# Jorge Urrutia

## Affiliations: | University of Ottawa, Ottawa, ON, Canada |

##### Area:

Computer Science##### Google:

"Jorge Urrutia"
BETA: Related publications

See more...

#### Publications

You can help our author matching system! If you notice any publications incorrectly attributed to this author, please sign in and mark matches as correct or incorrect. |

Aldana-Galván I, Alegría C, Álvarez-Rebollar JL, et al. (2020) Finding minimum witness sets in orthogonal polygons Computational Geometry: Theory and Applications. 90: 101656 |

Catana JC, García A, Tejel J, et al. (2020) Plane augmentation of plane graphs to meet parity constraints Applied Mathematics and Computation. 386: 125513 |

Aldana-Galván I, Álvarez-Rebollar JL, Catana-Salazar JC, et al. (2020) Tight Bounds for Illuminating and Covering of Orthotrees with Vertex Lights and Vertex Beacons Graphs and Combinatorics. 36: 617-630 |

Aldana-Galván I, Álvarez-Rebollar JL, Catana-Salazar JC, et al. (2019) Minimizing the solid angle sum of orthogonal polyhedra Information Processing Letters. 143: 47-50 |

Cravioto-Lagos J, González-Martínez AC, Sakai T, et al. (2019) On Almost Empty Monochromatic Triangles and Convex Quadrilaterals in Colored Point Sets Graphs and Combinatorics. 35: 1475-1493 |

Alegría-Galicia C, Orden D, Palios L, et al. (2019) Capturing Points with a Rotating Polygon (and a 3D Extension) Theory of Computing Systems \/ Mathematical Systems Theory. 63: 543-566 |

Aichholzer O, Atienza N, Díaz-Báñez JM, et al. (2018) Computing Balanced Islands in Two Colored Point Sets in the Plane Information Processing Letters. 135: 28-32 |

Nakamoto A, Kawatani G, Matsumoto N, et al. (2018) Geometric quadrangulations of a polygon Electronic Notes in Discrete Mathematics. 68: 59-64 |

Aichholzer O, Fabila-Monroy R, Hurtado F, et al. (2018) Cross-sections of line configurations in R3 and (d − 2)-flat configurations in Rd Computational Geometry: Theory and Applications. 77: 51-61 |

Alegría-Galicia C, Orden D, Seara C, et al. (2018) On the Oβ-hull of a planar point set Computational Geometry: Theory and Applications. 68: 277-291 |