Research on Applied-Technology for Capacity with Variable Parameter Iteration Method

Yu Feng Gu; Peng Ju Li; Ya Nan Ya

doi:10.4028/www.scientific.net/AMR.1014.459

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HomeAdvanced Materials ResearchAdvanced Materials Research Vol. 1014Research on Applied-Technology for Capacity with...

Research on Applied-Technology for Capacity with Variable Parameter Iteration Method

Abstract:

Two-dimensional NMR spectrum can give reliable conclusion when it is used to identify and evaluate the testing fluid, and two-dimensional NMR inversion method is the key to get the spectrum Aiming at the deficiency of inversed results’ accuracy and computing speed in TSVD method, the variable parameter iteration method is proposed which include the singular value packet processing algorithm that mainly used to lay the foundation for the reliability of the results, and the variable parameter iteration algorithm that mainly used to speed up the iteration computing. In numerical simulation test, the variable parameter iteration method can restore the constructional diffusion-relaxation spectrum accurately and quickly compared with TSVD method. In oil-water experimental test, the spectrum inversed from variable parameter iteration method can identify the types of testing fluid correctly, and the relative error of oil saturation is 0.6% or 1.9% when oil water ratio is 3 to 1 or 1 to 2, the error are small that indicates the accuracy of the results got from the method is high. Variable parameter iteration method can process the real two-dimensional NMR data rapidly and efficiently, and the quality of the inversed diffusion-relaxation spectrum is high, which shows that the method has practical capacity and has the role of guiding the research of new inversion methods.

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Periodical:

Advanced Materials Research (Volume 1014)

Pages:

459-462

DOI:

https://doi.org/10.4028/www.scientific.net/AMR.1014.459

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Online since:

July 2014

Authors:

Yu Feng Gu*, Peng Ju Li, Ya Nan Ya

Keywords:

Diffusion-Relaxation Two-Dimensional Spectrum, Evaluation of Oil-Water Mixture, TSVD Method, Two-Dimensional NMR, Variable Parameter Iteration Method

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References

[1] Borgia G C, Brown R J S, Fantazzini P. Uniform—penalty inversion of multi—exponential decay data [J]. J Magn Reson, 1988, 132：65~77.

DOI: 10.1006/jmre.1998.1387

Google Scholar

[2] Butler J P, et al. Estimating solutions of the first integral equations with nonnegative constrains and optimal smoothing [J]. SIAM J Numer Anal, 1981, 18(3)：381~397.

DOI: 10.1137/0718025

Google Scholar

[3] Honerkamp J, Weese J. Tikhonovs regularization method for ill—posed problems：A comparison of different methods for the determination of the regularization parameter [J]. Continuum Mech Therm, 1990, 2: 17~30.

DOI: 10.1007/bf01170953

Google Scholar

[4] Chouzenoux E, Moussaoui S, Idier J, et al. Optimization of a maximum entropy criterion for 2D nuclear magnetic resonance reconstruction [J]. ICASSP, 2010, 4154~4157.

DOI: 10.1109/icassp.2010.5495720

Google Scholar

[5] Venkataramanan L, Song Y Q, Hurlimann M D. Solving fredholm integrals of the first kind with tensor product structure in 2 and 2. 5 dimension [J]. IEEE T Signal Process, 2002, 50(5)： 1 017~1 026.

DOI: 10.1109/78.995059

Google Scholar