82,923 research outputs found

    香港中文大學圖書館中國古籍庫

    No full text
    框29.2x18.7公分, 9行22字, 白口, 四周雙邊, 單黑魚尾, 版心上鐫書名, 中鐫卷次, 下鐫"前山敘倫堂".綫裝, 1函.書名據總目卷端.是書為光緖10年(1884)石印本的底本.本書為"香山徐氏宗譜"之一種.Kuang 29.2 x 18.7 gong fen, 9 hang 22 zi, bai kou, si zhou shuang bian, dan hei yu wei, ban xin shang juan shu ming, zhong juan juan ci, xia juan"Qian shan xu lun tang".Xian zhuang, 1 han.Shu ming ju zong mu juan duan.Shi shu wei Guangxu 10 nian (1884) shi yin ben de di ben.Ben shu wei "Xiangshan Xu shi zong pu" zhi yi zhong

    Xu Dan : Le role d'agencement de la troisième personne en chinois

    No full text
    Xu Dan. Xu Dan : Le role d'agencement de la troisième personne en chinois. In: Cahiers de linguistique - Asie orientale, vol. 16 1, 1987. pp. 175-177

    Xu Dan : Le role d'agencement de la troisième personne en chinois

    No full text
    Xu Dan. Xu Dan : Le role d'agencement de la troisième personne en chinois. In: Cahiers de linguistique - Asie orientale, vol. 16 1, 1987. pp. 175-177

    La vision de l'écriture de Xu Shen à partir de sa présentation des liushu

    No full text
    Xu Shen is the first author to have given a definition of the liushu. Curiously enough, though his terminology (xiangxing, zhishi, etc.) was accepted, his ordering of the liushu was rejected. Instead, Ban Gu's ordering became the norm. A close examination of Xu Shen's ordering of the liushu in fact reveals his own vision of the genesis of the Chinese script rather than a proper analysis of the Chinese characters.Xu Shen est le premier auteur à avoir proposé une définition des liushu. Si sa terminologie (xiangxing, zhishi, etc.) a été acceptée, son ordre a en général été rejeté et remplacé par celui de Ban Gu. Le but de cet article est de montrer que l'ordre des liushu de Xu Shen révèle une vision originale de la genèse de l'écriture plutôt qu'une analyse des caractères proprement dite.Bottero Françoise. La vision de l'écriture de Xu Shen à partir de sa présentation des liushu. In: Cahiers de linguistique - Asie orientale, vol. 27 2, 1998. pp. 161-191

    Wen hua shi ying dui gan zhi de ying xiang: bian hua gan zhi, xin qi mu biao jian ce he xu huan mo shi shi bie de san fang mian de zheng ju

    No full text
    Xu, Yi.Thesis Ph.D. Chinese University of Hong Kong 2015.Includes bibliographical references (leaves 48-54).Abstracts also in Chinese.Title from PDF title page (viewed on 05, January, 2017).Xu, Yi

    Testudinella zhujiangensis Wei, De Smet & Xu 2010

    No full text
    Testudinella zhujiangensis Wei, De Smet & Xu 2010 (Figs 6 C, 12–14) Redescription of trophi. Trophi malleoramate (Figs 12, 13). Frontal latero-ventral margins of rami with a large, quadratic and stout reinforced, caudally recurved alula (Figs 12–14: al). Median rami apophyses (Fig. 12 B: ra) weakly developed. Inner margins distal rami sections bearing 14–21 / 13–21 strongly webbed arched rami scleropili (Figs 12 B, 14 A: as). Frontal rami scleropili with fairly acute distal tip (Fig. 14 B: fs). Basal apophyses moderately developed (Fig. 13: ba). Fulcrum short with a distinct proximal opening frontally (Fig. 13: fo). Unci plates (Fig. 12 A: u) consist of 11–13 / 11–12 weakly curved and strongly webbed teeth. Each uncus has 3, occasionally 4, major teeth with moderately offset lanceolate heads. Minor teeth with lanceolate head bearing two minute lateral knobs at their base; the webbing almost extends up to the base of the heads. Crescent-shaped manubria are composed of a superimposed dorsal, median, ventral and small sub-ventral chamber (Fig. 12 B). Measurements. Trophi (N = 6): length × width 17.4–20.4 × 22.4–24.5 µm, ramus 10.7–12.1 µm, fulcrum 5.2– 6.1 µm, largest major tooth 10.0– 10.6 µm, manubrium 10.7–12.4 µm.Published as part of Wei, Nan, De, Willem H. & Xu, Runlin, 2011, Two new brackish-water species of Testudinella (Rotifera: Testudinellidae) from Qi'ao Island in the Pearl River estuary, China, with a key to marine and brackish-water Testudinella, pp. 41-56 in Zootaxa 3051 on page 51, DOI: 10.5281/zenodo.20778

    On the Lebesgue constant for the Xu interpolation formula

    No full text
    In the paper [Y. Xu, Lagrange interpolation on Chebyshev points of two variables, J. Approx. Theory 87 (1996), 220-238], the author introduced a set of Chebyshev-like points for polynomial interpolation (by a certain subspace of polynomials) in the square [-1,1]^2 , and derived a compact form of the corresponding Lagrange interpolation formula. In [L. Bos, M. Caliari, S. De Marchi, M. Vianello, A numerical study of the Xu polynomial interpolation formula in two variables, Computing 76 (2006), 311-324], we gave an efficient implementation of the Xu interpolation formula and we studied numerically its Lebesgue constant, giving evidence that it grows like O((log n)^2 ), n being the degree. The aim of the present paper is to provide an analytic proof to show that the Lebesgue constant does have this order of growth

    Deng wei ji.

    No full text
    徐訏著.Cover title.Drama.Xu Xu zhu

    Xu Jinglei, nomos de la modernité

    No full text
    contribution à un site webDeux grands succès de l’industrie cinématographique chinoise en 2010 et 2011 portent le nom de la même réalisatrice et actrice principale, Xu Jinglei (徐静蕾). La réussite de Xu Jinglei n’est pas que cinématographique, son blog est l’un des plus consulté de Chine, tandis que le magazine en ligne qu’elle a fondé en 2007 est devenue le plus influent parmi les jeunes urbains. Le parcours de Xu Jinglei est paradigmatique de la bonne subjectivité chinoise, celle qui se soumet à la nouvelle donne économique et glorifie l’entreprenariat. L’évolution de la carrière de Xu Jinglei est à l’image de celle de toute une génération de cinéastes et d’acteurs, qui sont passés de l’expérimentation de l’avant-garde à la propagande..

    The Lebesgue constant of the Xu interpolation points

    No full text
    In the paper \cite{xu3}, the author introduced a set of Chebyshev-like points for polynomial interpolation (by a certain subspace of polynomials) in the square [1,1]2[-1,1]^2, and derived a compact form of the corresponding Lagrange interpolation formula. In \cite{nostro1} we gave an efficient implementation of the Xu interpolation formula and we studied numerically the Lebesgue constant of the Xu points, giving evidence that it grows like O((logn)2){\cal O}((\log n)^2), nn being the degree. The aim of the present paper is to provide an analytic proof that indeed the Lebesgue constant does have this order of growth
    corecore