Biharmonic Green Functions on Homogeneous Trees

8 1. Introduction. Let T be a homogeneous isotropic tree of order q+ 1, q z 2 . That is, T is a connected graph, i t has no non-trivial loops, and a t each node (I + I edges project. Thus each node has exactly q + 1 nearest neighbors, between any two nodes there is a unique shortest path (a geodesi

The family is really taking shape. A “ family” happens when people commit themselves to each other for the long haul. It doesn't always look like we grew up believing it would look. Maggie and Zelia and Betty and her special daughter are coming together in the ways that work for all of them. I ho

For each complex number z, we construct an operator H defined on the space z of all complex-valued functions on a homogeneous tree. This operator has the Ž property that if a function f is harmonic i.e., the local averaging operator fixes the . Ž . Ž values of f , then H f is z-harmonic i.e., the lo

Let \(X\) be a homogeneous tree. We study the heat diffusion process associated with the nearest neighbour isotropic Markov operator on \(X\). In particular it is shown that the heat maximal operator is weak type \((1,1)\) and strong type \((p, p)\). for every \(1<p<\infty\). We estimate the asympto