T. N. Davidson, Z.-Q. Luo, and J. F. Sturm, "Linear matrix inequality formulation of spectral mask constraints", Manuscript, Dept. Elec. & Comp. Eng., McMaster University, Hamilton, Canada, Sep. 2000. Also: http://www.crl. mcmaster.ca/ASPC/people/davidson/LMImasks.ps. Home/Search Document Details and Download
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On the Nesterov's Approach to Semi-Infinite Programming - Faybusovich (2002) (1 citation) (Correct)
....in [4] The idea there is to construct self concordant barriers for cones K n;k and many other cones in an explicit form. Remark 7. The result similar to Lemma 2 holds true for trigonometric polynomials. See [8] Recently various particular cases of this result has been rediscovered in [2] [3], 6] 4. Concluding remarks. In the present paper we have considered an abstract version of Nesterov s scheme for the reduction of various optimization problems to semidefinite programming form. We have considered several examples to illustrate this scheme. It has been shown that some results of ....
T. N. Davidson, Zhi-Quan Luo and J.F. Sturm, Linear Matrix Inequality Formulation of Spectral Mask Constraints, preprint, 2000.
Positivity and Linear Matrix Inequalities - Genin, Hachez, Nesterov.. (2002) (2 citations) (Correct)
....characterization of pseudo polynomials nonnegative on the unit circle also extends a result previously obtained by Nesterov [73] for trigonometric polynomials. From a practical viewpoint, it allows us to eciently solve various lter design problems using semide nite programming, see Section 8 and [1, 20, 32]. It can alternatively be obtained from the theory of positive paraconjugate transfer functions. More precisely, it follows from a straightforward application of the KYP Lemma to the subclass of positive paraconjugate transfer functions that have a pseudo polynomial form. Let us derive this simple ....
Tim N. Davidson, Zhi-Quan Luo, and Jos F. Sturm. Linear matrix inequality formulation of spectral mask constraints. Submitted to the IEEE Transactions on Signal Processing, September 2000., 2000.
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T. N. Davidson, Z.-Q. Luo, and J. F. Sturm, "Linear matrix inequality formulation of spectral mask constraints", Manuscript, Dept. Elec. & Comp. Eng., McMaster University, Hamilton, Canada, Sep. 2000. Also: http://www.crl. mcmaster.ca/ASPC/people/davidson/LMImasks.ps.
Generalized KYP Lemma: Unified Characterization of Frequency.. - IWASAKI, HARA (2003) (Correct)
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T. Davidson, Z. Luo, and J. Sturm. Linear matrix inequality formulation of spectral mask constraints. Proc. ICASSP, 2001. 43
Interior-Point Methods For Magnitude Filter Design - Brien Alkire And (2001) (2 citations) (Correct)
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T. N. Davidson, Z.-Q. Luo, and J. F. Sturm, "Linear matrix inequality formulation of spectral mask constraints," Tech. Rep., Department of Electrical and Computer Engineering. McMaster University, July 2000.
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