The analysis of several algorithms and data structures can be framed as a peeling process on a random hypergraph: vertices with degree less than k and their adjacent edges are removed until no vertices of degree less than k are left. Often the question is whether the remaining hypergraph, the k-core, is empty or not. In some settings, it may be possible to remove either vertices or edges from the hypergraph before peeling, at some cost. For example, in hashing applications where keys correspond to edges and buckets to vertices, one might use an additional side data structure, commonly referred to as a stash, to separately handle some keys in order to avoid collisions. The natural question in such cases is to find the minimum number of edges...
A diamond is a graph obtained by removing an edge from a complete graph on four vertices. A graph is...
pubulished source © SIAM Inc. 2004We describe a technique for determining the thresholds for the app...
We consider the following clustering problems: given a general undirected graph, partition its verti...
The analysis of several algorithms and data structures can be framed as a peeling process on a rando...
The computation of a peeling order in a randomly generated hypergraph is the most time-consuming ste...
The computation of a peeling order in a randomly generated hypergraph is the most time-consuming ste...
We describe a new family of k-uniform hypergraphs with independent random edges. The hypergraphs hav...
Abstract — The analysis of several algorithms and data struc-tures can be reduced to the analysis of...
We prove tight bounds on the site percolation threshold for $k$-uniform hypergraphs of maximum degre...
Consider a random hypergraph on a set of N vertices in which, for 1 ≤ k ≤ N, a Poisson (Nβκ) number ...
We give a combinatorial algorithm to find a maximum packing of hypertrees in a capacitated hypergrap...
The k-core of a hypergraph is the unique subgraph where all vertices have degree at least k and whic...
We give an algorithm that, with high probability, recovers a planted k-partition in a random graph, ...
We study the stochastic matching problem on k-uniform hypergraphs. In this problem, we are given a h...
“This is a preprint of an article accepted for publication in [Random Structures and Algorithms] co...
A diamond is a graph obtained by removing an edge from a complete graph on four vertices. A graph is...
pubulished source © SIAM Inc. 2004We describe a technique for determining the thresholds for the app...
We consider the following clustering problems: given a general undirected graph, partition its verti...
The analysis of several algorithms and data structures can be framed as a peeling process on a rando...
The computation of a peeling order in a randomly generated hypergraph is the most time-consuming ste...
The computation of a peeling order in a randomly generated hypergraph is the most time-consuming ste...
We describe a new family of k-uniform hypergraphs with independent random edges. The hypergraphs hav...
Abstract — The analysis of several algorithms and data struc-tures can be reduced to the analysis of...
We prove tight bounds on the site percolation threshold for $k$-uniform hypergraphs of maximum degre...
Consider a random hypergraph on a set of N vertices in which, for 1 ≤ k ≤ N, a Poisson (Nβκ) number ...
We give a combinatorial algorithm to find a maximum packing of hypertrees in a capacitated hypergrap...
The k-core of a hypergraph is the unique subgraph where all vertices have degree at least k and whic...
We give an algorithm that, with high probability, recovers a planted k-partition in a random graph, ...
We study the stochastic matching problem on k-uniform hypergraphs. In this problem, we are given a h...
“This is a preprint of an article accepted for publication in [Random Structures and Algorithms] co...
A diamond is a graph obtained by removing an edge from a complete graph on four vertices. A graph is...
pubulished source © SIAM Inc. 2004We describe a technique for determining the thresholds for the app...
We consider the following clustering problems: given a general undirected graph, partition its verti...