Problem kletk / The cage problem
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Naziv Tittle |
Problem kletk / The cage problem |
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Akronim Acronim |
BI-US/19-21-009 |
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Opis Description |
(SI) Za dano stopnjo k in ožino g obravnavamo (k,g) graf z najmanjšim številom vozlišč. Razširitveni graf je graf, ki ima močne lastnosti povezanosti. Konstrukcije razširitvenih grafov imajo več aplikacij za teorijo zahtevnosti, načrtovanje računalniških omrežij in teorijo kod za odpravljanje napak. V tej raziskavi bomo obravnavali razmerje med ožino grafa in njegovimi razširitvenimi lastnosti. (EN) For a given degree k and a bottleneck g, consider the (k,g) graph with the minimum number of nodes. An extensible graph is a graph that has strong connectivity properties. Constructions of extension graphs have several applications to complexity theory, computer network design, and the theory of error-correcting codes. In this research, we will consider the relationship between the tightness of a graph and its extension properties. |
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Trajanje Duration |
01/10/2019 - 30/09/2021 |
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Vodja projekta Project Leader |
dr. Slobodan Filipovski |
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Sodelujoče organizacije Participating organizations |
Mississippi State University |
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Oddelek Department |
Oddelek za matematiko IAM |