Tkan: Temporal kolmogorov-arnold networks

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Showing 8 of 8 citing papers.

• KAN-CL: Per-Knot Importance Regularization for Continual Learning with Kolmogorov-Arnold Networks cs.LG · 2026-05-12 · conditional · none · ref 21

  KAN-CL cuts catastrophic forgetting by 88-93% on Split-CIFAR-10/5T and Split-CIFAR-100/10T by anchoring KAN parameters at per-knot granularity while matching baseline accuracy.

• KAConvNet: Kolmogorov-Arnold Convolutional Networks for Vision Recognition cs.CV · 2026-04-25 · unverdicted · none · ref 9

  KAConvNet introduces a Kolmogorov-Arnold Convolutional Layer to build networks competitive with ViTs and CNNs while offering stronger theoretical interpretability.

• KAN-MLP-Mixer: A comprehensive investigation of the usage of Kolmogorov-Arnold Networks (KANs) for improving IMU-based Human Activity Recognition cs.AI · 2026-05-18 · conditional · none · ref 22

  A hybrid KAN-MLP model for IMU-based human activity recognition achieves 5.33% relative macro F1 improvement over pure MLPs on eight datasets by placing KANs at input embedding and classification stages.

• Distance-Aware Error for Spline Networks: A Bottom-Up Approach to Uncertainty eess.SP · 2025-01-08 · unverdicted · none · ref 6

  Derives deterministic distance-aware error bounds for spline networks (including KANs) via bottom-up composition from individual spline neurons under higher-order Lipschitz conditions.

• Singularity Formation: Synergy in Theoretical, Numerical and Machine Learning Approaches math.NA · 2026-04-18 · unverdicted · none · ref 124

  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.

• Gait Recognition with Temporal Kolmogorov-Arnold Networks cs.CV · 2026-04-11 · unverdicted · none · ref 11

  A CNN combined with a new Temporal Kolmogorov-Arnold Network using learnable functions and two-level memory achieves strong gait recognition performance on the CASIA-B dataset.

• P1-KAN: an effective Kolmogorov-Arnold network with application to hydraulic valley optimization cs.LG · 2024-10-04 · unverdicted · none · ref 7

  P1-KAN introduces a new KAN architecture with theoretical approximation guarantees that outperforms MLPs and prior KAN variants on irregular functions while matching spline KAN accuracy on smooth ones, demonstrated on hydraulic optimization.

• A Practitioner's Guide to Kolmogorov-Arnold Networks cs.LG · 2025-10-28 · accept · none · ref 187

  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.