For a positive integer r and a vertex v of a graph G, let IG(r)(v) denote the set of all independent sets of G that have exactly r elements and contain v. Hurlbert and Kamat conjectured that for any r and any tree T, there exists a leaf z of T such that ∣IT(r)(v)∣≤∣IT(r)(z)∣ for each vertex v of T. They proved the conjecture for r≤4. For any k≥3, we construct a tree Tk that has a vertex x such that x is not a leaf of Tk, ∣ITk(r)(z)∣<∣ITk(r)(x)∣ for any leaf z of Tk and any 5≤r≤2k+1, and 2k+1 is the largest integer s for which ITk(s)(x) is non-empty. Therefore, the conjecture is not true for r≥5.