Abstract
Flapan, Naimi and Pommersheim (2001) showed that every spatial embedding of , the complete graph on ten vertices, contains a nonsplit three-component link; that is, is intrinsically triple-linked in . The work of Bowlin and Foisy (2004) and Flapan, Foisy, Naimi, and Pommersheim (2001) extended the list of known intrinsically triple-linked graphs in to include several other families of graphs. In this paper, we will show that while some of these graphs can be embedded 3-linklessly in , the graph is intrinsically triple-linked in .
Citation
Jared Federman. Joel Foisy. Kristin McNamara. Emily Stark. "Intrinsically triple-linked graphs in $\mathbb{R}P^3$." Involve 10 (1) 1 - 20, 2017. https://doi.org/10.2140/involve.2017.10.1
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