Author Info
Name
Affiliation
Papers
MENELAOS I. KARAVELAS
Dept. Applied Mathematics, University of Crete, Heraklion, Greece and Institute of Applied and Computational Mathematics, Foundation for Research and Technology-Hellas, Heraklion, Greece
28
Collaborators
Citations 
PageRank 
26
229
18.99
Referers 
Referees 
References 
335
348
326
Search Limit
100348
Title
Citations
PageRank
Year
Hardness results on Voronoi, Laguerre and Apollonius diagrams.00.342019
Qualitative Symbolic Perturbation: Two Applications Of A New Geometry-Based Perturbation Framework00.342017
Qualitative Symbolic Perturbation.00.342016
The Maximum Number Of Faces Of The Minkowski Sum Of Three Convex Polytopes50.502015
Convex hulls of spheres and convex hulls of disjoint convex polytopes10.362013
The maximum number of faces of the Minkowski sum of two convex polytopes30.482012
Tight lower bounds on the number of faces of the Minkowski sum of convex polytopes via the Cayley trick20.402011
Convex hulls of spheres and convex hulls of convex polytopes lying on parallel hyperplanes40.492011
Analysis of the Incircle predicate for the Euclidean Voronoi diagram of axes-aligned line segments00.342011
Exact geometric and algebraic computations in CGAL00.342010
Experimental evaluation and cross-benchmarking of univariate real solvers.201.162009
Convex hulls of hyperspheres and convex hulls of convex polytopes lying on parallel hyperplanes00.342009
Guarding curvilinear art galleries with edge or mobile guards via 2-dominance of triangulation graphs30.472008
Guarding curvilinear art galleries with edge or mobile guards20.392008
Guarding curvilinear art galleries with vertex or point guards70.532008
A package for exact kinetic data structures and sweepline algorithms.60.472007
G1-smooth branching surface construction from cross sections100.552007
The predicates of the Apollonius diagram: algorithmic analysis and implementation281.292006
A Computational Framework for Handling Motion110.722004
Bounding the distance between 2D parametric Bézier curves and their control polygon100.782004
The Voronoi Diagram of Planar Convex Objects150.912003
Root comparison techniques applied to computing the additively weighted Voronoi diagram70.782003
On the combinatorial complexity of euclidean Voronoi cells and convex hulls of <i>d</i>-dimensional spheres342.082003
Dynamic Additively Weighted Voronoi Diagrams in 2D241.432002
Static and kinetic geometric spanners with applications181.152001
Voronoi Diagrams for Moving Disks and Applications70.472001
Spatial shape‐preserving interpolation using ν‐splines40.782000
Interval methods for kinetic simulations80.761999