Squared Neural Families: A New Class of Tractable Density Models

Russell Tsuchida; Cheng Soon Ong; Dino Sejdinovic

Squared Neural Families: A New Class of Tractable Density Models

Russell Tsuchida, Cheng Soon Ong, Dino Sejdinovic

Research output: Chapter in Book/Report/Conference proceeding › Conference Paper › Research › peer-review

Abstract

Flexible models for probability distributions are an essential ingredient in many machine learning tasks.We develop and investigate a new class of probability distributions, which we call a Squared Neural Family (SNEFY), formed by squaring the 2-norm of a neural network and normalising it with respect to a base measure.Following the reasoning similar to the well established connections between infinitely wide neural networks and Gaussian processes, we show that SNEFYs admit closed form normalising constants in many cases of interest, thereby resulting in flexible yet fully tractable density models.SNEFYs strictly generalise classical exponential families, are closed under conditioning, and have tractable marginal distributions.Their utility is illustrated on a variety of density estimation, conditional density estimation, and density estimation with missing data tasks.

Original language	English
Title of host publication	Advances in Neural Information Processing Systems 36 pre-proceedings (NeurIPS 2023)
Editors	A. Oh, T. Neumann, A. Globerson, K. Saenko, M. Hardt, S. Levine
Place of Publication	San Diego CA USA
Publisher	Neural Information Processing Systems (NIPS)
Number of pages	26
ISBN (Electronic)	9781713899921
Publication status	Published - 2023
Externally published	Yes
Event	Advances in Neural Information Processing Systems 2023 - Ernest N. Morial Convention Center, New Orleans, United States of America Duration: 10 Dec 2023 → 16 Dec 2023 Conference number: 37th https://openreview.net/group?id=NeurIPS.cc/2023/Conference#tab-accept-oral https://neurips.cc/ (Website) https://papers.nips.cc/paper_files/paper/2023 (Proceedings)

Publication series

Name	Advances in Neural Information Processing Systems
Publisher	Neural Information Processing Systems (NIPS)
Volume	36
ISSN (Print)	1049-5258

Conference

Conference	Advances in Neural Information Processing Systems 2023
Abbreviated title	NeurIPS 2023
Country/Territory	United States of America
City	New Orleans
Period	10/12/23 → 16/12/23
Internet address	https://openreview.net/group?id=NeurIPS.cc/2023/Conference#tab-accept-oral https://neurips.cc/ (Website) https://papers.nips.cc/paper_files/paper/2023 (Proceedings)

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Tsuchida, R., Ong, C. S., & Sejdinovic, D. (2023). Squared Neural Families: A New Class of Tractable Density Models. In A. Oh, T. Neumann, A. Globerson, K. Saenko, M. Hardt, & S. Levine (Eds.), Advances in Neural Information Processing Systems 36 pre-proceedings (NeurIPS 2023) (Advances in Neural Information Processing Systems; Vol. 36). Neural Information Processing Systems (NIPS). https://papers.nips.cc/paper_files/paper/2023/hash/ea13534ee239bb3977795b8cc855bacc-Abstract-Conference.html

Tsuchida, Russell ; Ong, Cheng Soon ; Sejdinovic, Dino. / Squared Neural Families : A New Class of Tractable Density Models. Advances in Neural Information Processing Systems 36 pre-proceedings (NeurIPS 2023). editor / A. Oh ; T. Neumann ; A. Globerson ; K. Saenko ; M. Hardt ; S. Levine. San Diego CA USA : Neural Information Processing Systems (NIPS), 2023. (Advances in Neural Information Processing Systems).

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title = "Squared Neural Families: A New Class of Tractable Density Models",

abstract = "Flexible models for probability distributions are an essential ingredient in many machine learning tasks.We develop and investigate a new class of probability distributions, which we call a Squared Neural Family (SNEFY), formed by squaring the 2-norm of a neural network and normalising it with respect to a base measure.Following the reasoning similar to the well established connections between infinitely wide neural networks and Gaussian processes, we show that SNEFYs admit closed form normalising constants in many cases of interest, thereby resulting in flexible yet fully tractable density models.SNEFYs strictly generalise classical exponential families, are closed under conditioning, and have tractable marginal distributions.Their utility is illustrated on a variety of density estimation, conditional density estimation, and density estimation with missing data tasks.",

author = "Russell Tsuchida and Ong, {Cheng Soon} and Dino Sejdinovic",

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year = "2023",

language = "English",

series = "Advances in Neural Information Processing Systems",

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editor = "A. Oh and T. Neumann and A. Globerson and K. Saenko and M. Hardt and S. Levine",

booktitle = "Advances in Neural Information Processing Systems 36 pre-proceedings (NeurIPS 2023)",

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Tsuchida, R, Ong, CS & Sejdinovic, D 2023, Squared Neural Families: A New Class of Tractable Density Models. in A Oh, T Neumann, A Globerson, K Saenko, M Hardt & S Levine (eds), Advances in Neural Information Processing Systems 36 pre-proceedings (NeurIPS 2023). Advances in Neural Information Processing Systems, vol. 36, Neural Information Processing Systems (NIPS), San Diego CA USA, Advances in Neural Information Processing Systems 2023, New Orleans, Louisiana, United States of America, 10/12/23. <https://papers.nips.cc/paper_files/paper/2023/hash/ea13534ee239bb3977795b8cc855bacc-Abstract-Conference.html>

Squared Neural Families: A New Class of Tractable Density Models. / Tsuchida, Russell; Ong, Cheng Soon; Sejdinovic, Dino.
Advances in Neural Information Processing Systems 36 pre-proceedings (NeurIPS 2023). ed. / A. Oh; T. Neumann; A. Globerson; K. Saenko; M. Hardt; S. Levine. San Diego CA USA: Neural Information Processing Systems (NIPS), 2023. (Advances in Neural Information Processing Systems; Vol. 36).

Research output: Chapter in Book/Report/Conference proceeding › Conference Paper › Research › peer-review

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AB - Flexible models for probability distributions are an essential ingredient in many machine learning tasks.We develop and investigate a new class of probability distributions, which we call a Squared Neural Family (SNEFY), formed by squaring the 2-norm of a neural network and normalising it with respect to a base measure.Following the reasoning similar to the well established connections between infinitely wide neural networks and Gaussian processes, we show that SNEFYs admit closed form normalising constants in many cases of interest, thereby resulting in flexible yet fully tractable density models.SNEFYs strictly generalise classical exponential families, are closed under conditioning, and have tractable marginal distributions.Their utility is illustrated on a variety of density estimation, conditional density estimation, and density estimation with missing data tasks.

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Tsuchida R, Ong CS, Sejdinovic D. Squared Neural Families: A New Class of Tractable Density Models. In Oh A, Neumann T, Globerson A, Saenko K, Hardt M, Levine S, editors, Advances in Neural Information Processing Systems 36 pre-proceedings (NeurIPS 2023). San Diego CA USA: Neural Information Processing Systems (NIPS). 2023. (Advances in Neural Information Processing Systems).

Squared Neural Families: A New Class of Tractable Density Models

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