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The kolmogorov superposition theorem can break the curse of dimensionality when approximating high dimensional functions

7 Pith papers cite this work. Polarity classification is still indexing.

7 Pith papers citing it

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KAN: Kolmogorov-Arnold Networks

cs.LG · 2024-04-30 · conditional · novelty 8.0

KANs with learnable univariate spline activations on edges achieve better accuracy than MLPs with fewer parameters, faster scaling, and direct visualization for scientific discovery.

Variational Kolmogorov-Arnold Network

cs.LG · 2025-07-03 · unverdicted · novelty 6.0

InfinityKAN is a variational inference method that learns the number of basis functions per layer in KANs during training, matching or exceeding fixed-basis KAN performance across 18 datasets without manual selection.

A Practitioner's Guide to Kolmogorov-Arnold Networks

cs.LG · 2025-10-28 · accept · novelty 3.0

A systematic review of Kolmogorov-Arnold Networks that maps their relation to Kolmogorov superposition theory, MLPs, and kernels, examines basis-function design choices, summarizes performance advances, and supplies a practitioner's selection guide plus open challenges.

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Showing 3 of 3 citing papers after filters.

  • KAN: Kolmogorov-Arnold Networks cs.LG · 2024-04-30 · conditional · none · ref 12

    KANs with learnable univariate spline activations on edges achieve better accuracy than MLPs with fewer parameters, faster scaling, and direct visualization for scientific discovery.

  • Singularity Formation: Synergy in Theoretical, Numerical and Machine Learning Approaches math.NA · 2026-04-18 · unverdicted · none · ref 201

    The work introduces a modulation-based analytical method for singularity proofs in singular PDEs and refines ML techniques like PINNs and KANs to identify blowup solutions, with application to the open 3D Keller-Segel problem.

  • A Practitioner's Guide to Kolmogorov-Arnold Networks cs.LG · 2025-10-28 · accept · none · ref 276

    A systematic review of Kolmogorov-Arnold Networks that maps their relation to Kolmogorov superposition theory, MLPs, and kernels, examines basis-function design choices, summarizes performance advances, and supplies a practitioner's selection guide plus open challenges.