2018
DOI: 10.1007/s12095-018-0316-3
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Optimal bounds on codes for location in circulant graphs

Abstract: Identifying and locating-dominating codes have been studied widely in circulant graphs of type Cn(1, 2, 3, . . . , r) over the recent years. In 2013, Ghebleh and Niepel studied locatingdominating and identifying codes in the circulant graphs Cn(1, d) for d = 3 and proposed as an open question the case of d > 3. In this paper we study identifying, locating-dominating and self-identifying codes in the graphs Cn(1, d), Cn(1, d − 1, d) and Cn(1, d − 1, d, d + 1). We give a new method to study lower bounds for thes… Show more

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Cited by 7 publications
(7 citation statements)
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“…then according to Lemma 4 (in the cases n ≥ 13) together with Inequality (7) (in the cases n ∈ [11,12]) c is a special codeword, and further by Lemma 8 c is adjacent to exactly one special father, say u, which is actually sparse due to Lemma 9. We will first confirm that after applying Rule 2 and Rule 3 codeword c has the desired share.…”
Section: The First Boundmentioning
confidence: 92%
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“…then according to Lemma 4 (in the cases n ≥ 13) together with Inequality (7) (in the cases n ∈ [11,12]) c is a special codeword, and further by Lemma 8 c is adjacent to exactly one special father, say u, which is actually sparse due to Lemma 9. We will first confirm that after applying Rule 2 and Rule 3 codeword c has the desired share.…”
Section: The First Boundmentioning
confidence: 92%
“…Indeed, the inequality can be shown as follows. The cases n ∈ [11,13] are verified by substituting the corresponding value of n to the inequalities. When n ≥ 14, we observe that 1/(n − 2) + (1/6 + 1/(n − 2) − 1/(n − 5))/(n − 3) < 1/(n − 2) + 1/(6(n − 3)) < 1/10 and 1/6 + 1/(n 2 − 5n) − 2/(3n) > 1/6 − 2/(3n) > 1/10.…”
Section: The First Boundmentioning
confidence: 99%
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