Bayesian Nonparametrics Meets Data-Driven Distributionally Robust Optimization
- URL: http://arxiv.org/abs/2401.15771v5
- Date: Thu, 07 Nov 2024 20:48:14 GMT
- Title: Bayesian Nonparametrics Meets Data-Driven Distributionally Robust Optimization
- Authors: Nicola Bariletto, Nhat Ho,
- Abstract summary: Training machine learning and statistical models often involve optimizing a data-driven risk criterion.
We propose a novel robust criterion by combining insights from Bayesian nonparametric (i.e., Dirichlet process) theory and a recent decision-theoretic model of smooth ambiguity-averse preferences.
For practical implementation, we propose and study tractable approximations of the criterion based on well-known Dirichlet process representations.
- Score: 29.24821214671497
- License:
- Abstract: Training machine learning and statistical models often involves optimizing a data-driven risk criterion. The risk is usually computed with respect to the empirical data distribution, but this may result in poor and unstable out-of-sample performance due to distributional uncertainty. In the spirit of distributionally robust optimization, we propose a novel robust criterion by combining insights from Bayesian nonparametric (i.e., Dirichlet process) theory and a recent decision-theoretic model of smooth ambiguity-averse preferences. First, we highlight novel connections with standard regularized empirical risk minimization techniques, among which Ridge and LASSO regressions. Then, we theoretically demonstrate the existence of favorable finite-sample and asymptotic statistical guarantees on the performance of the robust optimization procedure. For practical implementation, we propose and study tractable approximations of the criterion based on well-known Dirichlet process representations. We also show that the smoothness of the criterion naturally leads to standard gradient-based numerical optimization. Finally, we provide insights into the workings of our method by applying it to a variety of tasks based on simulated and real datasets.
Related papers
- Distributionally Robust Optimization as a Scalable Framework to Characterize Extreme Value Distributions [22.765095010254118]
The goal of this paper is to develop distributionally robust optimization (DRO) estimators, specifically for multidimensional Extreme Value Theory (EVT) statistics.
In order to mitigate over-conservative estimates while enhancing out-of-sample performance, we study DRO estimators informed by semi-parametric max-stable constraints in the space of point processes.
Both approaches are validated using synthetically generated data, recovering prescribed characteristics, and verifying the efficacy of the proposed techniques.
arXiv Detail & Related papers (2024-07-31T19:45:27Z) - Generalization Bounds of Surrogate Policies for Combinatorial Optimization Problems [61.580419063416734]
A recent stream of structured learning approaches has improved the practical state of the art for a range of optimization problems.
The key idea is to exploit the statistical distribution over instances instead of dealing with instances separately.
In this article, we investigate methods that smooth the risk by perturbing the policy, which eases optimization and improves the generalization error.
arXiv Detail & Related papers (2024-07-24T12:00:30Z) - Borrowing Strength in Distributionally Robust Optimization via Hierarchical Dirichlet Processes [35.53901341372684]
Our approach unifies regularized estimation, distributionally robust optimization, and hierarchical Bayesian modeling.
By employing a hierarchical Dirichlet process (HDP) prior, the method effectively handles multi-source data.
Numerical experiments validate the framework's efficacy in improving and stabilizing both prediction and parameter estimation accuracy.
arXiv Detail & Related papers (2024-05-21T19:03:09Z) - Distributionally Robust Skeleton Learning of Discrete Bayesian Networks [9.46389554092506]
We consider the problem of learning the exact skeleton of general discrete Bayesian networks from potentially corrupted data.
We propose to optimize the most adverse risk over a family of distributions within bounded Wasserstein distance or KL divergence to the empirical distribution.
We present efficient algorithms and show the proposed methods are closely related to the standard regularized regression approach.
arXiv Detail & Related papers (2023-11-10T15:33:19Z) - Likelihood Ratio Confidence Sets for Sequential Decision Making [51.66638486226482]
We revisit the likelihood-based inference principle and propose to use likelihood ratios to construct valid confidence sequences.
Our method is especially suitable for problems with well-specified likelihoods.
We show how to provably choose the best sequence of estimators and shed light on connections to online convex optimization.
arXiv Detail & Related papers (2023-11-08T00:10:21Z) - When Demonstrations Meet Generative World Models: A Maximum Likelihood
Framework for Offline Inverse Reinforcement Learning [62.00672284480755]
This paper aims to recover the structure of rewards and environment dynamics that underlie observed actions in a fixed, finite set of demonstrations from an expert agent.
Accurate models of expertise in executing a task has applications in safety-sensitive applications such as clinical decision making and autonomous driving.
arXiv Detail & Related papers (2023-02-15T04:14:20Z) - Making Linear MDPs Practical via Contrastive Representation Learning [101.75885788118131]
It is common to address the curse of dimensionality in Markov decision processes (MDPs) by exploiting low-rank representations.
We consider an alternative definition of linear MDPs that automatically ensures normalization while allowing efficient representation learning.
We demonstrate superior performance over existing state-of-the-art model-based and model-free algorithms on several benchmarks.
arXiv Detail & Related papers (2022-07-14T18:18:02Z) - Pessimistic Q-Learning for Offline Reinforcement Learning: Towards
Optimal Sample Complexity [51.476337785345436]
We study a pessimistic variant of Q-learning in the context of finite-horizon Markov decision processes.
A variance-reduced pessimistic Q-learning algorithm is proposed to achieve near-optimal sample complexity.
arXiv Detail & Related papers (2022-02-28T15:39:36Z) - Integrated Conditional Estimation-Optimization [6.037383467521294]
Many real-world optimization problems uncertain parameters with probability can be estimated using contextual feature information.
In contrast to the standard approach of estimating the distribution of uncertain parameters, we propose an integrated conditional estimation approach.
We show that our ICEO approach is theally consistent under moderate conditions.
arXiv Detail & Related papers (2021-10-24T04:49:35Z) - Near-optimal inference in adaptive linear regression [60.08422051718195]
Even simple methods like least squares can exhibit non-normal behavior when data is collected in an adaptive manner.
We propose a family of online debiasing estimators to correct these distributional anomalies in at least squares estimation.
We demonstrate the usefulness of our theory via applications to multi-armed bandit, autoregressive time series estimation, and active learning with exploration.
arXiv Detail & Related papers (2021-07-05T21:05:11Z) - Statistical optimality and stability of tangent transform algorithms in
logit models [6.9827388859232045]
We provide conditions on the data generating process to derive non-asymptotic upper bounds to the risk incurred by the logistical optima.
In particular, we establish local variation of the algorithm without any assumptions on the data-generating process.
We explore a special case involving a semi-orthogonal design under which a global convergence is obtained.
arXiv Detail & Related papers (2020-10-25T05:15:13Z)
This list is automatically generated from the titles and abstracts of the papers in this site.
This site does not guarantee the quality of this site (including all information) and is not responsible for any consequences.