Groups of isometries of a tree and the Kunze-Stein phenomenon (Q1103809)

A locally compact group G is said to be a Kunze-Stein group if, for \(1<p<2\), \(L^ p(G)*L^ 2(G)\subset L^ 2(G).\) The author proves that a group of isometries ofa homogeneous or semi-homogeneous tree which acts transitively on its boundary is a Kunze-Stein group.