Time-delay estimation using the Wigner-Ville distribution
Abstract
Accurately calculating time delays between signals is pivotal in many modern physics applications. One approach to estimating these delays is computing the cross-spectrum in the time-frequency domain. Linear time-frequency representations, such as the continuous wavelet transform (CWT), are widely used to construct these cross-spectra. However, it is well known that the frequency resolution is inherently limited by the localized nature of the convolving wavelet. Moreover, the functional form of the CWT cross-spectrum is not a proper correlation measure and typically requires post-processing smoothing. Conversely, quadratic representations achieve joint time-frequency resolution approaching the Gabor-Heisenberg limit while also providing an adequate measure of similarity between the signals. Motivated by these advantages, we propose a time-delay estimation method based on the Wigner-Ville Distribution (WVD). Considering nonstationary signals arising from two typical wave-physics scenarios, we show that the WVD yields more accurate time-delay estimates with lower uncertainty, particularly in the most energetic frequency bands.
Cite
@article{arxiv.2603.20058,
title = {Time-delay estimation using the Wigner-Ville distribution},
author = {L. de A. Gurgel and J. M. de Araújo and L. D. Machado and P. D. S. de Lima},
journal= {arXiv preprint arXiv:2603.20058},
year = {2026}
}
Comments
9 pages, 6 figures