2022, Vol. 7, Issue 1, Part B
Application of integral equations using numerical wavelet methods
Author(s): Prem Singh
Abstract: The mother wavelet is a prototype function that is adjusted during the wavelet analysis process. A contracted, high frequency version of the prototype wavelet is used for temporal analysis, while a larger, low frequency version of a comparable wavelet is used for frequency analysis. Data activities can be accomplished using the wavelet coefficients since the first signal can be spoken to as a wavelet extension. If we also chose the best wavelet as indicated by the data, the data is meagerly spoken to. Astronomy, nuclear engineering, turbulence, earthquake predictions, acoustics, sub and coding, magnetic resonance, imaging, optics, fractals, speech discrimination, neurophysiology, radar, human vision, signal and image processing, and pure mathematics applications, such as understanding partial differential equations, are all influencing the use of wavelets.
DOI: 10.22271/maths.2022.v7.i1b.791Pages: 159-162 | Views: 545 | Downloads: 14Download Full Article: Click Here
How to cite this article:
Prem Singh.
Application of integral equations using numerical wavelet methods. Int J Stat Appl Math 2022;7(1):159-162. DOI:
10.22271/maths.2022.v7.i1b.791