Continuous wavelet transform: Difference between revisions

One of the most popular applications of wavelet transform is image compression. The advantage of using wavelet-based coding in image compression is that it provides significant improvements in picture quality at higher compression ratios over conventional techniques. Since wavelet transform has the ability to decompose complex information and patterns into elementary forms, it is commonly used in acoustics processing and pattern recognition, but it has been also proposed as an instantaneous frequency estimator.<ref>{{Cite journal|last1=Sejdic|first1=E.|last2=Djurovic|first2=I.|last3=Stankovic|first3=L.|date=August 2008|title=Quantitative Performance Analysis of Scalogram as Instantaneous Frequency Estimator|journal=IEEE Transactions on Signal Processing|volume=56|issue=8|pages=3837–3845|doi=10.1109/TSP.2008.924856|bibcode=2008ITSP...56.3837S|s2cid=16396084|issn=1053-587X}}</ref> Moreover, wavelet transforms can be applied to the following scientific research areas: edge and corner detection, partial differential equation solving, transient detection, filter design, [[electrocardiogram]] (ECG) analysis, texture analysis, business information analysis and gait analysis.<ref>[https://www.youtube.com/watch?v=DTpEVQSEBBk "Novel method for stride length estimation with body area network accelerometers"], ''IEEE BioWireless 2011'', pp. 79–82</ref> Wavelet transforms can also be used in [[Electroencephalography]] (EEG) data analysis to identify epileptic spikes resulting from [[epilepsy]].<ref>{{Cite journal|last1=Iranmanesh|first1=Saam|last2=Rodriguez-Villegas|first2=Esther|author-link2=Esther Rodriguez-Villegas|year=2017|title=A 950 nW Analog-Based Data Reduction Chip for Wearable EEG Systems in Epilepsy|journal=IEEE Journal of Solid-State Circuits|volume=52|issue=9|pages=2362–2373|doi=10.1109/JSSC.2017.2720636|bibcode=2017IJSSC..52.2362I|hdl-access=free|hdl=10044/1/48764|s2cid=24852887}}</ref> Wavelet transform has been also successfully used for the interpretation of time series of landslides<ref>{{Cite journal|last1=Tomás|first1=R.|last2=Li|first2=Z.|last3=Lopez-Sanchez|first3=J. M.|last4=Liu|first4=P.|last5=Singleton|first5=A.|date=2016-06-01|title=Using wavelet tools to analyse seasonal variations from InSAR time-series data: a case study of the Huangtupo landslide|journal=Landslides|language=en|volume=13|issue=3|pages=437–450|doi=10.1007/s10346-015-0589-y|bibcode=2016Lands..13..437T |issn=1612-510X|hdl=10045/62160|s2cid=129736286|url=http://rua.ua.es/dspace/bitstream/10045/62160/5/2016_Tomas_etal_Landslides_rev.pdf|hdl-access=free}}</ref> and land subsidence ,<ref>{{Cite journal |last1=Tomás |first1=Roberto |last2=Pastor |first2=José Luis |last3=Béjar-Pizarro |first3=Marta |last4=Bonì |first4=Roberta |last5=Ezquerro |first5=Pablo |last6=Fernández-Merodo |first6=José Antonio |last7=Guardiola-Albert |first7=Carolina |last8=Herrera |first8=Gerardo |last9=Meisina |first9=Claudia |last10=Teatini |first10=Pietro |last11=Zucca |first11=Francesco |last12=Zoccarato |first12=Claudia |last13=Franceschini |first13=Andrea |date=2020-04-22 |title=Wavelet analysis of land subsidence time-series: Madrid Tertiary aquifer case study |url=https://piahs.copernicus.org/articles/382/353/2020/ |journal=Proceedings of the International Association of Hydrological Sciences |language=en |volume=382 |pages=353–359 |doi=10.5194/piahs-382-353-2020 |doi-access=free |bibcode=2020PIAHS.382..353T |issn=2199-899X|hdl=11577/3338112 |hdl-access=free }}</ref>, and for calculating the changing periodicities of epidemics.<ref>{{Citation |last=von Csefalvay |first=Chris |title=Temporal dynamics of epidemics |date=2023 |url=https://linkinghub.elsevier.com/retrieve/pii/B9780323953894000165 |work=Computational Modeling of Infectious Disease |pages=217–255 |publisher=Elsevier |language=en |doi=10.1016/b978-0-32-395389-4.00016-5 |isbn=978-0-323-95389-4 |access-date=2023-02-27|url-access=subscription }}</ref>