Signal Analysis in Multibody Systems
暂无分享,去创建一个
[1] R. Gencay,et al. An algorithm for the n Lyapunov exponents of an n -dimensional unknown dynamical system , 1992 .
[2] Gerd Pfister,et al. Comparison of algorithms calculating optimal embedding parameters for delay time coordinates , 1992 .
[3] Fraser,et al. Independent coordinates for strange attractors from mutual information. , 1986, Physical review. A, General physics.
[4] M. P. Païdoussis,et al. Nonlinear and chaotic fluidelastic vibrations of a flexible pipe conveying fluid , 1988 .
[5] G. Benettin,et al. Lyapunov Characteristic Exponents for smooth dynamical systems and for hamiltonian systems; a method for computing all of them. Part 1: Theory , 1980 .
[6] Zoran Aleksic,et al. Estimating the embedding dimension , 1991 .
[7] R.B. Lake,et al. Programs for digital signal processing , 1981, Proceedings of the IEEE.
[8] J. Tukey,et al. An algorithm for the machine calculation of complex Fourier series , 1965 .
[9] Steven W. Shaw,et al. Chaotic vibrations of a beam with non-linear boundary conditions , 1983 .
[10] Friedrich Pfeiffer,et al. Seltsame Attraktoren in Zahnradgetrieben , 1988 .
[11] G. P. King,et al. Extracting qualitative dynamics from experimental data , 1986 .
[12] Add Pater. OPTIMAL DESIGN OF RUNNING GEARS.: PART II, APPLICATIONS , 1989 .
[13] D. Ruelle,et al. Fundamental limitations for estimating dimensions and Lyapunov exponents in dynamical systems , 1992 .
[14] G. Bergland,et al. A radix-eight fast Fourier transform subroutine for real-valued series , 1969 .
[15] J. D. Farmer,et al. ON DETERMINING THE DIMENSION OF CHAOTIC FLOWS , 1981 .
[16] Jan Dirk Jansen,et al. Non-linear rotor dynamics as applied to oilwell drillstring vibrations , 1991 .
[17] Julius S. Bendat,et al. Engineering Applications of Correlation and Spectral Analysis , 1980 .
[18] A. Wolf,et al. Determining Lyapunov exponents from a time series , 1985 .
[19] H. Schuster,et al. Proper choice of the time delay for the analysis of chaotic time series , 1989 .
[20] P. Welch. The use of fast Fourier transform for the estimation of power spectra: A method based on time averaging over short, modified periodograms , 1967 .
[21] A. Lichtenberg,et al. Regular and Stochastic Motion , 1982 .
[22] E. Dowell,et al. Chaotic Vibrations: An Introduction for Applied Scientists and Engineers , 1988 .
[23] I. Shimada,et al. A Numerical Approach to Ergodic Problem of Dissipative Dynamical Systems , 1979 .
[24] G. Benettin,et al. Lyapunov Characteristic Exponents for smooth dynamical systems and for hamiltonian systems; A method for computing all of them. Part 2: Numerical application , 1980 .
[25] C. Rader. An improved algorithm for high speed autocorrelation with applications to spectral estimation , 1970 .
[26] J. Bajkowski,et al. Chaotic motions and fault detection in a cracked rotor , 1994 .
[27] G. Carter,et al. The generalized correlation method for estimation of time delay , 1976 .
[28] G. D. Bergland,et al. A fast Fourier transform algorithm using base 8 iterations , 1968 .
[29] K. Pawelzik,et al. Optimal Embeddings of Chaotic Attractors from Topological Considerations , 1991 .
[30] James P. Crutchfield,et al. Geometry from a Time Series , 1980 .
[31] A. Fraser. Reconstructing attractors from scalar time series: A comparison of singular system and redundancy criteria , 1989 .
[32] A. Nuttall. Some windows with very good sidelobe behavior , 1981 .
[33] D. Ruelle,et al. Ergodic theory of chaos and strange attractors , 1985 .
[34] R. Huston,et al. Dynamics of Mechanical Systems , 2002 .
[35] J. Greene,et al. The calculation of Lyapunov spectra , 1987 .
[36] Wojciech Marian Szczygielski. Dynamisches Verhalten eines schnell drehenden Rotors bei Anstreifvorgängen , 1986 .
[37] E. Brigham,et al. The fast Fourier transform and its applications , 1988 .
[38] Yasuji Sawada,et al. Practical Methods of Measuring the Generalized Dimension and the Largest Lyapunov Exponent in High Dimensional Chaotic Systems , 1987 .
[39] M. C. Kim,et al. Computation of the largest Lyapunov exponent by the generalized cell mapping , 1986 .
[40] Eckmann,et al. Liapunov exponents from time series. , 1986, Physical review. A, General physics.
[41] Ruedi Stoop,et al. Calculation of Lyapunov exponents avoiding spurious elements , 1991 .
[42] Harvey F. Silverman,et al. An introduction to programming the Winograd Fourier transform algorithm (WFTA) , 1977 .
[43] G. Carter,et al. Estimation of the magnitude-squared coherence function via overlapped fast Fourier transform processing , 1973 .
[44] Antanas Cenys,et al. Estimation of interrelation between chaotic observables , 1991 .
[45] Hermann Haken,et al. At least one Lyapunov exponent vanishes if the trajectory of an attractor does not contain a fixed point , 1983 .
[46] J. Bajkowski,et al. Detection of Cracks in Turborotors—A New Observer Based Method , 1993 .
[47] Hans Wilhelm Schüßler. Digitale Signalverarbeitung 1 , 1994 .
[48] T. Teichmann,et al. The Measurement of Power Spectra , 1960 .
[49] Andrew Craig Eberhard. An optimal discrete window for the calculation of power spectra , 1973 .
[50] F. Harris. On the use of windows for harmonic analysis with the discrete Fourier transform , 1978, Proceedings of the IEEE.
[51] Sawada,et al. Measurement of the Lyapunov spectrum from a chaotic time series. , 1985, Physical review letters.
[52] Karl Popp,et al. Nonlinear Oscillations of Structures Induced by Dry Friction , 1992 .
[53] V. I. Oseledec. A multiplicative ergodic theorem: Lyapunov characteristic num-bers for dynamical systems , 1968 .
[54] E. Kreuzer. Numerische Untersuchung nichtlinearer dynamischer Systeme , 1987 .
[55] J. M. T. Thompson,et al. Nonlinear dynamics of engineering systems , 1990 .
[56] P. Holmes,et al. Nonlinear Oscillations, Dynamical Systems, and Bifurcations of Vector Fields , 1983, Applied Mathematical Sciences.