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Main Authors: Dayton, Sarah Harkins, Everett, Hayden, Schizas, Ioannis, Boothe Jr., David L., Maroulas, Vasileios
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2510.11704
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author Dayton, Sarah Harkins
Everett, Hayden
Schizas, Ioannis
Boothe Jr., David L.
Maroulas, Vasileios
author_facet Dayton, Sarah Harkins
Everett, Hayden
Schizas, Ioannis
Boothe Jr., David L.
Maroulas, Vasileios
contents Convolutional neural networks (CNNs) have been established as the main workhorse in image data processing; nonetheless, they require large amounts of data to train, often produce overconfident predictions, and frequently lack the ability to quantify the uncertainty of their predictions. To address these concerns, we propose a new Bayesian topological CNN that promotes a novel interplay between topology-aware learning and Bayesian sampling. Specifically, it utilizes information from important manifolds to accelerate training while reducing calibration error by placing prior distributions on network parameters and properly learning appropriate posteriors. One important contribution of our work is the inclusion of a consistency condition in the learning cost, which can effectively modify the prior distributions to improve the performance of our novel network architecture. We evaluate the model on benchmark image classification datasets and demonstrate its superiority over conventional CNNs, Bayesian neural networks (BNNs), and topological CNNs. In particular, we supply evidence that our method provides an advantage in situations where training data is limited or corrupted. Furthermore, we show that the new model allows for better uncertainty quantification than standard BNNs since it can more readily identify examples of out-of-distribution data on which it has not been trained. Our results highlight the potential of our novel hybrid approach for more efficient and robust image classification.
format Preprint
id arxiv_https___arxiv_org_abs_2510_11704
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Bayesian Topological Convolutional Neural Nets
Dayton, Sarah Harkins
Everett, Hayden
Schizas, Ioannis
Boothe Jr., David L.
Maroulas, Vasileios
Computer Vision and Pattern Recognition
Convolutional neural networks (CNNs) have been established as the main workhorse in image data processing; nonetheless, they require large amounts of data to train, often produce overconfident predictions, and frequently lack the ability to quantify the uncertainty of their predictions. To address these concerns, we propose a new Bayesian topological CNN that promotes a novel interplay between topology-aware learning and Bayesian sampling. Specifically, it utilizes information from important manifolds to accelerate training while reducing calibration error by placing prior distributions on network parameters and properly learning appropriate posteriors. One important contribution of our work is the inclusion of a consistency condition in the learning cost, which can effectively modify the prior distributions to improve the performance of our novel network architecture. We evaluate the model on benchmark image classification datasets and demonstrate its superiority over conventional CNNs, Bayesian neural networks (BNNs), and topological CNNs. In particular, we supply evidence that our method provides an advantage in situations where training data is limited or corrupted. Furthermore, we show that the new model allows for better uncertainty quantification than standard BNNs since it can more readily identify examples of out-of-distribution data on which it has not been trained. Our results highlight the potential of our novel hybrid approach for more efficient and robust image classification.
title Bayesian Topological Convolutional Neural Nets
topic Computer Vision and Pattern Recognition
url https://arxiv.org/abs/2510.11704