63,275 research outputs found
Xinjiang (China), folk dancing of Uyghurs
No full textFolk-dance of UighursImage is part of research conducted by Chang Chih-Yi for the article: Land Utilization and Settlement Possibilities in Sinkiang
Author(s): Chang Chih-Yi
Source: Geographical Review, Vol. 39, No. 1 (Jan., 1949), pp. 57-75
Published by: American Geographical Society
Stable URL: http://www.jstor.org/stable/211157http://www.jstor.org/stable/211157Grayscal
La chang xi : hui bei ji
No full text1. 二人轉 : 豬八戒拱地 -- 2. 拉場戲 : 回盃記.1. Er ren zhuan : Zhubajie gong di -- 2. La chang xi : hui bei ji.Performers: 吉林省民間藝術團.Live recording."First copy"--Spine label.Electronic reproduction from Rulan Chao Pian VHS collection.Sung in Chinese.Performers: Jilin Sheng min jian yi shu tuan
Lei jing fu yi
No full text[V.1-24]. 類經 : 三十二卷 -- [v.25-30]. 類經圖翼 : 十一卷 -- [v.31-32]. 類經附翼 : 四卷.[V.1-24]. Lei jing : san shi er juan -- [v.25-30]. Lei jing tu yi : shi yi juan -- [v.31-32]. Lei jing fu yi : si juan.張介賓類註. 類經圖翼 : 十一卷 / 張介賓著. 類經附翼 : 四卷 / 張介賓撰.綫裝, 2函.框21.5x14.7公分, 8行18字, 小字雙行同. 白口, 四周單邊, 單黑魚尾. 版心上鐫題名及卷次, 中鐫小題, 下鐫葉次及"會稽謝應魁鐫"書名頁刻"張氏類經, 圖翼附翼合刻, 嘉慶四年仲春鎸, 金閶萃英堂梓行".《中國中醫古籍總目》00034著錄.鈐"莊兆祥印", "莊兆祥".Xian zhuang, 2 han.Kuang 21.5 x 14.7 gong fen, 8 hang 18 zi, xiao zi shuang hang tong. Bai kou, si zhou dan bian, dan hei yu wei. Ban xin shang juan ti ming ji juan ci, zhong juan xiao ti, xia juan ye ci ji "Kuaiji Xie Yingkui juan"Detailed notes in vernacular field only.Detailed notes in vernacular field only.Zhang Jiebin lei zhu. Lei jing tu yi : shi yi juan / Zhang Jiebin zhu. Lei jing fu yi : si juan / Zhang Jiebin zhuan.Qian "Zhuang Zhaoxiang yin", "Zhuang Zhaoxiang"
Min jian yi ren biao yan
No full text86. XII, 坐船往宋村 -- 86. XII, 趙景琛演唱昆曲 -- 86. XII, 民間藝人表演.86. XII, Zuo chuan wang Song cun -- 86. XII, Zhao Jingchen yan chang Kun qu -- 86. XII, Min jian yi ren biao yan.1st subtitle supplied by cataloguer.Live recording.Electronic reproduction from Rulan Chao Pian V8 collection.Performers, unknown.Spoken and sung in Chinese
Liu Yi-chang wen ku mu lu
No full textBen shu mu wei xiang gang zhi ming wen xue zuo jia liu yi chang di yi ci juan zeng gei xiang gang zhong yang tu shu guan de shu kan de mu lu. qi nei rong da bu fen wei xiang gang wen xue zhu zuo yi ji yi bu fen hai wai hua wen wen xue zuo pi
modeling and analyses of evaporative cooling efficiency for mist
No full textmodeling & analyses of evaporative cooling efficiency for mist-fog systems. ta-te lin. yi-chung chang. department of agricultural machinery engineering.. national taiwan university.. taipei. taiwan. ro
Han lin shuo chang zhuan ji dai
No full textLive recording.Possibly reproduced from other commercial recording or radio broadcast (Pending for review)Electronic reproduction from Rulan Chao Pian Betamax collection.Performing group: 漢霖民俗說唱藝術團.Sung in Chinese.Performing group: han lin min su shuo chang yi shu tuan
Yu yi cao
No full textV.1-4. 醫門法律 : 六卷 -- v.5-6. 尚論篇 : 四卷, 卷首 -- v.7. 尚論後篇 : 四卷 -- v.8. 寓意草.V.1-4. Yi men fa lü : liu juan -- v.5-6. Shang lun pian : si juan, juan shou -- v.7. Shang lun hou pian : si juan -- v.8. Yu yi cao.[喻昌著 ; 陳守誠重梓].綫裝.框15.6x11.3公分, 12行40字. 白口, 四周單邊, 對黑魚尾. 版心上鐫題名, 中鐫卷次及小題, 下鐫葉次.書名背頁牌記刻"光緖二十年[1894]上海圖書集成印書局印"三題合刻疑為"喻氏醫書三種", 《中國叢書綜錄》(p.721)及《中國中醫古籍總目》(13137)著錄. 原書書根題為"醫門法律".鈐"莊兆祥印"Xian zhuang.Kuang 15.6 x 11.3 gong fen, 12 hang 40 zi. Bai kou, si zhou dan bian, dui hei yu wei. Ban xin shang juan ti ming, zhong juan juan ci ji xiao ti, xia juan ye ci.Detailed notes in vernacular field only.Detailed notes in vernacular field only.[Yu Chang zhu ; Chen Shoucheng chong zi].Qian "Zhuang Zhaoxiang yin
Jong Keng, Chang Tcheou yi-k'i t'ong-k'ao
No full textStein Rolf Alfred. Jong Keng, Chang Tcheou yi-k'i t'ong-k'ao. In: Bulletin de l'Ecole française d'Extrême-Orient. Tome 41, 1941. pp. 394-406
The Complexity Landscape of Distributed Locally Checkable Problems on Trees
Full text linkRecent research revealed the existence of gaps in the complexity landscape of locally checkable labeling (LCL) problems in the LOCAL model of distributed computing. For example, the deterministic round complexity of any LCL problem on bounded-degree graphs is either O(log^∗ n) or Ω(log n) [Chang, Kopelowitz, and Pettie, FOCS 2016]. The complexity landscape of LCL problems is now quite well-understood, but a few questions remain open.
For bounded-degree trees, there is an LCL problem with round complexity Θ(n^{1/k}) for each positive integer k [Chang and Pettie, FOCS 2017]. It is conjectured that no LCL problem has round complexity o(n^{1/(k-1)}) and ω(n^{1/k}) on bounded-degree trees. As of now, only the case of k = 2 has been proved [Balliu et al., DISC 2018].
In this paper, we show that for LCL problems on bounded-degree trees, there is indeed a gap between Θ(n^{1/(k-1)}) and Θ(n^{1/k}) for each k ≥ 2. Our proof is constructive in the sense that it offers a sequential algorithm that decides which side of the gap a given LCL problem belongs to. We also show that it is EXPTIME-hard to distinguish between Θ(1)-round and Θ(n)-round LCL problems on bounded-degree trees. This improves upon a previous PSPACE-hardness result [Balliu et al., PODC 2019]
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