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We prove that the number of edges of a multigraph $G$ with $n$ vertices is at most $O(n^2log n)$, provided that any two edges cross at most once, parallel edges are noncrossing, and the lens enclosed by every pair of parallel edges in $G$ contains at least one vertex. As a consequence, we prove the following extension of the Crossing Lemma of Ajtai, Chvatal, Newborn, Szemeredi and Leighton, if $G$ has $e geq 4n$ edges, in any drawing of $G$ with the above property, the number of crossings is $Omegaleft(frac{e^3}{n^2log(e/n)}right)$. This answers a question of Kaufmann et al. and is tight up to the logarithmic factor.
We prove a new upper bound on the number of $r$-rich lines (lines with at least $r$ points) in a `truly $d$-dimensional configuration of points $v_1,ldots,v_n in mathbb{C}^d$. More formally, we show that, if the number of $r$-rich lines is significan
Given a multigraph $G=(V,E)$, the {em edge-coloring problem} (ECP) is to color the edges of $G$ with the minimum number of colors so that no two adjacent edges have the same color. This problem can be naturally formulated as an integer program, and i
An oriented k-uniform hypergraph (a family of ordered k-sets) has the ordering property (or Property O) if for every linear order of the vertex set, there is some edge oriented consistently with the linear order. We find bounds on the minimum number of edges in a hypergraph with Property O.
A basic combinatorial invariant of a convex polytope $P$ is its $f$-vector $f(P)=(f_0,f_1,dots,f_{dim P-1})$, where $f_i$ is the number of $i$-dimensional faces of $P$. Steinitz characterized all possible $f$-vectors of $3$-polytopes and Grunbaum cha
This paper considers an edge minimization problem in saturated bipartite graphs. An $n$ by $n$ bipartite graph $G$ is $H$-saturated if $G$ does not contain a subgraph isomorphic to $H$ but adding any missing edge to $G$ creates a copy of $H$. More th