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  • × Wang, Lei
  • × 2014
 全选  【符合条件的数据共:15条】

1 Antifogging and Icing-Delay Properties of Composite Micro- and Nanostructured Surfaces [期刊论文]

仿生多微纳米梯度界面的液滴动态传输聚集调控,2014年

Wen, Mengxi, Wang, Lei, Zhang, Mingqian, Jiang, Lei, Zheng, Yongmei

LicenseType:Others | 英文

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2 Ice-phobic gummed tape with nano-cones on microspheres [期刊论文]

仿生多微纳米梯度界面的液滴动态传输聚集调控,2014年

Wang, Lei, Wen, Mengxi, Zhang, Mingqian, Jiang, Lei, Zheng, Yongmei

LicenseType:Others | 英文

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3 Strong anti-ice ability of nanohairs over micro-ratchet structures [期刊论文]

仿生多微纳米梯度界面的液滴动态传输聚集调控,2014年

Guo, Peng, Wen, Mengxi, Wang, Lei, Zheng, Yongmei

LicenseType:Others | 英文

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4 Relative power and coherence of EEG series are related to amnestic mild cognitive impairment in diabetes [期刊论文]

慢性痛发生发展的大脑痛矩阵动态脑功能网络及其特征研究,2014年

Bian, Zhijie, Li, Qiuli, Wang, Lei, Lu, Chengbiao, Yin, Shimin, Li, Xiaoli

LicenseType:Others | 英文

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5 THE STUDY OF TEMPERATURE PROFILE INSIDE WAX DEPOSITION LAYER OF WAXY CRUDE OIL IN PIPELINE [期刊论文]

Frontiers in Heat and Mass Transfer (FHMT),2014年

Tian, Zhen, Wang, Lei, Jin, Wenbo, Jin, Zhi

LicenseType:Unknown |

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6 Rigidity of proper holomorphic mappings between certain unbounded non-hyperbolic domains [期刊论文]

JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS,,4192014年

Tu, Zhenhan, Wang, Lei

LicenseType:Free |

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The Fock-Bargmann-Hartogs domain D-n,D-m(mu) (mu > 0) in Cn+m is defined by the inequality parallel to w parallel to(2) < e(-mu parallel to z parallel to 2), where (z, w) is an element of C-n x C-m, which is an unbounded non-hyperbolic domain in Cn+m. Recently, Yamamori gave an explicit formula for the Bergman kernel of the Fock-Bargmann-Hartogs domains in terms of the polylogarithm functions and Kim-Ninh-Yamarnori determined the automorphism group of the domain D-n,D-m(mu). In this article, we obtain rigidity results on proper holomorphic mappings between two equidimensional Fock-Bargmann-Hartogs domains. Our rigidity result implies that any proper holomorphic self-mapping on the Fock-Bargmann-Hartogs domain Dn fin (it) with m >= 2 must be an automorphism. (C) 2014 Elsevier Inc. All rights reserved.