Precoloring Extension. Ii. Graphs Classes Related to Bipartite Graphs
نویسنده
چکیده
We continue the study of the following general problem on vertex col-orings of graphs. Suppose that some vertices of a graph G are assigned to some colors. Can this \precoloring" be extended to a proper coloring of G with at most k colors (for some given k)? Here we investigate the complexity status of precoloring extendibility on some graph classes which are related to bipartite graphs, giving a complete solution for graphs with \co-chromatic number" 2, i.e., admitting a partition V = V 1 V 2 of the vertex set V such that each V i induces a complete subgraph or an independent set. On one hand, we show that our problem is closely related to the bipartite maximum matching problem that leads to a polynomial solution for split graphs and for the complements of bipartite graphs. On the other hand, the problem turns out to be NP-complete on bipartite graphs.
منابع مشابه
Precoloring Extension . Ii . Graphs Classes Related to Bipartite Graphsm
We continue the study of the following general problem on vertex col-orings of graphs. Suppose that some vertices of a graph G are assigned to some colors. Can this \precoloring" be extended to a proper coloring of G with at most k colors (for some given k)? Here we investigate the complexity status of precoloring extendibility on some graph classes which are related to bipartite graphs, giving...
متن کاملGraphs Classes Related to Bipartite Graphs
We continue the study of the following general problem on vertex colorings of graphs. Suppose that some vertices of a graph G are assigned to some colors. Can this “precoloring” be extended to a proper coloring of G with at most k colors (for some given k)? Here we investigate the complexity status of precoloring extendibility on some graph classes which are related to bipartite graphs, giving ...
متن کاملNP completeness of the edge precoloring extension problem on bipartite graphs
We show that the following problem is NP complete: Let G be a cubic bipartite graph and f be a precoloring of a subset of edges of G using at most three colors. Can f be extended to a proper edge 3-coloring of the entire graph G? This result provides a natural counterpart to classical Holyer's result on edge 3-colorability of cubic graphs and a strengthening of results on precoloring extension ...
متن کاملThe d-precoloring problem for k-degenerate graphs
In this paper we deal with the d-Precoloring Extension problem, (d-PrExt), in various classes of graphs. The d-PrExt problem is the special case of precoloring extension problem where, for a fixed constant d, input instances are restricted to contain at most d precolored vertices for every available color. The goal is to decide if there exists an extension of given precoloring using only availa...
متن کاملHard coloring problems in low degree planar bipartite graphs
In this paper we prove that the PRECOLORING EXTENSION problem on graphs of maximum degree 3 is polynomially solvable, but even its restricted version with 3 colors is NP-complete on planar bipartite graphs of maximum degree 4. The restricted version of LIST COLORING, in which the union of all lists consists of 3 colors, is shown to be NP-complete on planar 3-regular bipartite graphs. © 2006 Els...
متن کامل