Add to ORKGAbstract We show that the combinatorial complexity of the union of n infinite cylin-ders in R3, having arbitrary radii, is O(n2+ε), for any ε> 0; the bound is almost tight in the worst case, thus settling a conjecture of Agarwal and Sharir (Discrete Comput. Geom. 24:645–685, 2000), who established a nearly-quadratic bound for the restricted case of nearly congruent cylinders. Our result extends, in a significant way, the result of Agarwal and Sharir (Discrete Comput. Geom. 24:645–685, 2000), in particular, a simple specialization of our analysis to the case of nearly congruent cylinders yields a nearly-quadratic bound on the complexity of the union in that case, thus significantly simplifying the analysis in Agarwal and Sharir (Discrete ...
We establish several combinatorial bounds on the complexity (number of vertices and edges) of the c...
We show that, for any $\gamma > 0$, the combinatorial complexity of the union of $n$ locally $\ga...
AbstractThis paper studies an impact of geometric degeneracies on the complexity of geometric object...
Let\Omega be a set of pairwise-disjoint polyhedral obstacles in R 3 with a total of n vertices, a...
Let be a set of pairwise-disjoint polyhedral obstacles in R 3 with a total of n vertices, and let B ...
Let be a set of pairwise-disjoint polyhedral obstacles in R 3 with a total of n vertices, and let B ...
We show that the combinatorial complexity of the union of n “fat ” tetrahedra in 3-space (i.e., tetr...
AbstractA (not necessarily convex) object C in the plane is κ-curved for some constant 0<κ<1, if it ...
A (not necessarily convex) object C in the plane is - curved for some constant , ! 1, if it has con...
We show that, for any γ> 0, the combinatorial complexity of the union of n locally γ-fat objects ...
AbstractA (not necessarily convex) object C in the plane is κ-curved for some constant 0<κ<1, if it ...
We prove a near-linear bound on the combinatorial complexity of the union of n fat convex objects in...
We show that, for any $\gamma > 0$, the combinatorial complexity of the union of $n$ locally $\ga...
A dihedral (trihedral) wedge is the intersection of two (resp. three) half-spaces in R 3. It is call...
Continuing and extending the analysis in a previous paper [9], we establish several combinatorial re...
We establish several combinatorial bounds on the complexity (number of vertices and edges) of the c...
We show that, for any $\gamma > 0$, the combinatorial complexity of the union of $n$ locally $\ga...
AbstractThis paper studies an impact of geometric degeneracies on the complexity of geometric object...
Let\Omega be a set of pairwise-disjoint polyhedral obstacles in R 3 with a total of n vertices, a...
Let be a set of pairwise-disjoint polyhedral obstacles in R 3 with a total of n vertices, and let B ...
Let be a set of pairwise-disjoint polyhedral obstacles in R 3 with a total of n vertices, and let B ...
We show that the combinatorial complexity of the union of n “fat ” tetrahedra in 3-space (i.e., tetr...
AbstractA (not necessarily convex) object C in the plane is κ-curved for some constant 0<κ<1, if it ...
A (not necessarily convex) object C in the plane is - curved for some constant , ! 1, if it has con...
We show that, for any γ> 0, the combinatorial complexity of the union of n locally γ-fat objects ...
AbstractA (not necessarily convex) object C in the plane is κ-curved for some constant 0<κ<1, if it ...
We prove a near-linear bound on the combinatorial complexity of the union of n fat convex objects in...
We show that, for any $\gamma > 0$, the combinatorial complexity of the union of $n$ locally $\ga...
A dihedral (trihedral) wedge is the intersection of two (resp. three) half-spaces in R 3. It is call...
Continuing and extending the analysis in a previous paper [9], we establish several combinatorial re...
We establish several combinatorial bounds on the complexity (number of vertices and edges) of the c...
We show that, for any $\gamma > 0$, the combinatorial complexity of the union of $n$ locally $\ga...
AbstractThis paper studies an impact of geometric degeneracies on the complexity of geometric object...