质树的 $$A_p$$ 权重
本文旨在研究一类具有指数体积增长的度量空间背景下的\(A_p\)权重,这一类度量空间是根在无穷远处的无限树,配备有大地距离和流度量。我们的主要结果是一个穆肯霍普特定理(Muckenhoupt Theorem),它描述了在相应的加权 \(L^p\) 空间上合适的哈代-利特尔伍德最大算子有界的权重。我们强调,这一结果不需要任何关于树的几何假设,也不需要任何关于流度量的条件。我们还证明了流动度量局部加倍情况下的反向赫尔德不等式。最后我们证明了 \(A_p\) 权重的对数在 BMO 中,并讨论了 \(A_p\) 权重和准对称映射之间的联系。
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