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- Hilbert-Huang變換Hilbert-Huang transform
- Hilbert-Huang描述子Hilbert-Huang descriptors
- Hilbert-Huang譜分析Hilbert-Huang spectrum analysis
- 二維Hilbert-Huang變換2-D Hilbert-Huang transform
- 我是K.S.T.的Joe Huang。I am Joe Huang from K.S.T.
- 正交Hilbert-Huang變換orthogonal Hilbetr-Huang Transform
- Hilbert-Huang變換(HHT)Hilbert-Huang transform
- Hilbcrt-Huang變換(HHT)Hilbert-Huang transform(HHT)
- 如何保持自信的微笑? linda Huang中文訪談記錄How to keep confident smile?
- 如何保持自信的微笑?Linda Huang中文訪談記錄How to keep confident smile?
- 好的。您是K.S.T.的Joe Huang先生,還有您的電話號碼是5555-1234。"Ok. You are Joe Huang from K.S.T., and your number is 5555 - 1234. "
- 獲得了振動頻率,合因子,Franck-Condon支距和Huang-Rhys因子等位形坐標參量。The vibrational frequency, coupling factor, Franck-Condon offset ond Huang-Rhys fact or were obtained.
- 希爾伯特-黃變換(HHT)是上世紀末Huang等人首次提出的一種新的信號分析理論。The Hilbert-Huang transform (HHT) is a new theory, which is first developed by Huang et al at the end of last century, for the signal analysis.
- 第三章研究了一種新型的信號處理技術-Hilbert Huang Transform(HHT),並編程實現了該演算法。In chapter three, a new signal processing tool-Hilbert Huang Transform(HHT) is introduced in detail.
- 對雲南特有植物古林箐秋海棠(Begonia gulinqingensisS.H.Huang et Y.M.Shui)的資源狀況進行了全面調查研究。Based on the wild investigations and researches in 2003,2005 and 2006,it showed that Begonia gulinqingensis S.H. Huang et Y. M.
- 我發現,在我的托福成績報告單上沒有把我的名字用羅馬字母書寫正確,應該是Huang Xiaoliang,不是Huan Xiaoliang。I have found that my name on the TOEFL score report was not correctly romanized. It should be huang Xiaoliang, not huan Xiaoliang.
- 本文用一種全新的時頻分析方法:Hilbert-Huang變換(HHT),對30例心音數據進行心音分析實驗. 實驗結果表明:HHT方法可以有效的分析心音信號;In this paper, a new method using the Hilbert-Huang Transform(HHT) was used to decompose S1 into a series of time-frequency atoms.
- 在簡要介紹時程信號的小波分析和Hilbert Huang變換 (HHT)理論的基礎上 ,通過地震波和其它時程信號實例 ,對比分析了小波變換和HHT變換結果 .After introducing the brief theories of wavelet analysis and Hibert Huang Transform (HHT), several signal data were analyzed by using HHT and wavelet analysis methods.
- River Huang-抓住這些日子!和你一起工作很刺激,要保持整個團隊靈感四射是一項難以置信的工作。我們已經共同完成了許多,但是這些僅僅只是開始而已!River Huang-Seize the day! You are a thrill to work with, and do an incredible job of keeping the team inspired.We have so much yet to accomplish, this is just the beginning!
- 如果TOn中的故障點數和故障邊數之和不超過(n-2),Huang等人[J.Parallel andDistributed Computing,62(2002),591-640]證明了:TQn中包含長度為2n-fv的圈,其中fv是故障點數。Huang et al. [J.Parallel and Distributed Computing,62(2002),591-640] proved that TQn contains a cycle of length 2n-fv if the sum of faulty vertices and faulty edges is not more than(n-2),where fv is the number of faultyvertices.