A note on sequences variant of irregularity strength for hypercubes
Abstract
Let f: E \1,2,…,k\ be an edge coloring of the n - dimensional hypercube Hn. By the palette at a vertex v we mean the sequence (f(e1(v)), f(e1(v)),…, f(en(v))), where ei(v) is the i - dimensional edge incident to v. In the paper, we show that two colors are enough to distinguish all vertices of the n - dimensional hypercube Hn (n ≥ 2) by their palettes. We also show that if f is a proper edge coloring of the hypercube Hn (n≥ 5), then n colors suffice to distinguish all vertices by their palettes.
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