Control of Weierstrass-Mandelbrot Function Model with Morlet Wavelets
暂无分享,去创建一个
[1] J. Szulga,et al. Hausdorff dimension of Weierstrass–Mandelbrot process , 2002 .
[2] C. Torrence,et al. A Practical Guide to Wavelet Analysis. , 1998 .
[3] Fred J. Molz,et al. The Weierstrass–Mandelbrot Process Revisited , 2001 .
[4] M. Berry,et al. On the Weierstrass-Mandelbrot fractal function , 1980, Proceedings of the Royal Society of London. A. Mathematical and Physical Sciences.
[5] Shiro Suetsugu,et al. The WASP–WAVE protein network: connecting the membrane to the cytoskeleton , 2007, Nature Reviews Molecular Cell Biology.
[6] B. Gupta,et al. A Wideband Minkowski Fractal Dielectric Resonator Antenna , 2013, IEEE Transactions on Antennas and Propagation.
[7] K. I. Ramachandran,et al. A comparative study on classification of features by SVM and PSVM extracted using Morlet wavelet for fault diagnosis of spur bevel gear box , 2008, Expert Syst. Appl..
[8] H. Kühl,et al. Animal biometrics: quantifying and detecting phenotypic appearance. , 2013, Trends in ecology & evolution.
[9] Christophe Lavelle,et al. A fractal model for nuclear organization: current evidence and biological implications , 2012, Nucleic acids research.
[10] E. H. Lloyd,et al. Long-Term Storage: An Experimental Study. , 1966 .
[11] Ermanno Pietropaolo,et al. WAVELET ANALYSIS AS A TOOL TO LOCALIZE MAGNETIC AND CROSS-HELICITY EVENTS IN THE SOLAR WIND , 2012 .
[12] Ryszard Kutner,et al. Stochastic simulations of time series within Weierstrass–Mandelbrot walks , 2003 .
[13] Patrick Flandrin,et al. On the chirp decomposition of Weierstrass-Mandelbrot functions, and their time-frequency interpretation , 2003 .
[14] A. Stoica,et al. Power-law scaling and fractal nature of medium-range order in metallic glasses. , 2009, Nature materials.
[15] D A Weitz,et al. Universal aging features in the restructuring of fractal colloidal gels. , 2000, Physical review letters.
[16] Shutang Liu,et al. Control and synchronization of Julia sets in coupled map lattice , 2011 .
[17] S. Jiang,et al. An analytical model of thermal contact resistance based on the Weierstrass—Mandelbrot fractal function , 2010 .
[18] Jing Hu,et al. Culturomics meets random fractal theory: insights into long-range correlations of social and natural phenomena over the past two centuries , 2012, Journal of The Royal Society Interface.
[19] H. Stanley,et al. Multifractal Detrended Fluctuation Analysis of Nonstationary Time Series , 2002, physics/0202070.
[20] S. Fusil,et al. Fractal dimension and size scaling of domains in thin films of multiferroic BiFeO3. , 2007, Physical review letters.
[21] Yongshun Liang,et al. On the fractional calculus of Besicovitch function , 2009 .
[22] Irina Vendik,et al. Dual‐band bandpass filters based on dual‐mode hilbert fractal resonator , 2013 .
[23] Hector Puebla,et al. Control and synchronization of HH neurons , 2010 .
[24] Brian R. Hunt,et al. The Hausdorff dimension of graphs of Weierstrass functions , 1998 .
[25] Jing Lin,et al. Feature Extraction Based on Morlet Wavelet and its Application for Mechanical Fault Diagnosis , 2000 .
[26] Kenneth Falconer,et al. Fractal Geometry: Mathematical Foundations and Applications , 1990 .
[27] Vladas Pipiras,et al. CONVERGENCE OF THE WEIERSTRASS-MANDELBROT PROCESS TO FRACTIONAL BROWNIAN MOTION , 2000 .
[28] Fuqing Zhang,et al. On the connection between the order of the fractional derivative and the Hausdorff dimension of a fractal function , 2009 .
[29] B Rubinsky,et al. On the use of the Weierstrass-Mandelbrot function to describe the fractal component of turbulent velocity , 1992 .
[30] P. Bruns,et al. Long-term storage. , 2000, Methods in cell biology.
[31] Seyyed Kamal Hashemi. Dual-band bandpass filters based on multilayer ring resonators , 2011, 2011 11th Mediterranean Microwave Symposium (MMS).
[32] J. Benedetto,et al. Sampling multipliers and the Poisson Summation Formula , 1997 .
[33] R. Jovani,et al. Fractal geometry of a complex plumage trait reveals bird's quality , 2013, Proceedings of the Royal Society B: Biological Sciences.
[34] Herbert F. Jelinek,et al. Quantitating the subtleties of microglial morphology with fractal analysis , 2013, Front. Cell. Neurosci..
[35] Abel Carvalho,et al. FRACTAL GEOMETRY OF WEIERSTRASS-TYPE FUNCTIONS , 2009 .
[36] 刘树堂,et al. A new identification control for generalized Julia sets , 2013 .
[37] E. L. Albuquerque,et al. Theory of elementary excitations in quasiperiodic structures , 2003 .
[38] Yongping Zhang,et al. Control and Synchronization of Julia Sets of the Complex perturbed Rational Maps , 2013, Int. J. Bifurc. Chaos.
[39] G. Nemes,et al. New asymptotic expansion for the Gamma function , 2010 .
[40] G. Huisman,et al. Engineering the third wave of biocatalysis , 2012, Nature.
[41] François Benhmad. Modeling nonlinear Granger causality between the oil price and U.S. dollar: A wavelet based approach , 2012 .
[42] Jordi Romeu,et al. On the behavior of the Sierpinski multiband fractal antenna , 1998 .
[43] S. Taboga,et al. Fractal dimension and Shannon's entropy analyses of the architectural complexity caused by the inflammatory reactions induced by highly crystalline poly(vinyl alcohol) microspheres implanted in subcutaneous tissues of the Wistar rats. , 2013, Journal of biomedical materials research. Part A.
[44] Weihua Sun,et al. Dissipative feedback control and synchronization of Julia sets of the complex standard family , 2013, Appl. Math. Comput..
[45] Yixiang Gan,et al. Effects of surface structure deformation on static friction at fractal interfaces , 2013 .
[46] A. Parsa,et al. Diagnostic imaging of trabecular bone microstructure for oral implants: a literature review. , 2013, Dento maxillo facial radiology.
[47] Lukas Vacha,et al. Co-movement of energy commodities revisited: Evidence from wavelet coherence analysis , 2012, 1201.4776.
[48] Didier Sornette,et al. Modeling of super-extreme events: An application to the hierarchical Weierstrass-Mandelbrot Continuous-time Random Walk , 2012 .
[49] Hamid Reza Karimi,et al. Signal reconstruction, modeling and simulation of a vehicle full-scale crash test based on Morlet wavelets , 2012, Neurocomputing.