Bi-dimensional empirical mode decomposition (BEMD) algorithm based on particle swarm optimization-fractal interpolation

The performance of interpolation algorithm used in bi-dimensional empirical mode decomposition directly affects its popularization and application. Therefore, the research on interpolation algorithm is more reasonable, accurate and fast. So far, in the interpolation algorithm adopted by the bi-dimensional empirical mode decomposition, an adaptive interpolation algorithm can be proposed according to the image characteristics. In view of this, this paper proposes an image interpolation algorithm based on the particle swarm and fractal. Its procedure includes: to analyze the given image by using the fractal brown function, to pick up the feature quantity from the image, and then to operate the adaptive image interpolation in terms of the obtained feature quantity. The parameters involved in the interpolation process are optimized by particle swarm optimization algorithm, and the optimal parameters are obtained, which can solve the problem of low efficiency and low precision of interpolation algorithm used in bi-dimensional empirical mode decomposition. It solves the problem that the image cannot be decomposed to obtain accurate and reliable bi-dimensional intrinsic modal function, and realize the fast decomposition of the image. It lays the foundation for the further popularization and application of the bi-dimensional empirical mode decomposition algorithm.

[1]  Elmar Wolfgang Lang,et al.  A green's function-based Bi-dimensional empirical mode decomposition , 2016, Inf. Sci..

[2]  Kenneth Falconer,et al.  Fractal Geometry: Mathematical Foundations and Applications , 1990 .

[3]  Alan C. Bovik,et al.  Mean squared error: Love it or leave it? A new look at Signal Fidelity Measures , 2009, IEEE Signal Processing Magazine.

[4]  Richard Ipsen,et al.  Using fractal image analysis to characterize microstructure of low-fat stirred yoghurt manufactured with microparticulated whey protein , 2012 .

[5]  Bertrand Wattrisse,et al.  Shortcut in DIC error assessment induced by image interpolation used for subpixel shifting , 2017 .

[6]  John J. Grefenstette,et al.  Genetic algorithms and their applications , 1987 .

[7]  David E. Goldberg,et al.  The Design of Innovation: Lessons from and for Competent Genetic Algorithms , 2002 .

[8]  Yi Shen,et al.  Multivariate Gray Model-Based BEMD for Hyperspectral Image Classification , 2013, IEEE Transactions on Instrumentation and Measurement.

[9]  Alejandro Federico,et al.  Denoising of digital speckle pattern interferometry fringes by means of Bidimensional Empirical Mode Decomposition , 2008, Optical Engineering + Applications.

[10]  P. Khosla,et al.  Polynomial interpolation methods for viscous flow calculations , 1977 .

[11]  Jacques Lévy Véhel,et al.  Fractals: Theory and Applications in Engineering , 1999 .

[12]  Jean Claude Nunes,et al.  Texture analysis based on local analysis of the Bidimensional Empirical Mode Decomposition , 2005, Machine Vision and Applications.

[13]  Nii O. Attoh-Okine,et al.  Bidimensional Empirical Mode Decomposition Using Various Interpolation Techniques , 2009, Adv. Data Sci. Adapt. Anal..

[14]  Q. Cheng,et al.  Application of improved bi-dimensional empirical mode decomposition (BEMD) based on Perona–Malik to identify copper anomaly association in the southwestern Fujian (China) , 2016 .

[15]  K. Patorski,et al.  Evaluation of amplitude encoded fringe patterns using the bidimensional empirical mode decomposition and the 2D Hilbert transform generalizations. , 2011, Applied optics.

[16]  Yuanyuan Wang,et al.  Biological image fusion using a NSCT based variable-weight method , 2011, Inf. Fusion.

[17]  Da-Chao Lin,et al.  Elimination of end effects in empirical mode decomposition by mirror image coupled with support vector regression , 2012 .

[18]  Ruili Wang,et al.  Shifting Interpolation Kernel Toward Orthogonal Projection , 2018, IEEE Transactions on Signal Processing.

[19]  Goldberg,et al.  Genetic algorithms , 1993, Robust Control Systems with Genetic Algorithms.

[20]  Norden E. Huang,et al.  The Multi-Dimensional Ensemble Empirical Mode Decomposition Method , 2009, Adv. Data Sci. Adapt. Anal..

[21]  Malcolm A. Sabin,et al.  High accuracy geometric Hermite interpolation , 1987, Comput. Aided Geom. Des..

[22]  Willi-Hans Steeb The Nonlinear Workbook: Chaos, Fractals, Cellular Automata, Genetic Algorithms, Gene Expression Programming, Support Vector Machine, Wavelets, Hidden Markov Models, Fuzzy Logic with C++, Java and SYMBOLICC++ Programs (6TH Edition) , 2015 .

[23]  Luca Scrucca,et al.  GA: A Package for Genetic Algorithms in R , 2013 .

[24]  Jie Zhao,et al.  Using an improved BEMD method to analyse the characteristic scale of aeromagnetic data in the Gejiu region of Yunnan, China , 2016, Comput. Geosci..

[25]  Jean Claude Nunes,et al.  Image analysis by bidimensional empirical mode decomposition , 2003, Image Vis. Comput..

[26]  Guofan Jin,et al.  One color contrast enhanced infrared and visible image fusion method , 2010 .

[27]  M. Clerc,et al.  Particle Swarm Optimization , 2006 .

[28]  Andrea De Lucia,et al.  How to effectively use topic models for software engineering tasks? An approach based on Genetic Algorithms , 2013, 2013 35th International Conference on Software Engineering (ICSE).

[29]  Anna Linderhed Variable Sampling of the Empirical Mode Decomposition of Two-Dimensional Signals , 2005, Int. J. Wavelets Multiresolution Inf. Process..

[30]  Yi Zhou,et al.  Adaptive noise reduction method for DSPI fringes based on bi-dimensional ensemble empirical mode decomposition. , 2011, Optics express.

[31]  Yan Ke,et al.  PCA-SIFT: a more distinctive representation for local image descriptors , 2004, CVPR 2004.

[32]  Silong Peng,et al.  Texture segmentation using directional empirical mode decomposition , 2004, 2004 International Conference on Image Processing, 2004. ICIP '04..