PulseAugur
EN
LIVE 11:26:07

New deep neural network design bypasses curse of dimensionality for function approximation

Researchers have developed symmetric deep neural networks capable of approximating symmetric Korobov functions. The study demonstrates that the convergence rate and prefactor in these approximations scale polynomially with the ambient dimension, a significant improvement over previous methods that were subject to the curse of dimensionality. This work also establishes a generalization-error rate for learning symmetric Korobov functions that avoids this dimensional dependency. AI

IMPACT This research offers a theoretical advancement in how deep neural networks can approximate complex functions, potentially leading to more efficient and scalable models for certain applications.

RANK_REASON Academic paper detailing a new theoretical approach to deep neural network approximation. [lever_c_demoted from research: ic=1 ai=1.0]

Read on arXiv cs.LG →

AI-generated summary · Google Gemini · from 1 sources. How we write summaries →

New deep neural network design bypasses curse of dimensionality for function approximation

COVERAGE [1]

  1. arXiv cs.LG TIER_1 English(EN) · Yulong Lu, Tong Mao, Jinchao Xu, Yahong Yang ·

    On the Dimension-Free Approximation of Deep Neural Networks for Symmetric Korobov Functions

    arXiv:2511.12398v2 Announce Type: replace Abstract: Deep neural networks have been widely used as universal approximators for functions with inherent physical structures, including permutation symmetry. In this paper, we construct symmetric deep neural networks to approximate sym…