On the SIG dimension of trees under L∞ metric

Abstract

We study the SIG dimension of trees under L∞ metric and answer an open problem posed by Michael and Quint (Discrete Applied Mathematics: 127, pages 447-460, 2003). Let T be a tree with atleast two vertices. For each v∈ V(T), let leaf-degree(v) denote the number of neighbours of v that are leaves. We define the maximum leaf-degree as α(T) = x ∈ V(T) leaf-degree(x). Let S = \v∈ V(T) | leaf-degree(v) = α\. If |S| = 1, we define β(T) = α(T) - 1. Otherwise define β(T) = α(T). We show that for a tree T, SIG∞(T) = 2(β + 2) where β = β (T), provided β is not of the form 2k - 1, for some positive integer k ≥ 1. If β = 2k - 1, then SIG∞ (T) ∈ \k, k+1\. We show that both values are possible.