TY - JOUR
T1 - Signed Clique Search in Signed Networks
T2 - Concepts and Algorithms
AU - Li, Rong Hua
AU - Dai, Qiangqiang
AU - Qin, Lu
AU - Wang, Guoren
AU - Xiao, Xiaokui
AU - Yu, Jeffrey Xu
AU - Qiao, Shaojie
N1 - Publisher Copyright:
© 1989-2012 IEEE.
PY - 2021/2/1
Y1 - 2021/2/1
N2 - Mining cohesive subgraphs from a network is a fundamental problem in network analysis. Most existing cohesive subgraph models are mainly tailored to unsigned networks. In this paper, we study the problem of seeking cohesive subgraphs in a signed network, in which each edge can be positive or negative, denoting friendship or conflict, respectively. We propose a novel model, called maximal (α, k)(α,k)-clique, that represents a cohesive subgraph in signed networks. Specifically, a maximal (α, k)(α,k)-clique is a clique in which every node has at most kk negative neighbors and at least ⌈ α k ⌈αk⌉ positive neighbors (α ≥q 1α≥1). We show that the problem of enumerating all maximal (α, k)(α,k)-cliques in a signed network is NP-hard. To enumerate all maximal (α, k)(α,k)-cliques efficiently, we first develop an elegant signed network reduction technique to significantly prune the signed network. Then, we present an efficient branch and bound enumeration algorithm with several carefully-designed pruning rules to enumerate all maximal (α, k) (α,k)-cliques in the reduced signed network. In addition, we also propose an efficient algorithm with three novel upper-bounding techniques to find the maximum (α, k) (α,k)-clique in a signed network. The results of extensive experiments on five large real-life datasets demonstrate the efficiency, scalability, and effectiveness of our algorithms.
AB - Mining cohesive subgraphs from a network is a fundamental problem in network analysis. Most existing cohesive subgraph models are mainly tailored to unsigned networks. In this paper, we study the problem of seeking cohesive subgraphs in a signed network, in which each edge can be positive or negative, denoting friendship or conflict, respectively. We propose a novel model, called maximal (α, k)(α,k)-clique, that represents a cohesive subgraph in signed networks. Specifically, a maximal (α, k)(α,k)-clique is a clique in which every node has at most kk negative neighbors and at least ⌈ α k ⌈αk⌉ positive neighbors (α ≥q 1α≥1). We show that the problem of enumerating all maximal (α, k)(α,k)-cliques in a signed network is NP-hard. To enumerate all maximal (α, k)(α,k)-cliques efficiently, we first develop an elegant signed network reduction technique to significantly prune the signed network. Then, we present an efficient branch and bound enumeration algorithm with several carefully-designed pruning rules to enumerate all maximal (α, k) (α,k)-cliques in the reduced signed network. In addition, we also propose an efficient algorithm with three novel upper-bounding techniques to find the maximum (α, k) (α,k)-clique in a signed network. The results of extensive experiments on five large real-life datasets demonstrate the efficiency, scalability, and effectiveness of our algorithms.
KW - Signed clique
KW - branch and bound algorithm
KW - maximal clique enumeration
KW - signed network
UR - http://www.scopus.com/inward/record.url?scp=85099485314&partnerID=8YFLogxK
U2 - 10.1109/TKDE.2019.2904569
DO - 10.1109/TKDE.2019.2904569
M3 - Article
AN - SCOPUS:85099485314
SN - 1041-4347
VL - 33
SP - 710
EP - 727
JO - IEEE Transactions on Knowledge and Data Engineering
JF - IEEE Transactions on Knowledge and Data Engineering
IS - 2
M1 - 8665929
ER -