Geodesic
On a conjecture regarding identification in Hamming graphs
Ville Junnila1 ; Tero Laihonen1 ; Tuomo Lehtilä1
1University of Turku
The electronic journal of combinatorics, Tome 26 (2019) no. 2
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In 2013, Goddard and Wash studied identifying codes in the Hamming graphs $K_q^n$. They stated, for instance, that $\gamma^{ID}(K_q^n)\leqslant q^{n-1}$ for any $q$ and $n\geqslant 3$. Moreover, they conjectured that $\gamma^{ID}(K_q^3)=q^2$. In this article, we show that $\gamma^{ID}(K_q^3)\leqslant q^2-q/4$ when $q$ is a power of four, which disproves the conjecture. Goddard and Wash also gave the lower bound $\gamma^{ID}(K_q^3)\geqslant q^2-q\sqrt{q}$. We improve this bound to $\gamma^{ID}(K_q^3)\geqslant q^2-\frac{3}{2} q$. Moreover, we improve the above mentioned bound $\gamma^{ID}(K_q^n)\leqslant q^{n-1}$ to $\gamma^{ID}(K_q^n)\leqslant q^{n-k}$ for $n=3\frac{q^k-1}{q-1}$ and to $\gamma^{ID}(K_q^n)\leqslant 3q^{n-k}$ for $n=\frac{q^k-1}{q-1}$, when $q$ is a prime power. For these bounds, we utilize two classes of closely related codes, namely, the self-identifying and the self-locating-dominating codes. In addition, we show that the self-locating-dominating codes satisfy the result $\gamma^{SLD}(K_q^3)=q^2$ related to the above conjecture.
DOI : 10.37236/7828
Classification : 94B05, 94B25, 94B65, 05B15, 05C69

Ville Junnila  1   ; Tero Laihonen  1   ; Tuomo Lehtilä  1

1 University of Turku 
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     author = {Ville Junnila and Tero Laihonen and Tuomo Lehtil\"a},
     title = {On a conjecture regarding identification in {Hamming} graphs},
     journal = {The electronic journal of combinatorics},
     year = {2019},
     volume = {26},
     number = {2},
     doi = {10.37236/7828},
     zbl = {1418.94075},
     url = {http://geodesic.mathdoc.fr/articles/10.37236/7828/}
}
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Ville Junnila; Tero Laihonen; Tuomo Lehtilä. On a conjecture regarding identification in Hamming graphs. The electronic journal of combinatorics, Tome 26 (2019) no. 2. doi: 10.37236/7828

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