Wyniki wyszukiwania dla: VERTEX RANKING

• Minimum vertex ranking spanning tree problem for chordal and proper interval graphs

  Publikacja

  • D. Dereniowski

  - Discussiones Mathematicae Graph Theory - Rok 2009

  W pracy rozważamy problem szukania, dla danego grafu prostego, drzewa spinającego, którego uporządkowana liczba chromatyczna jest minimalna. K.~Miyata i inni dowiedli w [Np-hardness proof and an approximation algorithm for the minimum vertex ranking spanning tree problem,Discrete Appl. Math. 154 (2006) 2402-2410], że odpowiedni problem decyzyjny jest NP-trudny już w przypadku pytania o istnienie uporządkowanego 4-pokolorowania....

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• On-line ranking of split graphs

  Publikacja

  • P. Borowiecki
  • D. Dereniowski

  - DISCRETE MATHEMATICS AND THEORETICAL COMPUTER SCIENCE - Rok 2013

  A vertex ranking of a graph G is an assignment of positive integers (colors) to the vertices of G such that each path connecting two vertices of the same color contains a vertex of a higher color. Our main goal is to find a vertex ranking using as few colors as possible. Considering on-line algorithms for vertex ranking of split graphs, we prove that the worst case ratio of the number of colors used by any on-line ranking algorithm...

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• Parity vertex colouring of graphs

  Publikacja

  • P. Borowiecki
  • K. Budajova
  • S. Jendrol
  • S. Krajci

  - Discussiones Mathematicae Graph Theory - Rok 2011

  A parity path in a vertex colouring of a graph is a path along which each colour is used an even number of times. Let Xp(G) be the least number of colours in a proper vertex colouring of G having no parity path. It is proved that for any graph G we have the following tight bounds X(G) <= Xp(G) <=|V(G)|− a(G)+1, where X(G) and a(G) are the chromatic number and the independence number of G, respectively. The bounds are improved for...

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