INVESTIGADORES
BONOMO flavia
congresos y reuniones científicas
Título:
On the bend number of circular-arc graphs as edge intersection graphs of paths on a grid
Autor/es:
ALCÓN, LILIANA; BONOMO, FLAVIA; DURÁN, GUILLERMO; GUTIERREZ, MARISA; MAZZOLENI, MARÍA PIA; RIES, BERNARD; VALENCIA-PABON, MARIO
Lugar:
Fortaleza
Reunión:
Simposio; Latin-American Algorithms, Graphs and Optimization Symposium (LAGOS); 2015
Resumen:
Golumbic, Lipshteyn and Stern proved that every graph can be represented as the edge intersection graph of paths on a grid, i.e., one can associate to each vertex of the graph a nontrivial path on a grid such that two vertices are adjacent if and only if the corresponding paths share at least one edge of the grid. For a nonnegative integer $k$, $B_k$-EPG graphs are defined as graphs admitting a model in which each path has at most $k$ bends. Circular-arc graphs are intersection graphs of open arcs of a circle. It is easy to see that every circular-arc graph is $B_4$-EPG, by embedding the circle into a rectangle of the grid. In this paper we prove that every circular-arc graph is $B_3$-EPG, but if we restrict ourselves to rectangular representations there exist some graphs that require paths with four bends. We also show that normal circular-arc graphs admit rectangular representations with at most two bends per path. Moreover, we characterize graphs admitting a rectangular representation with at most one bend per path by forbidden induced subgraphs, and we show that they are a subclass of normal Helly circular-arc graphs.