Improved bounds for radio -chromatic number of hypercube .
An L(2, 1)-coloring (or labeling) of a graph G is a vertex coloring f : V (G) → Z+ ∪ {0} such that |f(u) − f(v)| ≥ 2 for all edges uv of G, and |f(u)−f(v)| ≥ 1 if d(u, v) = 2, where d(u, v) is the distance between vertices u and v in G. The span of an L(2, 1)-coloring is the maximum color (or label) assigned by it. The span of a graph G is the smallest integer λ such that there exists an L(2, 1)-coloring of G with span λ. An L(2, 1)-coloring of a graph with span equal to the span of the graph is...
We observe that a lobster with diameter at least five has a unique path with the property that besides the adjacencies in both and are adjacent to the centers of at least one , where , and each , , is adjacent at most to the centers of some , where . This path is called the central path of the lobster. We call an even branch if is nonzero even, an odd branch if is odd and a pendant branch if . In the existing literature only some specific classes of lobsters have been found...
Chartrand et al. (2004) have given an upper bound for the nearly antipodal chromatic number as for and have found the exact value of for . Here we determine the exact values of for . They are for and for . The exact value of the radio antipodal number for the path of order has been determined by Khennoufa and Togni in 2005 as for and for . Although the value of determined there is correct, we found a mistake in the proof of the lower bound when (Theorem ). However,...
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