奇異吸引子 的英文怎麼說

中文拼音 [yǐnzi]
奇異吸引子 英文
strange attractor
  • : 奇Ⅰ形容詞1 (罕見的; 特殊的; 非常的) strange; queer; rare; uncommon; unusual 2 (出人意料的; 令...
  • : 形容詞1 (有分別; 不相同) different 2 (奇異; 特別) strange; unusual; extraordinary 3 (另外的;...
  • : 動詞1 (把液體、氣體等引入體內) inhale; breathe in; draw 2 (吸收) absorb; suck up 3 (吸引) a...
  • : Ⅰ動詞1 (牽引; 拉) draw; stretch 2 (引導) lead; guide 3 (離開) leave 4 (伸著) stretch 5 (...
  • : 子Ⅰ名詞1 (兒子) son 2 (人的通稱) person 3 (古代特指有學問的男人) ancient title of respect f...
  • 奇異 : 1. (奇怪) queer; strange; bizarre; odd 2. (驚異) surprising; curious
  • 引子 : 1 [劇] an actor s opening words2 [音樂] introductory music3 (引起正文的話) introductory remarks...
  1. The natural tightly connection between chaos and fracture is due to the infinite similarities of strange attractor of chaotic dynamic system

    混沌動力系統的奇異吸引子所具有的無窮自相似性使混沌理論和分形學自然緊密聯系。
  2. Nonlinear viewpoints on development of science is depended on that the science is the partial system of society system, and it not only has the nonlinear interaction which is the source and motive force of development, but also has strange attractor which lead to order in the disorder, that is science problem and science theory, matthew effect and priority. the development of science also possesses sensitive dependence to the primary condition. it will flux and reflux suffered from the influence of various random factors inside and outside of system

    科學發展的非線性觀立足點就在於科學是社會系統的分系統,它不僅有非線性相互作用,這構成了發展的源泉和動力,更有導致無序中產生有序的奇異吸引子(科學問題與科學理論, 「馬太效應」與「優先權」 ) ,在發展過程中對初始條件也具有敏感依賴性,並受到系統內部、外部的各種隨機因素的影響而產生漲落,在常規發展時期表現為科學的漸變,也就是量的積累,當漲落放大時就表現為科學革命,即質的改變。
  3. Because of " fixed point attractor ", " limit cycle attractor ", " tons attractor " and " strange attractor " dominating the dynamics system, present - day crustal movement presents the various dynamics states such as " stable state ( dynamic balancing state ) ", " period state ", " quasi - period state ", " chaos state " and " edge of chaos "

    在」不動點」 、 「極限環」 、 「環面」和「奇異吸引子」的作用下,現今地殼運動呈現出「穩定態(動平衡態) 」 、 「周期態」 、 「擬周期態」 、 「混沌態」和「混沌邊緣態」等多種動力學狀態。
  4. Lyapunov exponent depict the discrete extent of chaotic dynamic system. there propose an estimation of one step prediction error based on lyapunov exponent, the estimation express the reliability of prediction numerically. at the same time, in order to improve the predictive precision it drew out an error complement methods creatively to correct one step prediction

    Lyapunov指數定量刻畫混沌離散動力系統的平均發散程度,基於lyapunov指數作出了一步預測的誤差估計,以此來定量反映預測的可靠性;根據奇異吸引子流形的性質,創造性的提出殘差補充法,對預測值作出修正以降低誤差,提高預測精確性。
  5. In order to analytically deduce the characteristic scaling law, we have constructed a simplified piecewise linear model that describes the characteristic phenomenon so that we can quantitatively and analytically deduce the sudden change of the rules of the fractal dimension of the strange repeller and the averaged lifetime in the region occupied by the original attractor at a critical parameter value when the repeller disappears

    為了解析地導出這種激變的特徵標度律,我們構造了一個描述這種特徵現象的簡化分段線性模型,並藉助它定量地解析描繪了當排斥在臨界參數值消失時,排斥的分數維和在原混沌區域迭代的平均生存時間的突變。
  6. ( 2 ) shanghai stock market, which shows distinct fractal structure and chaos properties in the price evolution route, is a nonlinear dynamic system. there is a strange attractor in the price evolution route

    ( 2 )上海股票市場具有明顯的分形結構與混飩特徵,是一個非線性系統,系統價格演化存在一個奇異吸引子
  7. This thesis is divided into six chapters. in chapter 1, the review of the chaos research background and developments involving the definitions of chaos, mea - surements of chaos, concept of transversal homoclinic points, concept of strange attractors, and control and anti - control of chaos is presented

    第一章中,我們首先從分別從混沌動力學研究中關于混沌的幾種不同的數學定義、混沌度量、橫截同宿點、奇異吸引子等若干方面,介紹了混沌理論的發展歷史及現實狀況,指出了研究混沌理論的必要性
  8. In addition, guckenheimer and holmes spent a great of length to discuss it in the book [ 1 ] in 1983. they gave the sufficient condition 5 that ensure the existence of the horseshoe of the model for = 1 and used numerical value method to discovered " stranfe attractor " for certain a ( for example : - 1, - 6 ) where denote the colliding coefficient of restitution and the amplitude of the ball

    Guckenheimer和holmes在專著[ 1 ]中用了相當的篇幅討論了彈跳球模型,當= 1時給出了存在馬蹄的條件( 5 ) ,對某些( 1 )則僅用數值方法得到在一定條件下出現「奇異吸引子」 (例如= 0 . 5 , = 6 ) ,這里與分別表示小球的碰撞恢復系數和激振力振幅。
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