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Factorizations of properties of graphs

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Broere I., Teboho Moagi S., Mihók P., Vasky R.
Discussiones Mathematicae Graph Theory
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1999
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tom 19
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nr 2
167-174
EN
A property of graphs is any isomorphism closed class of simple graphs. For given properties of graphs 𝓟₁,𝓟₂,...,𝓟ₙ a vertex (𝓟₁, 𝓟₂, ...,𝓟ₙ)-partition of a graph G is a partition {V₁,V₂,...,Vₙ} of V(G) such that for each i = 1,2,...,n the induced subgraph $G[V_i]$ has property $𝓟_i$. The class of all graphs having a vertex (𝓟₁, 𝓟₂, ...,𝓟ₙ)-partition is denoted by 𝓟₁∘𝓟₂∘...∘𝓟ₙ. A property 𝓡 is said to be reducible with respect to a lattice of properties of graphs 𝕃 if there are n ≥ 2 properties 𝓟₁,𝓟₂,...,𝓟ₙ ∈ 𝕃 such that 𝓡 = 𝓟₁∘𝓟₂∘...∘𝓟ₙ; otherwise 𝓡 is irreducible in 𝕃. We study the structure of different lattices of properties of graphs and we prove that in these lattices every reducible property of graphs has a finite factorization into irreducible properties.
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Uniquely partitionable graphs

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Bucko J., Frick M., Mihók P., Vasky R.
Discussiones Mathematicae Graph Theory
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1997
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tom 17
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nr 1
103-113
EN
Let 𝓟₁,...,𝓟ₙ be properties of graphs. A (𝓟₁,...,𝓟ₙ)-partition of a graph G is a partition of the vertex set V(G) into subsets V₁, ...,Vₙ such that the subgraph $G[V_i]$ induced by $V_i$ has property $𝓟_i$; i = 1,...,n. A graph G is said to be uniquely (𝓟₁, ...,𝓟ₙ)-partitionable if G has exactly one (𝓟₁,...,𝓟ₙ)-partition. A property 𝓟 is called hereditary if every subgraph of every graph with property 𝓟 also has property 𝓟. If every graph that is a disjoint union of two graphs that have property 𝓟 also has property 𝓟, then we say that 𝓟 is additive. A property 𝓟 is called degenerate if there exists a bipartite graph that does not have property 𝓟. In this paper, we prove that if 𝓟₁,..., 𝓟ₙ are degenerate, additive, hereditary properties of graphs, then there exists a uniquely (𝓟₁,...,𝓟ₙ)-partitionable graph.
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