combinatorics 中文意思是什麼
combinatorics
解釋
計數論證-
This part gives a study on the some objects in combinatorics researched in the middle ages. those researches are substantially composed by search for the formulae of permutation and combination, the arithmetical triangle and the magic square
二、考察了中世紀數學家對組合學相關內容的研究,主要體現在排列、組合公式的探求,確立算術三角形和構作幻方三個專題。 -
However, there is no area where probabilistic methods are more natural than in combinatorics.
但是,沒有任何一個領域比在組合學中使用概率方法更自然了。 -
Sponsored by graph, combinatorics and networks
圖論組合與網路研究中心 -
4. the history of primary problems in enumerative combinatorics is explored in some special subjects
四、以專題的形式討論了經典計數問題中一些最基本內容的產生歷史及其發展過程。 -
The theorem has many deep extensions which are important not only in graph theory and combinatorics but in set theory(logic)analysis as well.
這個定理有許多深刻的推廣,它們不僅在圖論和組合論中是重要的,而且在集論(邏輯)和分析中是同樣重要的。 -
The second class of problem comes from the world of combinatorics
第二類問題來自組合數學界。 -
Some problems related to both combinatorics and number theory
組合數學與數論間的一些交叉問題初探 -
At first, one is tempted to believe that it is simply a question of combinatorics
起初,人們以為這只是一個組合數學問題。 -
Much of combinatorics is about graphs, to whose study all types of combinatorics can contribute.
很多組合數學研究圖形,所有組合數學的研究都對圖形研究有所助益。 」 -
Some mathematical games and recreations acted as an essential role in the development of earlier combinatorics. 2
那些古老的富有益智性的數學游戲為組合學早期的發展提供了大量的研究素材。 -
In proc 8th international computing and combinatorics conference, singapore, 2002, cocoon o2, lecture notes in computer science, vol
近年來便攜式個人計算器件和無線通訊系統的使用促使工程技術人員設計和生產高性能的系統。 -
The purpose of this article is to introduce a number of functional equations. some are solved and others unsolved yet. a solution of one of them would much influence the development of not only combinatorics but also the theory of functional equations
本文旨在提出一些泛函方程,它們當中任何一個的解決不僅對泛函方程理論而且對當今組合計數理論的發展將會產生新的突破 -
6. the history of ramsey theory and sdr in combinatorial set theory is briefly discussed. in short, i hope to present a concise history of combinatorics through above discussion
六、對現代組合學中較抽象化的內容? ?組合集論予以討論,主要論述了拉姆齊理論及相異代表系發展歷史的主要脈絡。 -
From the wikipedia : " combinatorics is a branch of mathematics that studies collections usually finite of objects that satisfy specified criteria
引自wikipedia : 「組合數學識數學的一個分支,它研究滿足具體標準的物體的(有限)集合。 -
Combinatorics, . formed as a branch of mathematics in 1960s, has a long history. it holds a rapid speed of development in recent years
組合學是現代數學學科中發展較快的一個分支,它雖然在20世紀60年代才獨立成為數學的一個分支,但其發展歷史卻是悠久的。
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