Naslov: | Packings in bipartite prisms and hypercubes |
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Avtorji: | ID Brešar, Boštjan (Avtor) ID Klavžar, Sandi (Avtor) ID Rall, Douglas F. (Avtor) |
Datoteke: | URL - Izvorni URL, za dostop obiščite https://www.sciencedirect.com/science/article/pii/S0012365X24000062
PDF - Predstavitvena datoteka, prenos (231,57 KB) MD5: BC4297894DBBF84BEE1923433A1D0D53
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Jezik: | Angleški jezik |
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Tipologija: | 1.01 - Izvirni znanstveni članek |
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Organizacija: | IMFM - Inštitut za matematiko, fiziko in mehaniko
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Povzetek: | The $2$-packing number $\rho_2(G)$ of a graph $G$ is the cardinality of a largest $2$-packing of $G$ and the open packing number $\rho^{\rm o}(G)$ is the cardinality of a largest open packing of $G$, where an open packing (resp. $2$-packing) is a set of vertices in $G$ no two (closed) neighborhoods of which intersect. It is proved that if $G$ is bipartite, then $\rho^{\rm o}(G\Box K_2) = 2\rho_2(G)$. For hypercubes, the lower bounds $\rho_2(Q_n) \ge 2^{n - \lfloor \log n\rfloor -1}$ and $\rho^{\rm o}(Q_n) \ge 2^{n - \lfloor \log (n-1)\rfloor -1}$ are established. These findings are applied to injective colorings of hypercubes. In particular, it is demonstrated that $Q_9$ is the smallest hypercube which is not perfect injectively colorable. It is also proved that $\gamma_t(Q_{2^k}\times H) = 2^{2^k-k}\gamma_t(H)$, where $H$ is an arbitrary graph with no isolated vertices. |
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Ključne besede: | 2-packing number, open packing number, bipartite prism, hypercube, injective coloring, total domination number |
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Status publikacije: | Objavljeno |
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Verzija publikacije: | Objavljena publikacija |
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Datum objave: | 01.04.2024 |
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Leto izida: | 2024 |
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Št. strani: | 6 str. |
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Številčenje: | Vol. 347, iss. 4, article no. 113875 |
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PID: | 20.500.12556/DiRROS-18210 |
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UDK: | 519.17 |
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ISSN pri članku: | 0012-365X |
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DOI: | 10.1016/j.disc.2024.113875 |
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COBISS.SI-ID: | 181387523 |
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Datum objave v DiRROS: | 19.02.2024 |
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Število ogledov: | 389 |
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Število prenosov: | 139 |
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Metapodatki: | |
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