Spencer\u27s theorem asserts that, for any family of n subsets of ground set of size n, the elements of the ground set can be "colored" by the values +1 or -1 such that the sum of every set is O(sqrt(n)) in absolute value. All existing proofs of this result recursively construct "partial colorings", which assign +1 or -1 values to half of the ground set. We devise the first algorithm for Spencer\u27s theorem that directly computes a coloring, without recursively computing partial colorings
We consider the problem of finding a low discrepancy coloring for sparse set systems where each elem...
AbstractBeck and Fiala conjectured in 1981 that for any set system S of maximum degreeton a finite g...
Thesis (Ph.D.)--University of Washington, 2017-06This thesis deals with algorithmic problems in disc...
We consider the problem of finding a low discrepancy coloring for sparse set systems where each elem...
Minimizing the discrepancy of a set system is a fundamental problem in combinatorics. One of the cor...
We consider the problem of finding a low discrepancy coloring for sparse set systems where each elem...
We consider the problem of finding a low discrepancy coloring for sparse set systems where each elem...
Given a set system (V, S), V = {1,..., n} and S = {S1,...,Sm}, the minimum discrepancy problem is to...
We consider the problem of finding a low discrepancy coloring for sparse set systems where each ele...
A celebrated theorem of Spencer states that for every set system $S_1,\dots, S_m \subseteq [n]$, the...
An important result in discrepancy due to Banaszczyk states that for any set of n vectors in Rm of ℓ...
We consider the problem of finding a low discrepancy coloring for sparse set systems where each elem...
We consider the problem of finding a low discrepancy coloring for sparse set systems where each elem...
We consider the problem of finding a low discrepancy coloring for sparse set systems where each elem...
AbstractBeck and Fiala conjectured in 1981 that for any set system S of maximum degreeton a finite g...
Thesis (Ph.D.)--University of Washington, 2017-06This thesis deals with algorithmic problems in disc...
We consider the problem of finding a low discrepancy coloring for sparse set systems where each elem...
Minimizing the discrepancy of a set system is a fundamental problem in combinatorics. One of the cor...
We consider the problem of finding a low discrepancy coloring for sparse set systems where each elem...
We consider the problem of finding a low discrepancy coloring for sparse set systems where each elem...
Given a set system (V, S), V = {1,..., n} and S = {S1,...,Sm}, the minimum discrepancy problem is to...
We consider the problem of finding a low discrepancy coloring for sparse set systems where each ele...
A celebrated theorem of Spencer states that for every set system $S_1,\dots, S_m \subseteq [n]$, the...
An important result in discrepancy due to Banaszczyk states that for any set of n vectors in Rm of ℓ...
We consider the problem of finding a low discrepancy coloring for sparse set systems where each elem...
We consider the problem of finding a low discrepancy coloring for sparse set systems where each elem...
We consider the problem of finding a low discrepancy coloring for sparse set systems where each elem...
AbstractBeck and Fiala conjectured in 1981 that for any set system S of maximum degreeton a finite g...
Thesis (Ph.D.)--University of Washington, 2017-06This thesis deals with algorithmic problems in disc...