@inproceedings{ed7144d674bd423480b6883e7545a99c,
title = "The convolution theorem associated with fractional wavelet transform",
abstract = "Novel FractionalWavelet Transform (NFRWT) is a comparatively new and powerful mathematical tool for signal processing. Many results from the Wavelet Transform (WT) domain have currently been extended to NFRWT. However, there are no results from the convolution theorem of the NFRWT. In this paper, we first study the convolution theorem for continuous wavelet transform, and then we derive the convolution theorem of fractional wavelet transform.",
keywords = "Continuous wavelet transform, Convolution, Fractional wavelet transform",
author = "Lu, {Y. Y.} and Li, {B. Z.} and Chen, {Y. H.}",
note = "Publisher Copyright: {\textcopyright} 2015 Taylor & Francis Group, London.; Proceedings of the Asia-Pacific Conference on Electronics and Electrical Engineering, EEEC 2014 ; Conference date: 27-12-2014 Through 28-12-2014",
year = "2015",
doi = "10.1201/b18443-14",
language = "English",
isbn = "9781138028098",
series = "Electronics and Electrical Engineering - Proceedings of the Asia-Pacific Conference on Electronics and Electrical Engineering, EEEC 2014",
publisher = "CRC Press/Balkema",
pages = "71--74",
editor = "Alan Zhao",
booktitle = "Electronics and Electrical Engineering - Proceedings of the Asia-Pacific Conference on Electronics and Electrical Engineering, EEEC 2014",
}