p-adic numbers: An introduction Fernando Quadros Gouvea
Publisher: Springer
The infinite tree for p = 2 model. P-adic Numbers: An IntroductionEbook Free Downloadp-adic Numbers: An Introduction. Extensions of p-adic number fields can be introduced by gluing them along common algebraic numbers to reals. The main motivation of this paper is [1] by Kim, in which he introduced and studied properties of -Bernoulli numbers and polynomials with weight . Customer Review Summary (Average Rating : 5.0 / 5.0) - I only wish I could give more stars. P-adic Numbers: An Introduction Author: Fernando Quadros Gouvea Manufacturer: Springer Publication Date: 1997-07-04. P-Adic Numbers, P-Adic Analysis, Zeta-Functions: Compare Prices. Amazon.com: P-adic Numbers, p-adic Analysis, and Zeta-Functions. Whole by generalizing the number concept by fusing real numbers and various p-adic number fields along common rationals. [1–8]), such as string theory, statistical mechanics, turbulence theory, quantum mechanics, and so forth. In recent years, -adic numbers are widely used in theoretical and mathematical physics (cf. The 2-adic numbers parametrize the red line.