In the $\varepsilon$-Consensus-Halving problem, we are given $n$ probability measures $v_1, \dots, v_n$ on the interval $R = [0,1]$, and the goal is to partition $R$ into two parts $R^+$ and $R^-$ using at most $n$ cuts, so that $|v_i(R^+) - v_i(R^-)| \leq \varepsilon$ for all $i$. This fundamental fair division problem was the first natural problem shown to be complete for the class PPA, and all subsequent PPA-completeness results for other natural problems have been obtained by reducing from it. We show that $\varepsilon$-Consensus-Halving is PPA-complete even when the parameter $\varepsilon$ is a constant. In fact, we prove that this holds for any constant $\varepsilon < 1/5$. As a result, we obtain constant inapproximability results f...
We study the problem of finding an exact solution to the consensus halving problem. While recent wor...
We resolve the computational complexity of three problems known as Necklace Splitting, Consensus-Hal...
In the consensus halving problem we are given n agents with valuations over the interval [0,1]. The ...
In the ϵ-Consensus-Halving problem, we are given n probability measures v1, ..., vn on the interval ...
In the ϵ-Consensus-Halving problem, we are given n probability measures v1, ..., vn on the interval ...
In the $\varepsilon$-Consensus-Halving problem, a fundamental problem in fair division, there are $n...
We show that the computational problem Consensus Halving is PPA-Complete, the first PPA-Completeness...
We study the consensus-halving problem of dividing an object into two portions, such that each of $n...
We show that the computational problem Consensus Halving is PPA-Complete, the first PPA-Completeness...
We study the consensus-halving problem of dividing an object into two portions, such that each of n ...
We consider the $\varepsilon$-Consensus-Halving problem, in which a set of heterogeneous agents aim ...
We resolve the computational complexity of two problems known as Necklace-splitting and Discrete Ham...
We consider the ϵ-Consensus-Halving problem, in which a set of heterogeneous agents aim at dividing ...
Consensus halving refers to the problem of dividing a resource into two parts so that every agent va...
We resolve the computational complexity of two problems known as NECKLACE-SPLITTING and DISCRETE HAM...
We study the problem of finding an exact solution to the consensus halving problem. While recent wor...
We resolve the computational complexity of three problems known as Necklace Splitting, Consensus-Hal...
In the consensus halving problem we are given n agents with valuations over the interval [0,1]. The ...
In the ϵ-Consensus-Halving problem, we are given n probability measures v1, ..., vn on the interval ...
In the ϵ-Consensus-Halving problem, we are given n probability measures v1, ..., vn on the interval ...
In the $\varepsilon$-Consensus-Halving problem, a fundamental problem in fair division, there are $n...
We show that the computational problem Consensus Halving is PPA-Complete, the first PPA-Completeness...
We study the consensus-halving problem of dividing an object into two portions, such that each of $n...
We show that the computational problem Consensus Halving is PPA-Complete, the first PPA-Completeness...
We study the consensus-halving problem of dividing an object into two portions, such that each of n ...
We consider the $\varepsilon$-Consensus-Halving problem, in which a set of heterogeneous agents aim ...
We resolve the computational complexity of two problems known as Necklace-splitting and Discrete Ham...
We consider the ϵ-Consensus-Halving problem, in which a set of heterogeneous agents aim at dividing ...
Consensus halving refers to the problem of dividing a resource into two parts so that every agent va...
We resolve the computational complexity of two problems known as NECKLACE-SPLITTING and DISCRETE HAM...
We study the problem of finding an exact solution to the consensus halving problem. While recent wor...
We resolve the computational complexity of three problems known as Necklace Splitting, Consensus-Hal...
In the consensus halving problem we are given n agents with valuations over the interval [0,1]. The ...