Application of the gamma function for the calculation of effective renal plasma flow by [ 131 I] hippuran clearance. Scand J Clin Lab Invest. 1977; 37 :49–51.Olkkonen H, Penttilä IM, Uimarihuhta A (1977) Application of the gamma function for the calculation of effective renal ...
On a q -Analogue of the p -Adic Log Gamma Functions and Related Integrals ☆ We show that Carlitz's q -Bernoulli number can be represented as an integral by the q -analogue μ q of the ordinary p -adic invariant measure, whence we give an answer to a part of a question of Koblitz...
Today's electrical power system is a complicated network that is expanding rapidly. The power transmission lines are more heavily loaded than ever before, which causes a host of problems like increased power losses, unstable voltage, and line overloads.
The dynamic pattern of functional connectivity during a working memory task was investigated by means of the short-time directed transfer function. A clear-cut picture of transmissions was observed with the main centres of propagation located in the frontal and parietal regions, in agreement with ima...
gamma gamma gamma gamma production at the LHC: An application of 2 -> 4 analytic unitarity 来自 nbi.ku.dk 喜欢 0 阅读量: 22 作者: C Williams 年份: 2014 收藏 引用 批量引用 报错 分享 全部来源 免费下载 求助全文 arXiv.org (全网免费下载) arXiv.org (全网免费下载) nbi.ku.dk ...
whereΓ() is the gamma function. It should be noted that this definition of the power spectral density function, used by Ishimaru (1997), differs in (2π)− 3with that of Sato et al. (2012). Substitution of equation (10) into (9) and integration overυgives the amplitude level ...
Abstract classes with a hidden class tree form the basic idea for a fundamental design pattern, the so-called Family pattern of Erich Gamma,5 and expanded constructions like the Bridge pattern of Gamma et al. work similarly. The T&M design lets you implement aspects in this way (see Section...
For example, floor function \lfloor x\rfloor\equiv\sum_{n\le x}1 can be expressed in terms of Zeta function using Perron's formula: \lfloor x\rfloor={1\over2\pi i}\int_{a-i\infty}^{a+i\infty}\zeta(s)x^s{\mathrm ds\over s} ...
Influenza epidemic data are seasonal in nature. Zero-inflation, zero-deflation, overdispersion, and underdispersion are frequently seen in such number of cases of disease (count) data. To explain these counts’ features, this paper introduces a flexible