On induced subgraphs of H(n,3) with maximum degree 1
Abstract
In this paper, we consider induced subgraphs of the Hamming graph H(n,3). We show that if U ⊂eq Z3n and U induces a subgraph of H(n,3) with maximum degree at most 1 then 1. If U is disjoint from a maximum size independent set of H(n,3) then |U| ≤ 3n-1+1. Moreover, all such U with size 3n-1+1 are isomorphic to each other. 2. For n ≥ 6, there exists such a U with size |U| = 3n-1+18 and this is optimal for n = 6. 3. If U \x, x+e1, x+2e1\ φ for all x ∈ Z3n then |U| ≤ 3n-1 + 81.
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