Related papers: Data-Driven Sample Average Approximation with Covariate Information

Data-Driven Sample Average Approximation with Covariate Information

URL: http://arxiv.org/abs/2207.13554v1
Date: Wed, 27 Jul 2022 14:45:04 GMT
Title: Data-Driven Sample Average Approximation with Covariate Information
Authors: Rohit Kannan and G\"uzin Bayraksan and James R. Luedtke
Abstract summary: We study optimization for data-driven decision-making when we have observations of the uncertain parameters within the optimization model together with concurrent observations of coparametrics. We investigate three data-driven frameworks that integrate a machine learning prediction model within a programming sample average approximation (SAA) for approximating the solution to this problem.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We study optimization for data-driven decision-making when we have observations of the uncertain parameters within the optimization model together with concurrent observations of covariates. Given a new covariate observation, the goal is to choose a decision that minimizes the expected cost conditioned on this observation. We investigate three data-driven frameworks that integrate a machine learning prediction model within a stochastic programming sample average approximation (SAA) for approximating the solution to this problem. Two of the SAA frameworks are new and use out-of-sample residuals of leave-one-out prediction models for scenario generation. The frameworks we investigate are flexible and accommodate parametric, nonparametric, and semiparametric regression techniques. We derive conditions on the data generation process, the prediction model, and the stochastic program under which solutions of these data-driven SAAs are consistent and asymptotically optimal, and also derive convergence rates and finite sample guarantees. Computational experiments validate our theoretical results, demonstrate the potential advantages of our data-driven formulations over existing approaches (even when the prediction model is misspecified), and illustrate the benefits of our new data-driven formulations in the limited data regime.

Related papers

On conditional diffusion models for PDE simulations [53.01911265639582]
We study score-based diffusion models for forecasting and assimilation of sparse observations. We propose an autoregressive sampling approach that significantly improves performance in forecasting. We also propose a new training strategy for conditional score-based models that achieves stable performance over a range of history lengths.
arXiv Detail & Related papers (2024-10-21T18:31:04Z)
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)
Inference at the data's edge: Gaussian processes for modeling and inference under model-dependency, poor overlap, and extrapolation [0.0]
The Gaussian Process (GP) is a flexible non-linear regression approach. It provides a principled approach to handling our uncertainty over predicted (counterfactual) values. This is especially valuable under conditions of extrapolation or weak overlap.
arXiv Detail & Related papers (2024-07-15T05:09:50Z)
Bayesian Nonparametrics Meets Data-Driven Distributionally Robust Optimization [29.24821214671497]
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.
arXiv Detail & Related papers (2024-01-28T21:19:15Z)
Self-Supervised Dataset Distillation for Transfer Learning [77.4714995131992]
We propose a novel problem of distilling an unlabeled dataset into a set of small synthetic samples for efficient self-supervised learning (SSL) We first prove that a gradient of synthetic samples with respect to a SSL objective in naive bilevel optimization is textitbiased due to randomness originating from data augmentations or masking. We empirically validate the effectiveness of our method on various applications involving transfer learning.
arXiv Detail & Related papers (2023-10-10T10:48:52Z)
RIGID: Robust Linear Regression with Missing Data [7.638042073679073]
We present a robust framework to perform linear regression with missing entries in the features. We show that the proposed formulation, which naturally takes into account the dependency between different variables, reduces to a convex program. In addition to a detailed analysis, we also analyze the behavior of the proposed framework, and present technical discussions.
arXiv Detail & Related papers (2022-05-26T21:10:17Z)
MINIMALIST: Mutual INformatIon Maximization for Amortized Likelihood Inference from Sampled Trajectories [61.3299263929289]
Simulation-based inference enables learning the parameters of a model even when its likelihood cannot be computed in practice. One class of methods uses data simulated with different parameters to infer an amortized estimator for the likelihood-to-evidence ratio. We show that this approach can be formulated in terms of mutual information between model parameters and simulated data.
arXiv Detail & Related papers (2021-06-03T12:59:16Z)
Autoregressive Score Matching [113.4502004812927]
We propose autoregressive conditional score models (AR-CSM) where we parameterize the joint distribution in terms of the derivatives of univariable log-conditionals (scores) For AR-CSM models, this divergence between data and model distributions can be computed and optimized efficiently, requiring no expensive sampling or adversarial training. We show with extensive experimental results that it can be applied to density estimation on synthetic data, image generation, image denoising, and training latent variable models with implicit encoders.
arXiv Detail & Related papers (2020-10-24T07:01:24Z)
Model-based Policy Optimization with Unsupervised Model Adaptation [37.09948645461043]
We investigate how to bridge the gap between real and simulated data due to inaccurate model estimation for better policy optimization. We propose a novel model-based reinforcement learning framework AMPO, which introduces unsupervised model adaptation. Our approach achieves state-of-the-art performance in terms of sample efficiency on a range of continuous control benchmark tasks.
arXiv Detail & Related papers (2020-10-19T14:19:42Z)
Control as Hybrid Inference [62.997667081978825]
We present an implementation of CHI which naturally mediates the balance between iterative and amortised inference. We verify the scalability of our algorithm on a continuous control benchmark, demonstrating that it outperforms strong model-free and model-based baselines.
arXiv Detail & Related papers (2020-07-11T19:44:09Z)
Efficient Ensemble Model Generation for Uncertainty Estimation with Bayesian Approximation in Segmentation [74.06904875527556]
We propose a generic and efficient segmentation framework to construct ensemble segmentation models. In the proposed method, ensemble models can be efficiently generated by using the layer selection method. We also devise a new pixel-wise uncertainty loss, which improves the predictive performance.
arXiv Detail & Related papers (2020-05-21T16:08:38Z)

This list is automatically generated from the titles and abstracts of the papers in this site.