Related papers: Generalized Eigenvalue Problems with Generative Priors

Generalized Eigenvalue Problems with Generative Priors

URL: http://arxiv.org/abs/2411.01326v1
Date: Sat, 02 Nov 2024 18:16:07 GMT
Title: Generalized Eigenvalue Problems with Generative Priors
Authors: Zhaoqiang Liu, Wen Li, Junren Chen,
Abstract summary: Generalized eigenvalue problems (GEPs) find applications in various fields of science and engineering. We study GEPs under generative priors, assuming that the underlying leading generalized eigenvector lies within the range of a Lipschitz continuous generative model. We propose an iterative algorithm called the Projected Rayleigh Flow Method (PRFM) to approximate the optimal solution.
Score: 23.711322973038897
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Abstract: Generalized eigenvalue problems (GEPs) find applications in various fields of science and engineering. For example, principal component analysis, Fisher's discriminant analysis, and canonical correlation analysis are specific instances of GEPs and are widely used in statistical data processing. In this work, we study GEPs under generative priors, assuming that the underlying leading generalized eigenvector lies within the range of a Lipschitz continuous generative model. Under appropriate conditions, we show that any optimal solution to the corresponding optimization problems attains the optimal statistical rate. Moreover, from a computational perspective, we propose an iterative algorithm called the Projected Rayleigh Flow Method (PRFM) to approximate the optimal solution. We theoretically demonstrate that under suitable assumptions, PRFM converges linearly to an estimated vector that achieves the optimal statistical rate. Numerical results are provided to demonstrate the effectiveness of the proposed method.

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