论文信息 - OPTIMIZATION PROBLEMS OVER NONNEGATIVE TRIGONOMETRIC POLYNOMIALS WITH INTERPOLATION CONSTRAINTS

OPTIMIZATION PROBLEMS OVER NONNEGATIVE TRIGONOMETRIC POLYNOMIALS WITH INTERPOLATION CONSTRAINTS

Abstract In this article, optimization problems over the cone of nonnegative trigonometric polynomials are described. We focus on linear constraints on the coefficients that represent interpolation constraints. For these problems, the complexity of solving the dual problem is shown to be almost independent of the number of constraints, provided that an appropriate preprocessing has been done. These results can be extended to other curves of the complex plane (real axis, imaginary axis), to nonnegative matrix polynomials and to interpolation constraints on the derivatives.

Yurii Nesterov | Yvan Hachez

[1] Zhi-Quan Luo,et al. Linear matrix inequality formulation of spectral mask constraints with applications to FIR filter design , 2002, IEEE Trans. Signal Process..

[2] Alan V. Oppenheim,et al. Discrete-time Signal Processing. Vol.2 , 2001 .

[3] Paul Van Dooren,et al. Optimization Problems over Positive Pseudopolynomial Matrices , 2003, SIAM J. Matrix Anal. Appl..

[4] Yurii Nesterov,et al. Squared Functional Systems and Optimization Problems , 2000 .

[5] Lieven Vandenberghe,et al. Convex optimization problems involving finite autocorrelation sequences , 2002, Math. Program..

[6] Yurii Nesterov,et al. Long-step strategies in interior-point primal-dual methods , 1997, Math. Program..

[7] Stephen P. Boyd,et al. Semidefinite Programming , 1996, SIAM Rev..

[8] Yurii Nesterov,et al. Interior-point polynomial algorithms in convex programming , 1994, Siam studies in applied mathematics.

[9] Paul Van Dooren,et al. Convex optimization over positive polynomials and filter design , 2000 .

[10] W. J. Studden,et al. Tchebycheff Systems: With Applications in Analysis and Statistics. , 1967 .

[11] Thomas Kailath,et al. Fast reliable algorithms for matrices with structure , 1999 .