Related papers: Quantization through Piecewise-Affine Regularization: Optimization and Statistical Guarantees

Quantization through Piecewise-Affine Regularization: Optimization and Statistical Guarantees

URL: http://arxiv.org/abs/2508.11112v1
Date: Thu, 14 Aug 2025 23:35:21 GMT
Title: Quantization through Piecewise-Affine Regularization: Optimization and Statistical Guarantees
Authors: Jianhao Ma, Lin Xiao,
Abstract summary: Piecewise regularization (PAR) provides a flexible modelingization based on the statistical perspectives.<n>We show how to use the PAR method to solve problems using gradient, and Alternating Direction Multipliers.
Score: 13.571671030124604
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Optimization problems over discrete or quantized variables are very challenging in general due to the combinatorial nature of their search space. Piecewise-affine regularization (PAR) provides a flexible modeling and computational framework for quantization based on continuous optimization. In this work, we focus on the setting of supervised learning and investigate the theoretical foundations of PAR from optimization and statistical perspectives. First, we show that in the overparameterized regime, where the number of parameters exceeds the number of samples, every critical point of the PAR-regularized loss function exhibits a high degree of quantization. Second, we derive closed-form proximal mappings for various (convex, quasi-convex, and non-convex) PARs and show how to solve PAR-regularized problems using the proximal gradient method, its accelerated variant, and the Alternating Direction Method of Multipliers. Third, we study statistical guarantees of PAR-regularized linear regression problems; specifically, we can approximate classical formulations of $\ell_1$-, squared $\ell_2$-, and nonconvex regularizations using PAR and obtain similar statistical guarantees with quantized solutions.

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