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Complex Diffusion Maps with $\omega$-Parameterized Kernels Revealing Inherent Harmonic Representations

Machine Learning 2026-05-05 v1

Abstract

In this paper, we propose Complex Diffusion Maps (CDM), a novel diffusion mapping framework that aims to reveal the dominant complex harmonics of high-dimensional data. Inspired by the local Gaussian kernel relevant to the heat equation and the nonlocal Schr\"odinger kernel relevant to the Schr\"odinger equation, we propose a unified family of ω\omega-parameterized complex-valued kernels for the trade-off between local and nonlocal connections. We establish the theoretical foundation based on the operator spectrum theory, where the corresponding diffusion operator, diffusion distance, and complex harmonic maps are well-defined. An optimization-based interpretation of the maps is also developed, aiming to preserve angular structure in the complex diffusion space rather than relying solely on real-valued magnitude. We extensively evaluate CDM on both synthetic and real-world datasets. The complex-valued kernel amplifies differences among easily confusable samples, improving discriminative power over both linear and nonlinear methods based on real-valued kernels. CDM remains robust in high-noise settings, yielding a clearer eigengap that enhances spectral separation. For resting-state fMRI data, CDM captures more strongly correlated and nonlocal spatiotemporal dynamics. Without task-specific tuning, CDM achieves competitive performance on a public EEG sleep dataset, while maintaining high computational efficiency compared with both traditional machine learning and deep neural network approaches, highlighting its generality and practical value.

Keywords

Cite

@article{arxiv.2605.01691,
  title  = {Complex Diffusion Maps with $\omega$-Parameterized Kernels Revealing Inherent Harmonic Representations},
  author = {Tongzhen Dang and Weiyang Ding and Michael K. Ng},
  journal= {arXiv preprint arXiv:2605.01691},
  year   = {2026}
}

Comments

27 pages main text, 13 pages appendix, 9 figures, 2 tables. Submitted to IEEE TPAMI. Code will be made publicly available upon acceptance

R2 v1 2026-07-01T12:47:10.365Z