English

Solving Regularized Exp, Cosh and Sinh Regression Problems

Machine Learning 2023-05-12 v2

Abstract

In modern machine learning, attention computation is a fundamental task for training large language models such as Transformer, GPT-4 and ChatGPT. In this work, we study exponential regression problem which is inspired by the softmax/exp unit in the attention mechanism in large language models. The standard exponential regression is non-convex. We study the regularization version of exponential regression problem which is a convex problem. We use approximate newton method to solve in input sparsity time. Formally, in this problem, one is given matrix ARn×dA \in \mathbb{R}^{n \times d}, bRnb \in \mathbb{R}^n, wRnw \in \mathbb{R}^n and any of functions exp,cosh\exp, \cosh and sinh\sinh denoted as ff. The goal is to find the optimal xx that minimize 0.5f(Ax)b22+0.5diag(w)Ax22 0.5 \| f(Ax) - b \|_2^2 + 0.5 \| \mathrm{diag}(w) A x \|_2^2. The straightforward method is to use the naive Newton's method. Let nnz(A)\mathrm{nnz}(A) denote the number of non-zeros entries in matrix AA. Let ω\omega denote the exponent of matrix multiplication. Currently, ω2.373\omega \approx 2.373. Let ϵ\epsilon denote the accuracy error. In this paper, we make use of the input sparsity and purpose an algorithm that use log(x0x2/ϵ)\log ( \|x_0 - x^*\|_2 / \epsilon) iterations and O~(nnz(A)+dω)\widetilde{O}(\mathrm{nnz}(A) + d^{\omega} ) per iteration time to solve the problem.

Keywords

Cite

@article{arxiv.2303.15725,
  title  = {Solving Regularized Exp, Cosh and Sinh Regression Problems},
  author = {Zhihang Li and Zhao Song and Tianyi Zhou},
  journal= {arXiv preprint arXiv:2303.15725},
  year   = {2023}
}
R2 v1 2026-06-28T09:37:11.671Z