趙啟正 的英文怎麼說
中文拼音 [zhàoqǐzhēng]
趙啟正
英文
zhao qizheng-
Zhao shu - li was a true successor of lu xun ' s literature spirit of enlightenment doctrine and realism
摘要趙樹理是魯迅啟蒙主義和現實主義文學精神的真正傳人。Qu jianguo, chairman of shanghai jianguo public foundation ( left ) had a photo taken with zhao qizheng, president of the central council news office ( right )
上海建國社會公益基金會會長瞿建國與國務院新聞辦公室主任趙啟正合影。This will be his second visit to china. his meetings will include mii minister wang xudong, and state council information office minister zhao qizheng
這是他第2次到訪中國,他將會見中國信息產業部部長王旭東和國務院新聞辦公室主任趙啟正。Zhao zheng - qi, zhou xiao - shan, and ai yong
趙正啟周小珊艾勇Minister zhao qizheng of the chinese state council information office stated, " my department will support accoona corp. efforts to promote chinese enterprises to do business with companies throughout the world "
中國國務院新聞辦公室主任趙啟正稱, 「我的部門將支持accoona公司的努力,以推進中國公司與世界其他公司之間的貿易。 」But in more situations the random variables generating counting processes may not independent identically distributed, and in all kinds of dependent relations, negative association ( na ) and positive association ( pa ) are commonly seen. the research and apply in this aspect are rather valuable. in chap 2 we prove wald inequalities and fundamental renewal theorems of renewal counting processes generated by na sequences and pa sequences ; in chap 3 we are enlightened by cheng and wang [ 8 ], extend some results in gut and steinebach [ 7 ], obtain the precise asymptotics for renewal counting processes and depict the convergence rate and limit value of renewal counting processes precisely ; at last, in the study of na sequences, su, zhao and wang ( 1996 ) [ 9 ], lin ( 1997 ) [ 10 ] have proved the weak convergence for partial sums of stong stationary na sequences. however product sums are the generalization of partial sums and also the special condition of more general u - statistic
但在更多的場合中,構成計數過程的隨機變量未必相互獨立,而在各種相依關系中,負相協( na )和正相協( pa )是頗為常見的關系,這方面的研究和應用也是頗有價值的,本文的第二章證明了na列和pa列構成的更新計數過程的wald不等式和基本更新定理的一些初步結果;本文的第三章則是受到cheng和wang [ 8 ]的啟發,推廣了gut和steinebach [ 7 ] )中的一些結論,從而得到了更新計數過程在一般吸引場下的精緻漸近性,對更新計數過程的收斂速度及極限狀態進行精緻的刻畫;最後,在有關na列的研究中,蘇淳,趙林成和王岳寶( 1996 ) 》 [ 9 ] ,林正炎( 1997 ) [ 10 ]已經證明了強平穩na列的部分和過程的弱收斂性,而乘積和是部分和的一般化,也是更一般的u統計量的特況,它與部分和有許多密切的聯系又有一些實質性的區別,因此,本文的第四章就將討論強平穩na列的乘積和過程的弱收斂性,因為計數過程也是一種部分和,也可以構成乘積和,這個結果為研究計數過程的弱收斂性作了一些準備。分享友人