riemann 中文意思是什麼
riemann
解釋
里曼-
He could not understand riemann's work on abelian functions nor roch's contributions in his dissertation.
他不能理解Riemann在Abel函數方面的工作,也不懂Roch論文中的論著。 -
He could not understand riemann ' s work on abelian functions nor roch ' s contributions in his dissertation
他不能理解riemann在abel函數方面的工作,也不懂roch論文中的論著。 -
The riemann - hilbert problem for first order linear elliptic complex equation with parabolic degeneracy is dealed with here
討論了一階退化橢圓型復方程的riemann - hilbert邊值問題。 -
It was this concept that riemann generalized, thereby opening up new vistas in non - euclidean geometry
這個概念嗣後為riemann所推廣,從而在非歐幾里德幾何學中開辟了新前景。 -
Gauss assigned to riemann the subject of the foundations of geometry as the one on which he should deliver his qualifying lecture.
Gauss給Riemann指定把幾何基礎作為他應該發表的就職演說的題目。 -
High - order decay estimates of solutions to the riemann problem of the inviscid burgers equation
方程黎曼問題光滑近似解的高階衰減估計 -
In this paper, resorting to the hypermonogenic function in real clifford analysis, we define the hypermonogenic function in complex clifford analysis and give the sufficient and necessary conditions of complex monogenic and complex hypermonogenic functions. the result is similar to the cauchy - riemann condition of complex analysis. so we get some relations between the real and complex clifford functions
本文藉助實clifford分析中的超正則函數,定義了復clifford分析中的超正則函數,得到了復正則函數及復超正則函數的充分必要條件,這些條件類似於單復變中的cauchy - riemann條件,使復clifford函數與實clifford函數有了聯系,並討論了復超正則函數的若干性質。 -
After constrcting the perfective space, prove that this space is just the space of lebesgue integratiable function, thus explain that lebesgue integral is the form of the perfective riemann integral
在構造了完備化空間之後,證明了該空間就是勒貝格可積函數空間,從而說明了黎曼積分的完備化形式是勒貝格積分。 -
Christoffel's major concern was to reconsider and amplify the theme already treated somewhat sketchily by riemann.
Christoffel主要關心的是重新考慮和詳細論述Riemann已經稍為粗略地討論過的題目。 -
And finally, with hllc and lax - friedrichs type approximate riemann solver for discretising conservative equations and a nonconservative equation, a simple accurate and fully eulerian numerical method is presented. compared with the numerical results of hll scheme, the hllc scheme has a high resolution for shock waves and avoiding the nonphysical oscillation of the hll scheme
最後用lax ? friedrichs格式及hllc格式作為通量函數對守恆一維euler型方程組進行了離散,並將數值模擬結果和saurel的hll格式模擬結果進行了比較,發現:在兩相流數值模擬過程中,相對來說hllc格式對激波的解析度最高,結果最穩定,避免了hll格式在間斷處的非物理性數值振蕩。 -
It was this concept that riemann generalized, thereby opening up new vistas in non-euclidean geometry.
這個概念嗣後為Riemann所推廣,從而在非歐幾里德幾何學中開辟了新前景。 -
Wiles and / or they must also prove the riemann hypothisis ! !
威爾斯和或他們還必須證明黎曼假設! ! ! -
Continuity, integrability and differentiability of riemann function are discussed ; especially, the non - differentiable properties on [ 0, 1 ] are proved, and dirichlet ' s function is comparated with it
摘要從黎曼函數的簡單特徵入手討論它的連續性、可積性、可導性,特別是證明了黎曼函數在區間[ 0 , 1 ]上處處不可導,並結合狄利克雷函數加以引申和推廣。 -
Lots of concrete examples are (, ) - metrics. and one of fundamental problems in finsler geometry is to find and study finsler metrics with constant ( flag ) curvature. on the basic, we majarly study the following problems in present paper : ( a ) to the property of a class of (, ) - metrics in which is parallel with respect to riemann metric a and riemann metric a is of constant curvature, we obtain the following theorem4. 3 let f (, ) be a positive definite metric on the manifold m ( dimm > 3 )
在finsler幾何中,我們現在已知的finsler度量已經很多了,但大多數具體的例子主要都集中在( , ) ?度量中,又在finsler幾何中一個基本的問題就是去發現和研究具有常曲率的finsler度量,基於這些本文主要研究了以下一些問題: ( a )一類關於是平行的並且riemann度量具有常曲率的( , ) ?度量的特殊性質,得到了如下的定理4 -
In the part of orbit control, the main ideas in study is to define the nonlinear control system on a riemann manifold from the global viewpoint, and to build the intimate relation between the geometrical structure of state space and the state equation of nonlinear control system ; in the part of attitude control, the main ideas in study is to deduce mathematical model with good character based on global differential geometry ideas as well as li group and li algebra, moreover, to design corresponding control schemes
在軌道控制部分,研究的主要思想是從整體化的觀點出發定義一種建立在riemann流形上的非線性控制系統,將狀態空間的幾何結構與控制系統的狀態方程建立直接的聯系。在姿態控制部分,研究的主要思想是以整體微分幾何方法為工具,以李群與李代數等數學理論為基礎,從數學角度建立具有良好性能的數學模型,並設計出相應的控制方法。 -
Based on this result, convergence of gaussian quadrature formulas for riemann - stieltjes integrable functions on an arbitrary system of nodes on infinite intervals is discussed
應用這個結果,我們討論了關于riemann - stieltjes可積函數f ( x )基於無限區間上的任意節點系的gauss求積公式的收斂性。 -
Finte function, the typical representative of many - valued function, is clearly and vividly exposed its complicated alternative character by riemann surface and is thoroughly discussed the key points and the process of monodromic branch ceded from many - valued function
摘要通過討論多值函數的典型代表根式函數,運用黎曼面,清晰、形象地揭示多值函數復雜的變換特性,並論述分出多值函數的各單值分支的關鍵問題及其方法。 -
At the beginning of 20 * century, lebesgue rebuilt riemann integral and introduced lebesgue integral. with the development of modern mathematics, the concept of integral develops too
20世紀初,集合論的觀點引起積分學的變革, lebesgue以集合測度概念為基礎,對riemann積分的定義加以改造,建立lebesgue積分的概念。 -
The stability of cauchy singular integral when the integral curve has a smooth perturbation is discussed in our first partition ; we apply some results of the first partition to the second partition and solve the stability of the solution to the cauchy singular integral equation. finally, on the basis of the stability of the cauchy type integral, we study the stability of the solution to the riemann boundary value problem when the contour perturbs smoothly
在第一部分中,我們主要討論了cauchy奇異積分在積分曲線發生光滑擾動時的穩定性問題;而在第二部分中,我們把第一部分的結果應用到cauchy奇異積分方程,導出了其關于積分曲線攝動的穩定性的研究及其一些結果;最後,在第三部分中,我們在研究cauchy型積分關于積分曲線的穩定性問題的基礎上,探討了riemann邊值問題的穩定性問題。 -
On generalized non - ordinary riemann integrals
關于廣義非正常黎曼積分的注記
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