Riemann–Hurwitz Formula

Riemann–Hurwitz Formula

Lambert M. Surhone, Mariam T. Tennoe, Susan F. Henssonow

     

бумажная книга



Издательство: Книга по требованию
Дата выхода: июль 2011
ISBN: 978-6-1312-6564-8
Объём: 72 страниц
Масса: 129 г
Размеры(В x Ш x Т), см: 23 x 16 x 1

High Quality Content by WIKIPEDIA articles! In mathematics, the Riemann–Hurwitz formula, named after Bernhard Riemann and Adolf Hurwitz, describes the relationship of the Euler characteristics of two surfaces when one is a ramified covering of the other. It therefore connects ramification with algebraic topology, in this case. It is a prototype result for many others, and is often applied in the theory of Riemann surfaces (which is its origin) and algebraic curves. Now assume that S and S? are Riemann surfaces, and that the map ? is complex analytic. The map ? is said to be ramified at a point P in S? if there exist analytic coordinates near P and ?(P) such that ? takes the form ?(z) = zn, and n > 1. An equivalent way of thinking about this is that there exists a small neighborhood U of P such that ?(P) has exactly one preimage in U, but the image of any other point in U has exactly n preimages in U. The number n is called the ramification index at P and also denoted by eP.

Данное издание не является оригинальным. Книга печатается по технологии принт-он-деманд после получения заказа.

Каталог