Local Intrinsic Dimensional Entropy

Authors

  • Rohan Ghosh National University of Singapore
  • Mehul Motani National University of Singapore

DOI:

https://doi.org/10.1609/aaai.v37i6.25935

Keywords:

ML: Calibration & Uncertainty Quantification, ML: Other Foundations of Machine Learning

Abstract

Most entropy measures depend on the spread of the probability distribution over the sample space |X|, and the maximum entropy achievable scales proportionately with the sample space cardinality |X|. For a finite |X|, this yields robust entropy measures which satisfy many important properties, such as invariance to bijections, while the same is not true for continuous spaces (where |X|=infinity). Furthermore, since R and R^d (d in Z+) have the same cardinality (from Cantor's correspondence argument), cardinality-dependent entropy measures cannot encode the data dimensionality. In this work, we question the role of cardinality and distribution spread in defining entropy measures for continuous spaces, which can undergo multiple rounds of transformations and distortions, e.g., in neural networks. We find that the average value of the local intrinsic dimension of a distribution, denoted as ID-Entropy, can serve as a robust entropy measure for continuous spaces, while capturing the data dimensionality. We find that ID-Entropy satisfies many desirable properties and can be extended to conditional entropy, joint entropy and mutual-information variants. ID-Entropy also yields new information bottleneck principles and also links to causality. In the context of deep learning, for feedforward architectures, we show, theoretically and empirically, that the ID-Entropy of a hidden layer directly controls the generalization gap for both classifiers and auto-encoders, when the target function is Lipschitz continuous. Our work primarily shows that, for continuous spaces, taking a structural rather than a statistical approach yields entropy measures which preserve intrinsic data dimensionality, while being relevant for studying various architectures.

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Published

2023-06-26

How to Cite

Ghosh, R., & Motani, M. (2023). Local Intrinsic Dimensional Entropy. Proceedings of the AAAI Conference on Artificial Intelligence, 37(6), 7714-7721. https://doi.org/10.1609/aaai.v37i6.25935

Issue

Section

AAAI Technical Track on Machine Learning I