weyl 中文意思是什麼
weyl
解釋
韋爾-
In this paper, the folio wings are introduced briefly : holonomic theory ; the basic idea that d. zeilberger used to prove identities using holonomic theory. and wu method is generalized to the non - commutative weyl algebra. furthermore, dialytic method of elimination is replaced by wu method, so the prove can be extended from the single - variable hypergeometric identities to multi - variable ones
本文簡要介紹了完整性理論, d . zeilberger利用完整性理論證明恆等式的基本思想,將吳方法推廣到不可交換的weyl代數上,用吳方法取代了d . zeilberg在證明完整性函數恆等式的理論框架中的析配消元法,從而將這種證明理論由單變量超幾何恆等式的證明擴展到多變量超幾何恆等式的證明。 -
Let d be a nonzero k - vector space of commuting - derivations of a. kaim - ing zhao and yucai su studied the associative algebra a [ d ] = ak [ d ] of weyl type constructed from the pair of a commutative associative algebra. 4 and its commutative derivation subalgebra d over a field k of arbitrary characteristic
趙開明和蘇育才研究了任意特徵的域上具有單位元的交換結合代數a和它的交換導子的子空間d所構造的weyl型代數。他們證明了a [ d ]是單lie代數的充分必要條件是a是d -單的且k _ 1 [ d ]忠實地作用在a上。 -
The weyl - moyal transformation takes operator multiplication into the moyal product of functions on the phase space
希爾伯特空間運算元乘積與量子空間的函數moyal星乘積之間的關系是由weyl - moyal變換聯系起來的。 -
The struction of s - affine weyl groups of finite dimension simple lie algebra
素特徵域上扭仿射李代數的實現 -
Hermann weyl ", " in these days the angel of topology and the devil of abstract algebra fight for the soul of each individual matehmatical domain. ",
在這些日子里,拓撲這個天使和抽象代數這個魔鬼為各自佔有每一塊數學領域而斗爭著. -
Weyl ' s theorem
魏爾定理 -
The paper is organized as follows. in the first section, we introduce some backgrounds and recall the definitions including weyl type algebra, smash product and ore extension
本文具體組織如下:第一節主要介紹了基本概念和理論背景,給出了weyl型代數, smash積,和ore擴張等基本概念。 -
We present the definition of schubert submodules and what m. e. hall has done. chapter 2 is preliminaries. we cite some relevant lemmas to introduce the properties of w, which is an element in weyl group of a lie algebra
第二節是概念和背景知識,主要是給出一些本文用到的概念及符號,以及一些本文用到的與w的性質相關的引理;並著重介紹引理2 -
Hermann weyl ", " without the concepts, methods and results found and developed by previous generations right down to greek antiquity one cannot understand either the aims or the achievements of mathematics in the last fifty years. ",
如果不知道遠溯古希臘各代前輩所建立和發展的概念,方法和結果,我們就不可能理解近五十年來數學的目標,也不可能理解它的成就.
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