Progress in Applied Mathematics
The Energy of Convolution of 2-Dimension Exponential Random Variables Base on HaarWavelet
Abstract
In this paper, through wavelet methods, we obtain the energy of convolution of two-dimension exponential random variables and analyze its some properties of wavelet alternation, and we obtain some new results.
Key words: Exponential random variables; Wavelet alternation; Convolution; Energy
Keywords
Full Text:
PDFDOI: http://dx.doi.org/10.3968/j.pam.1925252820120302.1145
DOI (PDF): http://dx.doi.org/10.3968/g2487
Refbacks
- There are currently no refbacks.
Copyright (c)
Share us to: 
Reminder
If you have already registered in Journal A and plan to submit article(s) to Journal B, please click the "CATEGORIES", or "JOURNALS A-Z" on the right side of the "HOME".
We only use the follwoing mailboxes to deal with issues about paper acceptance, payment and submission of electronic versions of our journals to databases:
pam@cscanada.org
pam@cscanada.net
Articles published in Progress in Applied Mathematics are licensed under Creative Commons Attribution 4.0 (CC-BY).
ROGRESS IN APPLIED MATHEMATICS Editorial Office
Address: 1055 Rue Lucien-L'Allier, Unit #772, Montreal, QC H3G 3C4, Canada.
Telephone: 1-514-558 6138
Http://www.cscanada.net
Http://www.cscanada.org
E-mail:office@cscanada.net office@cscanada.org caooc@hotmail.com
Copyright © 2010 Canadian Research & Development Center of Sciences and Cultures 
