重對數 的英文怎麼說

中文拼音 [zhòngduìshǔ]
重對數 英文
log-log重對數律 law of iterated logarithm; 重對數圖尺[標度] log-log scale; 重對數選擇性 log-log selection
  • : 重Ⅰ名詞(重量; 分量) weight Ⅱ動詞(重視) lay [place put] stress on; place value upon; attach im...
  • : Ⅰ動詞1 (回答) answer; reply 2 (對待; 對付) treat; cope with; counter 3 (朝; 向; 面對) be tr...
  • : 數副詞(屢次) frequently; repeatedly
  1. A law of the iterated logarithm for the heavily trimmed sums

    截和的重對數
  2. The bounded law of the iterated logarithm for sequen

    隨機變量列的有界重對數
  3. Study of allocating family bed with logarithmic model

    重對數模型配置社區家庭病床研究
  4. The limit theory of law of the iterated logarithm have received more and more attentions, especially about identical independent random variables. but up to now, the studies are only for partial sums and, have n ' t shown any concern on the special finite partial weight suras. however, the partial sums and partial weight sums not only have the osculating aspects, but also have essential difference between them. so the studies for these play an important role in theoretical and applied setups

    因此重對數律的研究引起了國內外學者的興趣,獨立同分佈的隨機變量,許多學者做了大量的研究工作,但迄今為止這方面的研究仍限於部分和列的重對數律,很少涉及到特殊加權和的領域,而部分和與加權和之間既有密切聯系,又有本質不同,因此,這一問題的研究具有一定理論意義和應用價值。
  5. Law of the iterated logarithm of quantile density estimator for left truncated and right censored data

    左截斷右刪失據下分位密度估計的重對數
  6. Heavily trimmed sums ; lil ; strong approximation

    截和重對數律強逼近
  7. Law of iterated logarithm for markov chains in markovian environments

    馬氏環境中馬氏鏈的重對數
  8. Asymptotic minimax efficiency ; interative logarithm law ; mean error

    漸近minimax有效重對數律均方誤差
  9. Law of the iterated logarithm for nonstationary negatively associated random fields

    隨機變量域的重對數
  10. The third chapter discusses the convergence rates of na sequences in lil

    第三章研究了na序列重對數律的收斂速度。
  11. The law of iterated logarithm of

    重對數
  12. On the lil of kernel estimators of regression on the lil of kernel estimators of regression

    隨機刪失情形下回歸函核估計的重對數
  13. Precise asymptotic in the laws of large numbers and law of iterated logarithm for some statistics

    一類統計量的強大律和重對數律的精確極限性質
  14. A kind of complete convergence of sums for negatively associated sequences of non - identically distributed random variables, in the second chapter, is obtained and the requirement of known results are weakened to the condition that absoluted moment - larger than zero - is finite. the strong convergence of negatively associated sequences of non - identically distributed random variables is discussed in the third chapter. in the fourth chapter, after extend the laws of the iterated logarithm of strong stationary case to weak stationary case, we obtain the strong convergence rate for negatively associated sequences of non - identically distributed random variables in linear models

    其中第二章討論了一類不同分佈的na列的加權和的完全收斂性,我們把已有的結果矩的要求放寬到了只要求大於0的絕矩有限的情形;第三章討論了不同分佈的na列的加權和的強收斂性;第四章首先把文[ 10 ]的關于na的重對數律由強平穩的情形推廣到了弱平穩不同分佈的情形,然後得到了線性模型中不同分佈的na誤差列的收斂速度。
  15. In this paper, sufficient conditions are given for applicability of the law of the iterated logarithm for self - normalized sums of independent random vectors

    摘要本文給出了獨立隨機向量序列自正則和的重對數律成立的一個充分條件。
  16. On the basis of analysis of digital city research framework and existing 3d urban model, this paper researches mainly the techniques of building model based on csg in digital city

    本文在字城市的研究體系和三維城市模型進行分析的基礎上,著重對數字城市建築物的構造實體幾何( csg )建模方法進行了研究。
  17. We have been familiar with " the law of iterated logarithm of kolmogorov " and " the law of iterated logarithm of hartman - wintner ". this paper will mainly discuss the law of iterated logarithm for some kind weighted partial sum

    各種文獻中獨立隨機變量序列重對數律已有深入討論,我們已熟知「 kolmogorov重對數律」及「 hartman - wintner重對數律」 。
  18. As for i. i. d. r. v., we get the extension of " the law of iterated logarithm of hartman - wintner " under weaker conditions. at the end of this paper, we discuss that the moment conditions of theorem are necessary to the law of iterated logarithm of this form

    獨立同分佈的情形,在更弱的條件下得到「 hartmnan - wintner重對數律」的推廣,並在文章最後證明了此時這種形式的重對數律定理中矩條件是必要的。
  19. The paper consists of two chapters. in the first chapter, theory 1 [ 1 ] mainly by using the method of the law of the iterated logarithm with finite partial sum in wiener process proves hartman - wintner [ 1 ] law of the iterated logarithm for special finite partial weight sums

    本文正文分兩部分,定理1主要利用[ 1 ] wiener過程下的有限項部分和的重對數律,把hartman - wintner重對數律[ 1 ]推廣到特殊加權部分和也成立。
  20. Let { xn ; n > 1 } be mutually identically independent random variables distributed according to the normal distribution, { sn, n > 1 } be finite partial sum series, the purpose of this paper is to investigate law of the iterated logarithm type results for special finite partial weight sum series { sn, n > 1 }, we assume that sn = a1sn + a2 ( s2n - sn ) + a3 ( s3n - s2n ) +. . + ad ( sdn - s ( d - 1 ) n ) in the second chapter, theory 2 by using the method of literature [ 8 ], we extend hartman - wintner law of iterated logarithm on the gauss distribution. we substitute negative correspond for independent. it extends the corresponding results in gauss distribution

    設{ x _ n ; n 1 }是獨立同分佈的且服從標準正態分佈的隨機變量序列, { s _ n , n 1 }是其部分和列,討論有限項特殊加權部分和{ s _ n , n 1 }的重對數律,其中定理2利用文獻[ 8 ]提供的方法,在高斯分佈上改進了hartman - wintner的重對數律,取消獨立性用更弱的條件負相關代替,大大拓寬了重對數律在高斯分佈中的使用范圍。
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