2019
DOI: 10.7151/dmgt.2174
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Generalized sum list colorings of graphs

Abstract: A (graph) property P is a class of simple finite graphs closed under isomorphisms. In this paper we consider generalizations of sum list colorings of graphs with respect to properties P. If to each vertex v of a graph G a list L(v) of colors is assigned, then in an (L, P)-coloring of G every vertex obtains a color from its list and the subgraphs of G induced by vertices of the same color are always in P. The P-sum choice number χ P sc (G) of G is the minimum of the sum of all list sizes such that, for any assi… Show more

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Cited by 3 publications
(6 citation statements)
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“…Several generalizations, e.g. sumlist colourings in which colour classes need not be edgeless were investigated in [8,9,16]. Effectively computable upper bound on the minimum sum of the list sizes for graphs we find in [14].…”
Section: Sum-list Choosabilitymentioning
confidence: 99%
“…Several generalizations, e.g. sumlist colourings in which colour classes need not be edgeless were investigated in [8,9,16]. Effectively computable upper bound on the minimum sum of the list sizes for graphs we find in [14].…”
Section: Sum-list Choosabilitymentioning
confidence: 99%
“…A colouring of a graph G with respect to a class R of graphs is an assignment of colours to the vertices of G so that each colour class induces in G a graph in R. Note that, immediately by definitions, an assignment of colours to vertices of G is a colouring of G with respect to an induced hereditary class R of graphs if and only if it is a proper colouring of H(G, R). The problem of sum-list colouring of graphs with respect to induced hereditary class R of graphs was introduced in 2016 (see [6]) and it was also investigated in [5,11,15]. Given a function f : V (G) −→ N and an induced hereditary class R of graphs, a graph G is (f, R)-choosable if for every f -assignment L there is an L-colouring of G with respect to R. The R-sum-choice-number χ R sc (G) of G is defined to be the minimum of v∈V (G) f (v) taken over all f such that G is (f, R)-choosable.…”
Section: E Drgas-burchardt and E Sidorowiczmentioning
confidence: 99%
“…It is known that paths, cycles, trees, complete graphs, and all graphs on at most four vertices are sc-greedy. All sc-greedy graphs on five vertices were determined by Lastrina [16] and on six vertices by Kemnitz et al [13]. Moreover, all sc-greedy complete multipartite graphs [12], wheels [14], and broken wheels [8] were determined.…”
Section: Introductionmentioning
confidence: 99%
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