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Hauptverfasser: Zhou, Alexander, Li, Haoyang, Tian, Anxin, Li, Zhiyuan, Wang, Yue
Format: Preprint
Veröffentlicht: 2026
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Online-Zugang:https://arxiv.org/abs/2602.14084
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author Zhou, Alexander
Li, Haoyang
Tian, Anxin
Li, Zhiyuan
Wang, Yue
author_facet Zhou, Alexander
Li, Haoyang
Tian, Anxin
Li, Zhiyuan
Wang, Yue
contents On signed social networks, balanced and unbalanced triangles are a critical motif due to their role as the foundations of Structural Balance Theory. The uses for these motifs have been extensively explored in networks with known edge signs, however in the real-world graphs with ground-truth signs are near non-existent, particularly on a large-scale. In reality, edge signs are inferred via various techniques with differing levels of confidence, meaning the edge signs on these graphs should be modelled with a probability value. In this work, we adapt balanced and unbalanced triangles to a setting with uncertain edge signs and explore the problems of triangle counting and enumeration. We provide a baseline and improved method (leveraging the inherent information provided by the edge probabilities in order to reduce the search space) for fast exact counting and enumeration. We also explore approximate solutions for counting via different sampling approaches, including leveraging insights from our improved exact solution to significantly reduce the runtime of each sample resulting in upwards of two magnitudes more queries executed per second. We evaluate the efficiency of all our solutions as well as examine the effectiveness of our sampling approaches on real-world topological networks with a variety of probability distributions.
format Preprint
id arxiv_https___arxiv_org_abs_2602_14084
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Counting Balanced Triangles on Social Networks With Uncertain Edge Signs
Zhou, Alexander
Li, Haoyang
Tian, Anxin
Li, Zhiyuan
Wang, Yue
Data Structures and Algorithms
Social and Information Networks
On signed social networks, balanced and unbalanced triangles are a critical motif due to their role as the foundations of Structural Balance Theory. The uses for these motifs have been extensively explored in networks with known edge signs, however in the real-world graphs with ground-truth signs are near non-existent, particularly on a large-scale. In reality, edge signs are inferred via various techniques with differing levels of confidence, meaning the edge signs on these graphs should be modelled with a probability value. In this work, we adapt balanced and unbalanced triangles to a setting with uncertain edge signs and explore the problems of triangle counting and enumeration. We provide a baseline and improved method (leveraging the inherent information provided by the edge probabilities in order to reduce the search space) for fast exact counting and enumeration. We also explore approximate solutions for counting via different sampling approaches, including leveraging insights from our improved exact solution to significantly reduce the runtime of each sample resulting in upwards of two magnitudes more queries executed per second. We evaluate the efficiency of all our solutions as well as examine the effectiveness of our sampling approaches on real-world topological networks with a variety of probability distributions.
title Counting Balanced Triangles on Social Networks With Uncertain Edge Signs
topic Data Structures and Algorithms
Social and Information Networks
url https://arxiv.org/abs/2602.14084