Related papers: On the Interplay between Graph Structure and Learning Algorithms in Graph Neural Networks

On the Interplay between Graph Structure and Learning Algorithms in Graph Neural Networks

URL: http://arxiv.org/abs/2508.14338v1
Date: Wed, 20 Aug 2025 01:26:56 GMT
Title: On the Interplay between Graph Structure and Learning Algorithms in Graph Neural Networks
Authors: Junwei Su, Chuan Wu,
Abstract summary: We study the interplay between learning algorithms and graph structure for graph neural networks (GNNs)<n>Our study makes several key contributions toward understanding the interplay between graph structure and learning in GNNs.
Score: 6.598758004828656
License: http://creativecommons.org/licenses/by/4.0/
Abstract: This paper studies the interplay between learning algorithms and graph structure for graph neural networks (GNNs). Existing theoretical studies on the learning dynamics of GNNs primarily focus on the convergence rates of learning algorithms under the interpolation regime (noise-free) and offer only a crude connection between these dynamics and the actual graph structure (e.g., maximum degree). This paper aims to bridge this gap by investigating the excessive risk (generalization performance) of learning algorithms in GNNs within the generalization regime (with noise). Specifically, we extend the conventional settings from the learning theory literature to the context of GNNs and examine how graph structure influences the performance of learning algorithms such as stochastic gradient descent (SGD) and Ridge regression. Our study makes several key contributions toward understanding the interplay between graph structure and learning in GNNs. First, we derive the excess risk profiles of SGD and Ridge regression in GNNs and connect these profiles to the graph structure through spectral graph theory. With this established framework, we further explore how different graph structures (regular vs. power-law) impact the performance of these algorithms through comparative analysis. Additionally, we extend our analysis to multi-layer linear GNNs, revealing an increasing non-isotropic effect on the excess risk profile, thereby offering new insights into the over-smoothing issue in GNNs from the perspective of learning algorithms. Our empirical results align with our theoretical predictions, \emph{collectively showcasing a coupling relation among graph structure, GNNs and learning algorithms, and providing insights on GNN algorithm design and selection in practice.}

Related papers

Research on the application of graph data structure and graph neural network in node classification/clustering tasks [13.51508928671878]
Graph-structured data are pervasive across domains including social networks, biological networks, and knowledge graphs.<n>Due to their non-Euclidean nature, such data pose significant challenges to conventional machine learning methods.<n>This study investigates graph data structures, classical graph algorithms, and Graph Neural Networks (GNNs)
arXiv Detail & Related papers (2025-07-20T12:57:23Z)
On the Computational Capability of Graph Neural Networks: A Circuit Complexity Bound Perspective [28.497567290882355]
Graph Neural Networks (GNNs) have become the standard approach for learning and reasoning over relational data.<n>This paper explores the computational limitations of GNNs through the lens of circuit complexity.<n>Specifically, we analyze the circuit complexity of common GNN architectures and prove that under constraints of constant-depth layers, linear or sublinear embedding sizes, and precision, GNNs cannot solve key problems such as graph connectivity and graph isomorphism.
arXiv Detail & Related papers (2025-01-11T05:54:10Z)
Permutation-Invariant Graph Partitioning:How Graph Neural Networks Capture Structural Interactions? [2.7398542529968477]
Graph Neural Networks (GNNs) have paved the way for being a cornerstone in graph-related learning tasks.<n>Yet, the ability of GNNs to capture structural interactions within graphs remains under-explored.<n>We propose Graph Partitioning Neural Networks (GPNNs), a novel architecture that efficiently enhances the expressive power of GNNs in learning structural interactions.
arXiv Detail & Related papers (2023-12-14T06:08:35Z)
Ensemble Learning for Graph Neural Networks [28.3650473174488]
Graph Neural Networks (GNNs) have shown success in various fields for learning from graph-structured data. This paper investigates the application of ensemble learning techniques to improve the performance and robustness of GNNs.
arXiv Detail & Related papers (2023-10-22T03:55:13Z)
Self-supervision meets kernel graph neural models: From architecture to augmentations [36.388069423383286]
We improve the design and learning of kernel graph neural networks (KGNNs) We develop a novel structure-preserving graph data augmentation method called latent graph augmentation (LGA) Our proposed model achieves competitive performance comparable to or sometimes outperforming state-of-the-art graph representation learning frameworks.
arXiv Detail & Related papers (2023-10-17T14:04:22Z)
How Graph Neural Networks Learn: Lessons from Training Dynamics [80.41778059014393]
We study the training dynamics in function space of graph neural networks (GNNs) We find that the gradient descent optimization of GNNs implicitly leverages the graph structure to update the learned function. This finding offers new interpretable insights into when and why the learned GNN functions generalize.
arXiv Detail & Related papers (2023-10-08T10:19:56Z)
DEGREE: Decomposition Based Explanation For Graph Neural Networks [55.38873296761104]
We propose DEGREE to provide a faithful explanation for GNN predictions. By decomposing the information generation and aggregation mechanism of GNNs, DEGREE allows tracking the contributions of specific components of the input graph to the final prediction. We also design a subgraph level interpretation algorithm to reveal complex interactions between graph nodes that are overlooked by previous methods.
arXiv Detail & Related papers (2023-05-22T10:29:52Z)
Discovering the Representation Bottleneck of Graph Neural Networks from Multi-order Interactions [51.597480162777074]
Graph neural networks (GNNs) rely on the message passing paradigm to propagate node features and build interactions. Recent works point out that different graph learning tasks require different ranges of interactions between nodes. We study two common graph construction methods in scientific domains, i.e., emphK-nearest neighbor (KNN) graphs and emphfully-connected (FC) graphs.
arXiv Detail & Related papers (2022-05-15T11:38:14Z)
Towards Unsupervised Deep Graph Structure Learning [67.58720734177325]
We propose an unsupervised graph structure learning paradigm, where the learned graph topology is optimized by data itself without any external guidance. Specifically, we generate a learning target from the original data as an "anchor graph", and use a contrastive loss to maximize the agreement between the anchor graph and the learned graph.
arXiv Detail & Related papers (2022-01-17T11:57:29Z)
Bridging the Gap between Spatial and Spectral Domains: A Unified Framework for Graph Neural Networks [61.17075071853949]
Graph neural networks (GNNs) are designed to deal with graph-structural data that classical deep learning does not easily manage. The purpose of this study is to establish a unified framework that integrates GNNs based on spectral graph and approximation theory.
arXiv Detail & Related papers (2021-07-21T17:34:33Z)
Increase and Conquer: Training Graph Neural Networks on Growing Graphs [116.03137405192356]
We consider the problem of learning a graphon neural network (WNN) by training GNNs on graphs sampled Bernoulli from the graphon. Inspired by these results, we propose an algorithm to learn GNNs on large-scale graphs that, starting from a moderate number of nodes, successively increases the size of the graph during training.
arXiv Detail & Related papers (2021-06-07T15:05:59Z)
Fast Learning of Graph Neural Networks with Guaranteed Generalizability: One-hidden-layer Case [93.37576644429578]
Graph neural networks (GNNs) have made great progress recently on learning from graph-structured data in practice. We provide a theoretically-grounded generalizability analysis of GNNs with one hidden layer for both regression and binary classification problems.
arXiv Detail & Related papers (2020-06-25T00:45:52Z)

This list is automatically generated from the titles and abstracts of the papers in this site.