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Main Authors: Davoudabadi, Mohammad Javad, Tidswell, Jonathon, Muller, Samuel, Tarr, Garth, Ormerod, John T.
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2506.07394
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author Davoudabadi, Mohammad Javad
Tidswell, Jonathon
Muller, Samuel
Tarr, Garth
Ormerod, John T.
author_facet Davoudabadi, Mohammad Javad
Tidswell, Jonathon
Muller, Samuel
Tarr, Garth
Ormerod, John T.
contents In this paper, we introduce a new probability distribution, the Lasso distribution. We derive several fundamental properties of the distribution, including closed-form expressions for its moments and moment-generating function. Additionally, we present an efficient and numerically stable algorithm for generating random samples from the distribution, facilitating its use in both theoretical and applied settings. We establish that the Lasso distribution belongs to the exponential family. A direct application of the Lasso distribution arises in the context of an existing Gibbs sampler, where the full conditional distribution of each regression coefficient follows this distribution. This leads to a more computationally efficient and theoretically grounded sampling scheme. To facilitate the adoption of our methodology, we provide an R package, BayesianLasso, available on CRAN, implementing the proposed methods. Our findings offer new insights into the probabilistic structure underlying the Lasso penalty and provide practical improvements in Bayesian inference for high-dimensional regression problems.
format Preprint
id arxiv_https___arxiv_org_abs_2506_07394
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle The Lasso Distribution: Properties, Sampling Methods, and Applications in Bayesian Lasso Regression
Davoudabadi, Mohammad Javad
Tidswell, Jonathon
Muller, Samuel
Tarr, Garth
Ormerod, John T.
Computation
In this paper, we introduce a new probability distribution, the Lasso distribution. We derive several fundamental properties of the distribution, including closed-form expressions for its moments and moment-generating function. Additionally, we present an efficient and numerically stable algorithm for generating random samples from the distribution, facilitating its use in both theoretical and applied settings. We establish that the Lasso distribution belongs to the exponential family. A direct application of the Lasso distribution arises in the context of an existing Gibbs sampler, where the full conditional distribution of each regression coefficient follows this distribution. This leads to a more computationally efficient and theoretically grounded sampling scheme. To facilitate the adoption of our methodology, we provide an R package, BayesianLasso, available on CRAN, implementing the proposed methods. Our findings offer new insights into the probabilistic structure underlying the Lasso penalty and provide practical improvements in Bayesian inference for high-dimensional regression problems.
title The Lasso Distribution: Properties, Sampling Methods, and Applications in Bayesian Lasso Regression
topic Computation
url https://arxiv.org/abs/2506.07394