We consider a homogeneous tree endowed with a nondoubling flow measure $\mu$ of exponential growth and a probabilistic Laplacian $\mathcal{L}$ self-adjoint with respect to $\mu$. We prove that the maximal characterization in terms of the heat and the Poisson semigroup of $\mathcal{L}$ and the Riesz transform characterization of the atomic Hardy space introduced in a previous work fail.
Boundedness of a Riesz transform on the homogeneous tree
Riesz transform for a flow Laplacian on homogeneous trees
Riesz transform characterization of H^1 spaces associated with certain Laguerre expansions
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