The Graph Matching problem is a robust version of the Graph Isomorphism problem: given two not-necessarily-isomorphic graphs, the goal is to find a permutation of the vertices which maximizes the number of common edges. We study a popular average-case variant; we deviate from the common heuristic strategy and give the first quasi-polynomial time algorithm, where previously only sub-exponential time algorithms were known. Based on joint work with Boaz Barak, Chi-Ning Chou, Zhixian Lei, and Yueqi Sheng.Non UBCUnreviewedAuthor affiliation: Harvard/MITPostdoctora
By advancing the idea of finding width in bipartite graphs and basic definitions in matching theory,...
The problem of graph matching in general is NP-hard and approaches have been proposed for its subopt...
Subgraph matching (aka graph pattern matching or the subgraph isomorphism problem) is NP-complete. B...
Presented on September 24, 2018 at 11:00 a.m. in the Pettit Microelectronics Research Center, room 1...
Graph matching is a generalization of the classic graph isomorphism problem. By using only their str...
This paper deals with the problem of graph matching or network alignment for Erd\H{o}s--R\'enyi grap...
We present an improved average case analysis of the maximum cardinality matching problem. We show th...
Graph matching plays an essential role in many real applications. In this paper, we study how to mat...
We present an improved average case analysis of the maximum cardinality matching problem. We show th...
In many graph–mining problems, two networks from differ-ent domains have to be matched. In the absen...
We present an improved average case analysis of the maximum cardinality matching problem. We show th...
In approximate graph matching, the goal is to find the best correspondence between the labels of two...
The graph is an essential data structure for representing relational information. When graphs are us...
The RW algorithm has been proposed recently to solve the exact graph matching problem. This algorith...
The problem of aligning Erdos-Renyi random graphs is a noisy, average-case version of the graph isom...
By advancing the idea of finding width in bipartite graphs and basic definitions in matching theory,...
The problem of graph matching in general is NP-hard and approaches have been proposed for its subopt...
Subgraph matching (aka graph pattern matching or the subgraph isomorphism problem) is NP-complete. B...
Presented on September 24, 2018 at 11:00 a.m. in the Pettit Microelectronics Research Center, room 1...
Graph matching is a generalization of the classic graph isomorphism problem. By using only their str...
This paper deals with the problem of graph matching or network alignment for Erd\H{o}s--R\'enyi grap...
We present an improved average case analysis of the maximum cardinality matching problem. We show th...
Graph matching plays an essential role in many real applications. In this paper, we study how to mat...
We present an improved average case analysis of the maximum cardinality matching problem. We show th...
In many graph–mining problems, two networks from differ-ent domains have to be matched. In the absen...
We present an improved average case analysis of the maximum cardinality matching problem. We show th...
In approximate graph matching, the goal is to find the best correspondence between the labels of two...
The graph is an essential data structure for representing relational information. When graphs are us...
The RW algorithm has been proposed recently to solve the exact graph matching problem. This algorith...
The problem of aligning Erdos-Renyi random graphs is a noisy, average-case version of the graph isom...
By advancing the idea of finding width in bipartite graphs and basic definitions in matching theory,...
The problem of graph matching in general is NP-hard and approaches have been proposed for its subopt...
Subgraph matching (aka graph pattern matching or the subgraph isomorphism problem) is NP-complete. B...