We present subquadratic algorithms in the algebraic decision-tree model for several 3SUM-hard geometric problems, all of which can be reduced to the following question: Given two sets A, B, each consisting of n pairwise disjoint segments in the plane, and a set C of n triangles in the plane, we want to count, for each triangle Δ∈C, the number of intersection points between the segments of A and those of B that lie in Δ. We present solutions in the algebraic decision-tree model whose cost is O(n60/31+ε), for any ε>0. Our approach is based on a primal-dual range searching mechanism, which exploits the multi-level polynomial partitioning machinery recently developed by Agarwal et al. (2021) [3]. A key step in the procedure is a variant of p...
The 3SUM problem is to decide, given a set of n real numbers, whether any three sum to zero. It is w...
We give an algorithmic and lower-bound framework that facilitates the construction of subexponential...
This thesis consists of two parts dealing with combinatorial and computational problems in geometry,...
We present subquadratic algorithms in the algebraic decision-tree model for several 3SUM-hard geomet...
The 3SUM problem asks if an input n-set of real numbers contains a triple whose sum is zero. We cons...
The 3SUM problem asks if an input n-set of real numbers contains a triple whose sum is zero. We cons...
The 3SUM problem asks if an input n-set of real numbers contains a triple whose sum is zero. We qual...
AbstractWe present an algorithm that efficiently counts all intersecting triples among a collection ...
We give an algorithmic and lower-bound framework that facilitates the construction of subexponential...
We give an algorithmic and lower bound framework that facilitates the construction of subexponential...
We describe a new method for decomposing planar sets of segments and points. Using this method we ob...
ABSTRACT We present an algorithm that efficiently counts all intersecting triples among a collection...
We discuss the computational complexity of special cases of the 3-dimensional (axial) assignment pro...
This thesis discusses four problems in computational geometry. In traditional colored range-searc...
Given two polygonal curves in the plane, there are many ways to define a notion of similarity betwee...
The 3SUM problem is to decide, given a set of n real numbers, whether any three sum to zero. It is w...
We give an algorithmic and lower-bound framework that facilitates the construction of subexponential...
This thesis consists of two parts dealing with combinatorial and computational problems in geometry,...
We present subquadratic algorithms in the algebraic decision-tree model for several 3SUM-hard geomet...
The 3SUM problem asks if an input n-set of real numbers contains a triple whose sum is zero. We cons...
The 3SUM problem asks if an input n-set of real numbers contains a triple whose sum is zero. We cons...
The 3SUM problem asks if an input n-set of real numbers contains a triple whose sum is zero. We qual...
AbstractWe present an algorithm that efficiently counts all intersecting triples among a collection ...
We give an algorithmic and lower-bound framework that facilitates the construction of subexponential...
We give an algorithmic and lower bound framework that facilitates the construction of subexponential...
We describe a new method for decomposing planar sets of segments and points. Using this method we ob...
ABSTRACT We present an algorithm that efficiently counts all intersecting triples among a collection...
We discuss the computational complexity of special cases of the 3-dimensional (axial) assignment pro...
This thesis discusses four problems in computational geometry. In traditional colored range-searc...
Given two polygonal curves in the plane, there are many ways to define a notion of similarity betwee...
The 3SUM problem is to decide, given a set of n real numbers, whether any three sum to zero. It is w...
We give an algorithmic and lower-bound framework that facilitates the construction of subexponential...
This thesis consists of two parts dealing with combinatorial and computational problems in geometry,...