Schwartz-Zippel bounds for two-dimensional products
Schwartz-Zippel bounds for two-dimensional products, Discrete Analysis 2017:20, A famous open problem in combinatorial geometry is Erdős's unit-distances problem, which asks the following: given a subset $A\subset\mathbb R^2$ of size $n$, how many pairs $(a,b)\in A^2$ can there be with $d(a,b...
Main Authors: | Hossein Nassajian Mojarrad, Thang Pham, Claudiu Valculescu, Frank de Zeeuw |
---|---|
Format: | Article |
Language: | English |
Published: |
Diamond Open Access Journals
|
Series: | Discrete Analysis |
Online Access: | http://discrete-analysis.scholasticahq.com/article/2750-schwartz-zippel-bounds-for-two-dimensional-products.pdf |
Similar Items
-
An Improved Upper Bound for the Erdős-Szekeres Conjecture
by: Mojarrad, Hossein Nassajian, et al.
Published: (2017) -
Dual characterization of the Dieudonne-Schwartz theorem on bounded sets
by: C. Bosch, et al.
Published: (1983-01-01) -
Entrevista: Yves Schwartz Interview: Yves Schwartz
Published: (2006-09-01) -
The Schwartz Space: Tools for Quantum Mechanics and Infinite Dimensional Analysis
by: Jeremy Becnel, et al.
Published: (2015-06-01) -
Comparison of the performance of the updated Schwartz, combined Schwartz and the Grubb glomerular filtration rate equations in a general pediatric population
by: Alaleh Gheissari, et al.
Published: (2014-01-01)