Regression-based projection for learning Mori-Zwanzig operators
- URL: http://arxiv.org/abs/2205.05135v3
- Date: Thu, 20 Apr 2023 21:46:41 GMT
- Title: Regression-based projection for learning Mori-Zwanzig operators
- Authors: Yen Ting Lin, Yifeng Tian, Danny Perez, Daniel Livescu
- Abstract summary: We propose to adopt statistical regression as the projection operator to enable data-driven learning of the operators in the Mori-Zwanzig formalism.
We show that the choice of linear regression results in a recently proposed data-driven learning algorithm based on Mori's projection operator.
- Score: 0.0
- License: http://creativecommons.org/licenses/by-nc-nd/4.0/
- Abstract: We propose to adopt statistical regression as the projection operator to
enable data-driven learning of the operators in the Mori--Zwanzig formalism. We
present a principled method to extract the Markov and memory operators for any
regression models. We show that the choice of linear regression results in a
recently proposed data-driven learning algorithm based on Mori's projection
operator, which is a higher-order approximate Koopman learning method. We show
that more expressive nonlinear regression models naturally fill in the gap
between the highly idealized and computationally efficient Mori's projection
operator and the most optimal yet computationally infeasible Zwanzig's
projection operator. We performed numerical experiments and extracted the
operators for an array of regression-based projections, including linear,
polynomial, spline, and neural-network-based regressions, showing a progressive
improvement as the complexity of the regression model increased. Our
proposition provides a general framework to extract memory-dependent
corrections and can be readily applied to an array of data-driven learning
methods for stationary dynamical systems in the literature.
Related papers
- Efficient and Generalizable Certified Unlearning: A Hessian-free Recollection Approach [8.875278412741695]
Machine unlearning strives to uphold the data owners' right to be forgotten by enabling models to selectively forget specific data.
We develop an algorithm that achieves near-instantaneous unlearning as it only requires a vector addition operation.
arXiv Detail & Related papers (2024-04-02T07:54:18Z) - Meta-Learning with Generalized Ridge Regression: High-dimensional Asymptotics, Optimality and Hyper-covariance Estimation [14.194212772887699]
We consider meta-learning within the framework of high-dimensional random-effects linear models.
We show the precise behavior of the predictive risk for a new test task when the data dimension grows proportionally to the number of samples per task.
We propose and analyze an estimator inverse random regression coefficients based on data from the training tasks.
arXiv Detail & Related papers (2024-03-27T21:18:43Z) - Representation Transfer Learning via Multiple Pre-trained models for
Linear Regression [3.5788754401889014]
We consider the problem of learning a linear regression model on a data domain of interest (target) given few samples.
To aid learning, we are provided with a set of pre-trained regression models that are trained on potentially different data domains.
We propose a representation transfer based learning method for constructing the target model.
arXiv Detail & Related papers (2023-05-25T19:35:24Z) - Koopman Kernel Regression [6.116741319526748]
We show that Koopman operator theory offers a beneficial paradigm for characterizing forecasts via linear time-invariant (LTI) ODEs.
We derive a universal Koopman-invariant kernel reproducing Hilbert space (RKHS) that solely spans transformations into LTI dynamical systems.
Our experiments demonstrate superior forecasting performance compared to Koopman operator and sequential data predictors.
arXiv Detail & Related papers (2023-05-25T16:22:22Z) - ResMem: Learn what you can and memorize the rest [79.19649788662511]
We propose the residual-memorization (ResMem) algorithm to augment an existing prediction model.
By construction, ResMem can explicitly memorize the training labels.
We show that ResMem consistently improves the test set generalization of the original prediction model.
arXiv Detail & Related papers (2023-02-03T07:12:55Z) - Sparse high-dimensional linear regression with a partitioned empirical
Bayes ECM algorithm [62.997667081978825]
We propose a computationally efficient and powerful Bayesian approach for sparse high-dimensional linear regression.
Minimal prior assumptions on the parameters are used through the use of plug-in empirical Bayes estimates.
The proposed approach is implemented in the R package probe.
arXiv Detail & Related papers (2022-09-16T19:15:50Z) - Correcting Model Bias with Sparse Implicit Processes [0.9187159782788579]
We show that Sparse Implicit Processes (SIP) is capable of correcting model bias when the data generating mechanism differs strongly from the one implied by the model.
We use synthetic datasets to show that SIP is capable of providing predictive distributions that reflect the data better than the exact predictions of the initial, but wrongly assumed model.
arXiv Detail & Related papers (2022-07-21T18:00:01Z) - Near-optimal Offline Reinforcement Learning with Linear Representation:
Leveraging Variance Information with Pessimism [65.46524775457928]
offline reinforcement learning seeks to utilize offline/historical data to optimize sequential decision-making strategies.
We study the statistical limits of offline reinforcement learning with linear model representations.
arXiv Detail & Related papers (2022-03-11T09:00:12Z) - Extension of Dynamic Mode Decomposition for dynamic systems with
incomplete information based on t-model of optimal prediction [69.81996031777717]
The Dynamic Mode Decomposition has proved to be a very efficient technique to study dynamic data.
The application of this approach becomes problematic if the available data is incomplete because some dimensions of smaller scale either missing or unmeasured.
We consider a first-order approximation of the Mori-Zwanzig decomposition, state the corresponding optimization problem and solve it with the gradient-based optimization method.
arXiv Detail & Related papers (2022-02-23T11:23:59Z) - Gone Fishing: Neural Active Learning with Fisher Embeddings [55.08537975896764]
There is an increasing need for active learning algorithms that are compatible with deep neural networks.
This article introduces BAIT, a practical representation of tractable, and high-performing active learning algorithm for neural networks.
arXiv Detail & Related papers (2021-06-17T17:26:31Z) - Real-Time Regression with Dividing Local Gaussian Processes [62.01822866877782]
Local Gaussian processes are a novel, computationally efficient modeling approach based on Gaussian process regression.
Due to an iterative, data-driven division of the input space, they achieve a sublinear computational complexity in the total number of training points in practice.
A numerical evaluation on real-world data sets shows their advantages over other state-of-the-art methods in terms of accuracy as well as prediction and update speed.
arXiv Detail & Related papers (2020-06-16T18:43:31Z)
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.