S2. Diagram grafu, matica grafu
Abschlussbedingungen
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)
![](data:image/png;base64,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)
5.
Priraďte grafom
štvorcovú maticu susednosti a maticu
incidencie. Matica incidencie priraďuje dvom rôznym hranám
číslo
ak majú spoločný vrchol.
![](data:image/png;base64,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)
6.
Nakreslite rôzne diagramy
grafu, ktorý reprezentuje kocku.
Fällig: Sonntag, 27. Februar 2022, 23:59
Päť kamarátov si na Vianoce dalo darčeky. Každý dal darčeky trom svojim kamarátom. Ukážte, že nie je možné, aby každý dostal darčeky práve od tých troch kamarátov, ktorým darčeky sám dal.
Je možné nakresliť diagramy grafov s piatimi vrcholmi a desiatimi hranami, v ktorých sa žiadne dve hrany nebudú „pretínať“?
Nakreslite iný diagram grafu, v ktorom sa
a) najmenej hrán "pretína"- Nájdite čo najväčšiu množinu nezávislých vrcholov v grafe. Vrcholy nazývame nezávislé ak nie sú susedné.
b) najviac hrán "pretína"
- a)
- b)
a) grafu G1
b)
grafu G2
- 28. Januar 2016, 07:40
- 28. Januar 2016, 07:40
- 20. Februar 2018, 20:42