Fractional Order Modeling and Analysis of Buck-Boost Converter

Li Feng Yi; Kai Ru Zhang; Jun Liu

doi:10.4028/www.scientific.net/AMM.789-790.842

Paper Titles

A Systematic Approach for Modeling and Analyzing Mechanical Assemblies that Require Remote Handling
p.821

Instruction Format Design for Low Power Embedded Systems
p.829

Data Cluster Detection for Low Power Embedded Memory Subsystems
p.833

Stress-Strain Behaviour of Dielectric Elastomer for Actuators
p.837

Fractional Order Modeling and Analysis of Buck-Boost Converter
p.842

The Turning Speed of Stability Control in Electric Learner-Driven Vehicle Driving
p.849

Innovative Algorithm and Software for Three-Dimension Topography Evaluation in Laser-Micro Machining
p.853

Finite Element Analysis on Vibration of a Piezoelectric Micro Pump
p.861

Simulation of Closed Loop Electro-Hydraulic Actuator Using PID Based on AMESim
p.865

HomeApplied Mechanics and MaterialsApplied Mechanics and Materials Vols. 789-790Fractional Order Modeling and Analysis of...

Fractional Order Modeling and Analysis of Buck-Boost Converter

Abstract:

Considered the theoretical foundation of fractional order, the fractional mathematical model of the Buck-Boost converter in continuous conduction mode operation is built and analyzed in theory. Based on the improved Oustaloup fractional calculus for filter algorithm, the simulation model is framed by using the Matlab/Simulink software. And the simulation results are compared with that of integer order. It proves the correctness of the fractional order mathematical model and the theoretical analysis.

You might also be interested in these eBooks

View Preview

Info:

Periodical:

Applied Mechanics and Materials (Volumes 789-790)

Pages:

842-848

DOI:

https://doi.org/10.4028/www.scientific.net/AMM.789-790.842

Citation:

Cite this paper

Online since:

September 2015

Authors:

Li Feng Yi*, Kai Ru Zhang, Jun Liu

Keywords:

Buck-Boost Converter, Continuous Mode, Fractional Order, Oustaloup Filter

Export:

RIS, BibTeX

Price:

Permissions CCC:

Request Permissions

Permissions PLS:

Request Permissions

Сopyright:

Citation:

* - Corresponding Author

References

[1] Meng Xiangyi, Tao Ran, Wang Yue. The fractional fourier domain multiple signal processing theory [J]. Science China Press, 2009, 39(5): 1004-1015.

Google Scholar

[2] Luo Peng. Research on non-stationary signal processing technology based on fractional fourier transform [D]. Tianjin: Tianjin University, 2011: 1-153.

Google Scholar

[3] Wang Ruiping. Research on fractional order controllers for permanent magnet synchronous motor speed control[D]. Guangzhou: South China University of Technology, 2012: 1-126.

Google Scholar

[4] Liu Chongxin. A hyperchaotic system and its fractional order circuit simulation[J]. Acta Physica Sinica, 2007, 56(12): 6865-6873.

DOI: 10.7498/aps.56.6865

Google Scholar

[5] Liu Chongxin. Theory and application of fractional order chaotic circuit[M]. Xi'an: Xi'an Jiao Tong University Press, 2011: 61-249.

Google Scholar

[6] Fu Peng. Stable numerical approximation for Caputo fractional derivatives[J]. Journal of Lanzhou University(Natural Sciences), 2008, 44(6): 117-119.

Google Scholar

[7] Chen Z X, Huang Z B, Zhang R R. On difference Equations Relating to Gamma function. Acta Mathematica Scientia, 31(4): 1281—1294.

DOI: 10.1016/s0252-9602(11)60315-9

Google Scholar

[8] Zheng Jingjing. The analysis of generalized Mittag-Leffler stability and Lp stability of fractional order nonlinear systems[D]. Jinan: Shan Dong University, 2012: 1-47.

Google Scholar