7,999 research outputs found

    Ilyocryptidae Smirnov, 1976 sensu Smirnov 1992

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    Family Ilyocryptidae Smirnov, 1976 sensu Smirnov, 1992 Ilyocryptus agilis Kurz, 1878 s. lat. Records: Harada, 1943: 194 / 1–3 (Riyuetan Pool, Taiwan); Ye, 1956: 49 /I: 8 (Dongqian Hu); Du & Lai, 1959: 305 (Tai Hu); Du, 1960: 43 / 1 (Xijiahe lakelet of Tai Hu; a fish pond in the campus of East China Normal University); You, 1962: 119 (from fish guts at Minhou in Fujian Province); Chiang, 1963 b: 56 /IV: 24–27 (Qinghai Hu); Shen & Zhang, 1964: 129 (Baiyang Dian); Chen, 1985 b: 2 (Yichang); Chen, 1993 a: 9–10 / 1–4 (a pond in Guixi in Jiangxi Province); Chen et al., 1989: 417 (Yanhe, Tongren and Duyun in Guizhou Province); Chen, 1990 b: 87 (the estuary of Tuo Jiang); Zhang & Chen, 1996: 22 (Chaohu and Dongzhi in Anhui Province); Zhang et al., 1997: 90 (Lechang, Longchuan, Deqing, Zhaoqing, Xinhui, Zhuhai and Zhanjiang in Guangdong Province); Xiang & Yu (unpubl. data: Yibin, Luzhou, Hejiang, Chongqing, Fengjie, Badong, Zigui, Yichang, Zhijiang, Jiayu and Wuhan section of the Yangtze River; Tuo Jiang, Chishui He, Han Jiang and Gan Jiang; Lushui Reservoir; Dong Hu in Wuhan, Hong Hu, Tai Hu and Dongqian Hu). The record by Chiang & Du, 1979: 181–182 / 118 is not this species. These populations need to be rechecked; some may belong to I. yooni Jeong, Kotov & Lee, 2012, see below. Ilyocryptus sordidus (Liéven, 1848) s. lat. Records: Sars, 1903: (Pucheng in Shaanxi Province); Chiang, 1955: 146 /IV: 21, 21 a (Wuli Hu); Zheng, 1957: 56 / 12 (Nanjing); Chiang, 1964: 77 (Eerqisi He); Chiang & Du, 1979: 180–181 / 117 (a pond at Liyuan Park in Wuxi; Chaye pond in Wuchang; provinces of Guangdong, Guangxi, Taiwan, Jiangsu, Anhui, Jiangxi, Hubei, Hebei, Yunnan, Guizhou, Shanxi, Shaanxi, Gansu and Xinjiang); Chen, 1990 b: 87 (the estuary of Tuo Jiang); Dai & Cai, 1999: 22 (Menglun in Xishuangbanna); Xiang & Yu (unpubl. data: Yibin, Yichang, Ezhou and Shishou section of Yangtze River; Tuo Jiang, Jialing Jiang, Wu Jiang, Han Jiang; Lushui Reservoir; Bao’an Hu, Dong Hu in Wuhan, Hong Hu, Dian Chi, Biandan Tang, Wuli Hu and Qiandao Hu). These populations need to be re-identified according to recent standards, because in the Palaearctic a series of species have long been masked under the name " sordidus " (Kotov & Štifter 2006). Ilyocryptus spinifer Herrick, 1884. Records: Ping, 1931: 182 (Nanjing); Shen & Sung, 1962: 26 (Sanmenxia Reservior); Chiang & Du, 1979: 182 –183/ 119 (a pond at Yunjinghong in Xishuangbanna; provinces of Guangdong, Guangxi, Fujian, Yunnan, Guizhou and Hubei); Chen, 1983: 23 (Yichang section of Yangtze River); Chen, 1985 b: 2 (Yichang); Chen, 1990 b: 87 (the estuary of Tuo Jiang); Xiang & Yu (unpubl. data: Yichang and Wuhan section of Yangtze River; Tuo Jiang, Huangbai He; Dong Hu in Wuhan); as Ilyocryptus halyi by Spandl, 1925: 189 / 2 a–b (Guangdong Province); Du, 1973: 59 / 44. Chinese populations need to be revised and compared with others. Ilyocryptus yooni Jeong, Kotov & Lee, 2012 . Record: Jeong et al., 2012: 37 (Xingkai Hu, on border of Russia and China).Published as part of Xiang, Xian-Fen, Ji, Gao-Hua, Chen, Shou-Zhong, Yu, Gong-Liang, Xu, Lei, Han, Bo-Ping, Kotov, Alexey A. & Dumont, Henri J., 2015, Annotated Checklist of Chinese Cladocera (Crustacea: Branchiopoda). Part I. Haplopoda, Ctenopoda, Onychopoda and Anomopoda (families Daphniidae, Moinidae, Bosminidae, Ilyocryptidae), pp. 1-27 in Zootaxa 3904 (1) on pages 18-19, DOI: 10.11646/zootaxa.3904.1.1, http://zenodo.org/record/28763

    Yu. M. Smirnov's General Equivariant Shape Theory

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    A general equivariant shape theory for arbitrary GG-spaces in the case of a compact group GG is constructed by using the method of pseudometrics suggested by Yu. M. Smirnov as early as in 1985 at the fifth Tiraspol symposium on general topology and its applications.Comment: 6 page

    Scientific heritage of L. D. Faddeev. Survey of papers

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    International audienceThis survey was written by students of L. D. Faddeev under the editorship of L. A. Takhtajan. Sections 1.1, 1.2, 2–4, and 6 were written by Takhtajan, §§1.3 and 1.4 by F. A. Smirnov, §§5.1 and 5.2 by E. K. Sklyanin, §§5.3–5.6 by Sklyanin, Smirnov, and Takhtajan, §7.1 by M. A. Semenov- Tian-Shansky, §§7.2–7.6 by Takhtajan and S. L. Shatashvili, §7.7 by A. Yu. Alekseev and Shatashvili, and §8 by I. Ya. Aref'eva

    Kolmogorov–Smirnov (K-S) test for the distribution of fluctuation between LSTM-C and LR-C for each chart event.

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    Kolmogorov–Smirnov (K-S) test for the distribution of fluctuation between LSTM-C and LR-C for each chart event.</p

    Determination of the possibility of impulse control systems stability according to G. S. Chernorutsky method

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    Смирнов Юрий Сергеевич, д-р техн. наук, профессор, профессор кафедры приборостроения, Южно-Уральский государственный университет (г. Челябинск); [email protected]. Yu.S. Smirnov, South Ural State University, Chelyabinsk, Russian Federation,[email protected]Предложено развитие метода Г.С. Черноруцкого для определения вероятности устойчивости стохастических нелинейных систем импульсного регулирования (СИР). Рассмотрены два случая определения выполнения условий устойчивости мехатронных систем (МС), когда число параметров, имеющих «большие» вариации, не превышает двух. Произведена квадратичная суммарная оценка качества системы в плоскости ее случайных параметров. Приведены области устойчивости для ряда простейших СИР. The evolution of the G.S. Chernorutsky method to determine the possibility of stability of stochastic nonlinear impulse control systems (ICS) is proposed. Two cases of determination of the stability conditions of mechatronic systems (MS) where the number of parameters having “big” variation does not exceed two are considered in the article. Quadratic total estimate of the system quality in the space of its random parameters is given. The stability areas are performed for a number of simple ICSs
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