morphism 中文意思是什麼
morphism
解釋
單同態-
Different alleles may be acquired within the inverted segment after the inversion poly morphism is established.
在倒位多形性形成后,在倒位的區段內可能獲得不同的等位基因。 -
We defined the generalized moore - penrose inve rse of morphism, prove it ' s unique when it is existed, and give some its expression in some cases
定義了態射的加權廣義逆,證明它的唯一性,在某些情形下給出了存在的充要條件和表達式。 -
It differs from the traditional category theory in two directions : all morphisms have types and the composition of morphisms is not necessary a morphism. two aspects of application of typed category theory are discussed : cones and limits of knowledge complexity classes and knowledge completion with pseudo - functors
一個帶類型範疇是一個四元組k o , m , g , t ,其中o是一組對象, m是一組態射,每個態射有一個類型,表示f是從a到b的態射,具有類型t 。 -
It also discusses some properties of homology regular morphism, and its close relationships to homology monomorphism ( epimorphism ) and homology equivalence
給出了同調正則態射的一些性質,以及它與同調單(滿)態和同調等價之間的關系。 -
This paper defines homology monomorphism, homology epimorphism, homology regular morphism in the category of topological spaces with point by using homology functor
摘要利用同調函子,在點標拓撲空間范疇中定義了同調單態、同調滿態、同調正則態射等概念。 -
Existence of morphism on the
的映上的映射的存在性 -
On uniqueness of the solution of a morphism equation
態射方程解的惟一性 -
The aim of this paper is to study the generalized inverse of matrices on rings, the generalized inverse of morphism and partial ordering of matrices
本文研究了環上矩陣的廣義逆,范疇中態射的廣義逆,並研究矩陣的偏序。 -
Since 1950s, many mathematicians have been engaged in studying the " generalized inverse of matrices such as the generalized inverse of matrices on rings, the generalized inverse of morphism, the compution on the generalized inverse of matrices, the application of generalized inverse and so on
Penrose利用四個矩陣方程給出矩陣廣義逆的更為簡潔定義,此後,矩陣廣義逆研究得到了迅速的發展。矩陣廣義逆的研究包括環上矩陣的廣義逆,范疇中態射的廣義逆,廣義逆矩陣的計算和廣義逆矩陣的應用等。 -
A sequence ( epic, monic ) factorization of morphism is " defined, with the help of the sequence ( epic, monic ) factorization of morphism, some necessary and sufficient conditions for the drazin inverse are obtained
首次定義了態射的滿單分解序列,利用其給出了態射的drazin逆存在的充要條件及其表達式。 -
We research the generalized inverse of morphisms in preadditive category, give the characterization for the moore - penrose and drazin inverse, and obtain the necessary and sufficient conditions for the existence of core - nipotent for morphism
我們考察了預加法范疇中態射的廣義逆,利用冪等態射給出了態射廣義逆存在的充要條件及其表達式。 -
Part 2 ( chapter3 ) the moore - penrose inverse and drazin inverse of morphisms with universal - factorzation in category are studied, its existences are characterized, and the expression of the generalized inverse of morphism are establish
( 2 )研究范疇中具有泛分解態射的moore - penrose逆和drazin逆,給出了moore - penrose逆和drazin逆存在的充要條件及其表達式。 -
In this thesis, main research is described as following : 1 ) according to the principle of system science and resemble technology, we systematically discussed the basic theory of simulation technology. combining with several simple but typical examples, we put forward morphism principle and equal principle which based on morphism system and equivalent system and expounded the inherent meaning of simulation and emulation. some vocabulary related were clarified definitely and the interrelationship between simulation, experiment and analysis was expounded. the developing veins of the simulation technolo. gy were elaborately carded. the modern meaning of simulation technology was explained further
本文的工作主要包括以下幾項內容: 1 )從系統科學和相似技術的角度出發,系統地總結及論述了模擬技術的基礎理論;結合幾個簡單的典型實例,提出了以同型系統和等價系統為基礎的同型原理和等價原理,並以此為基礎闡明了模擬和模擬的內在含義;對與模擬相關的一些詞匯作了明確的界定,闡明了模擬方法與試驗方法、理論分析方法的相互關系;對模擬技術的發展脈絡作了細致的梳理;對模擬技術的現代含義作了進一步的說明。 -
The content in chapter three is main of this paper. at the first all we try to discuss the lie algebroid morphism and lie bialgbroicl morphism whose operations are analyzed and discussed. on the basis of this we discuss pullback dirac structure for lie bialgebroid clearly
第三章是本文的主體部分,首先引入了李代數胚態射和李雙代數胚態射的概念,對其運算進行了分析和討論,在此基礎上對李雙代數胚上的拉回dirac結構做了詳細的討論。
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