Eigenvalue algorithm

Results: 84



#Item
31Spectral Counting of Triangles via Element-Wise Sparsification and Triangle-Based Link Recommendation Charalampos E. Tsourakakis School of Computer Science Carnegie Mellon University 5000 Forbes Avenue, Pittsburgh, PA 15

Spectral Counting of Triangles via Element-Wise Sparsification and Triangle-Based Link Recommendation Charalampos E. Tsourakakis School of Computer Science Carnegie Mellon University 5000 Forbes Avenue, Pittsburgh, PA 15

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Source URL: ccom.uprrp.edu

Language: English - Date: 2011-08-28 13:46:21
32#508 Understanding the 8 : 1 cavity problem via scalable stability analysis algorithms Andrew G. Salinger a,Ł , Richard B. Lehoucq b , Roger P. Pawlowski a , John N. Shadid a b

#508 Understanding the 8 : 1 cavity problem via scalable stability analysis algorithms Andrew G. Salinger a,Ł , Richard B. Lehoucq b , Roger P. Pawlowski a , John N. Shadid a b

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Source URL: www.cs.sandia.gov

Language: English - Date: 2001-12-20 15:48:41
33Microsoft PowerPoint - VECPAR2010katagiri-open.pptx

Microsoft PowerPoint - VECPAR2010katagiri-open.pptx

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Source URL: vecpar.fe.up.pt

Language: English - Date: 2010-07-02 11:13:00
34Appendix G Eligibility order reduction The eligibility profile function is i = C Ai−1 B

Appendix G Eligibility order reduction The eligibility profile function is i = C Ai−1 B

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Source URL: q12.org

Language: English - Date: 2002-03-13 22:43:23
3514.2 Spaces of incidence vectors 175 ¡ ¢ the whole linear space; since the dimension

14.2 Spaces of incidence vectors 175 ¡ ¢ the whole linear space; since the dimension

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Source URL: lovelace.thi.informatik.uni-frankfurt.de

Language: English - Date: 2007-08-30 03:42:25
36Un cryptosystème giratoire

Un cryptosystème giratoire

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Source URL: www.asor.org.au

Language: English - Date: 2013-12-15 20:45:25
37Appendix G Eligibility order reduction The eligibility profile function is i = C Ai−1 B

Appendix G Eligibility order reduction The eligibility profile function is i = C Ai−1 B

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Source URL: www.q12.org

Language: English - Date: 2002-03-13 22:43:23
38An Efficient Numerical Method for Analyzing Photonic Crystal Slab Waveguides Lijun Yuan and Ya Yan Lu Department of Mathematics, City University of Hong Kong, Hong Kong Computing the eigenmodes of a photonic crystal (Ph

An Efficient Numerical Method for Analyzing Photonic Crystal Slab Waveguides Lijun Yuan and Ya Yan Lu Department of Mathematics, City University of Hong Kong, Hong Kong Computing the eigenmodes of a photonic crystal (Ph

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Source URL: math.cityu.edu.hk

Language: English - Date: 2011-07-29 20:06:33
39Modeling two-dimensional anisotropic photonic crystals by Dirichlet-to-Neumann maps Huan Xie1,2,3,∗ and Ya Yan Lu3 1 Joint

Modeling two-dimensional anisotropic photonic crystals by Dirichlet-to-Neumann maps Huan Xie1,2,3,∗ and Ya Yan Lu3 1 Joint

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Source URL: math.cityu.edu.hk

Language: English - Date: 2009-05-22 08:22:47
40Computing a Matrix Function for Exponential Integrators Ya Yan Lu1 Department of Mathematics City University of Hong Kong Kowloon, Hong Kong

Computing a Matrix Function for Exponential Integrators Ya Yan Lu1 Department of Mathematics City University of Hong Kong Kowloon, Hong Kong

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Source URL: math.cityu.edu.hk

Language: English - Date: 2003-08-12 00:29:55