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      Equivariant and Stable Positional Encoding for More Powerful Graph Neural Networks

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          Abstract

          Graph neural networks (GNN) have shown great advantages in many graph-based learning tasks but often fail to predict accurately for a task-based on sets of nodes such as link/motif prediction and so on. Many works have recently proposed to address this problem by using random node features or node distance features. However, they suffer from either slow convergence, inaccurate prediction, or high complexity. In this work, we revisit GNNs that allow using positional features of nodes given by positional encoding (PE) techniques such as Laplacian Eigenmap, Deepwalk, etc. GNNs with PE often get criticized because they are not generalizable to unseen graphs (inductive) or stable. Here, we study these issues in a principled way and propose a provable solution, a class of GNN layers termed PEG with rigorous mathematical analysis. PEG uses separate channels to update the original node features and positional features. PEG imposes permutation equivariance w.r.t. the original node features and rotation equivariance w.r.t. the positional features simultaneously. Extensive link prediction experiments over 8 real-world networks demonstrate the advantages of PEG in generalization and scalability.

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          Author and article information

          Journal
          28 February 2022
          Article
          2203.00199
          5336ab30-2e6b-43a4-bc9a-12b6839764bd

          http://arxiv.org/licenses/nonexclusive-distrib/1.0/

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          Custom metadata
          ICLR 2022; code available at https://github.com/Graph-COM/PEG
          cs.LG cs.SI

          Social & Information networks,Artificial intelligence
          Social & Information networks, Artificial intelligence

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