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Line 3: Questions about line graphs of hypergraphs are often generalizations of questions about line graphs of graphs. For instance, a hypergraph whose edges all have size ''k'' is called ''k''' ''-uniform'''. (A 2-uniform hypergraph is a graph.). In hypergraph theory, it is often natural to require that hypergraphs be ''k''-uniform. Every graph is the line graph of some hypergraph, but, given a fixed edge size ''k'', not every graph is a line graph of some ''k''-uniform hypergraph. A main problem is to characterize those that are, for each ''k'' ≥ 3. A hypergraph is '''linear''' if each pair of hyperedges intersects in at most one vertex. Every graph is the line graph, not only of some hypergraph, but of some linear hypergraph {{harv\|Berge\|1989}}. ==Line graphs of ''k''-uniform hypergraphs, ''k'' ≥ 3== Line 112: \| title = Edge intersection of linear 3-uniform hypergraphs \| journal = Discrete Mathematics \| volume = 309 \| pages = 3500–3517 \| year = 2009 \| doi:=10.1016/j.disc.2007.12.082}}. {{citation Line 122: {{citation \| first = Vitaly I. \| last = Voloshin \| title = "Introduction to Graph and Hypergraph Theory \| ___location = New York \| publisher = Nova Science Publishers, Inc. \| year = 2009 \| id = {{MathSciNet \| id = 2514872}}}}

Line graph of a hypergraph: Difference between revisions