Add to ORKGWe study the complexity of proving that a sparse random regular graph on an odd number of vertices does not have a perfect matching, and related problems involving each vertex being matched some pre-specified number of times. We show that this requires proofs of degree $\Omega(n / \log n)$ in the Polynomial Calculus (over fields of characteristic $\ne 2$) and Sum-of-Squares proof systems, and exponential size in the bounded-depth Frege proof system. This resolves a question by Razborov asking whether the Lov\'asz-Schrijver proof system requires $n^\delta$ rounds to refute these formulas for some $\delta > 0$. The results are obtained by a worst-case to average-case reduction of these formulas relying on a topological embedding theorem which...
AbstractIn this paper we partially answer the question: how slowly must p(n) converge to 0 so that a...
A ?-separated matching in a graph is a set of edges at distance at least ? from one another (hence, ...
We derive new results for the performance of a simple greedy algorithm for finding large inde-penden...
We study the complexity of proving that a sparse random regular graph on anodd number of vertices do...
We present an improved average case analysis of the maximum cardinality matching problem. We show ...
As proved in [2], every ffl-regular graph G on vertex set V1 [V2 , jV 1 j = jV 2 j = n, with densit...
Abstract. We look at the minimal size of a maximal matching in general, bipartite and ¡-regular rand...
We present an improved average case analysis of the maximum cardinality matching problem. We show th...
AbstractWe look at the minimal size of a maximal matching in general, bipartite and d-regular random...
We present an improved average case analysis of the maximum cardinality matching problem. We show th...
We derive new results for the performance of a simple greedy algorithm for finding large independen...
Random regular graphs play a central role in combinatorics and theoretical computer science. In this...
The perfect matching problem is known to be in P, in randomized NC, and it is hard for NL. Whether t...
Let m = ¼n log n + ½n log log n +cn. Let Λ denote the set of graphs with vertices {1, 2, …, n}, m ed...
We study the existence of perfect matchings in suitably chosen induced subgraphs of random biregular...
AbstractIn this paper we partially answer the question: how slowly must p(n) converge to 0 so that a...
A ?-separated matching in a graph is a set of edges at distance at least ? from one another (hence, ...
We derive new results for the performance of a simple greedy algorithm for finding large inde-penden...
We study the complexity of proving that a sparse random regular graph on anodd number of vertices do...
We present an improved average case analysis of the maximum cardinality matching problem. We show ...
As proved in [2], every ffl-regular graph G on vertex set V1 [V2 , jV 1 j = jV 2 j = n, with densit...
Abstract. We look at the minimal size of a maximal matching in general, bipartite and ¡-regular rand...
We present an improved average case analysis of the maximum cardinality matching problem. We show th...
AbstractWe look at the minimal size of a maximal matching in general, bipartite and d-regular random...
We present an improved average case analysis of the maximum cardinality matching problem. We show th...
We derive new results for the performance of a simple greedy algorithm for finding large independen...
Random regular graphs play a central role in combinatorics and theoretical computer science. In this...
The perfect matching problem is known to be in P, in randomized NC, and it is hard for NL. Whether t...
Let m = ¼n log n + ½n log log n +cn. Let Λ denote the set of graphs with vertices {1, 2, …, n}, m ed...
We study the existence of perfect matchings in suitably chosen induced subgraphs of random biregular...
AbstractIn this paper we partially answer the question: how slowly must p(n) converge to 0 so that a...
A ?-separated matching in a graph is a set of edges at distance at least ? from one another (hence, ...
We derive new results for the performance of a simple greedy algorithm for finding large inde-penden...