Results 121 to 130 of about 202 (148)
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International Journal of Computer Mathematics, 2019
In this paper, two Cauchy problems of Helmholtz equation in a three-dimensional case are considered. To address these problems, a mollification method with bivariate Dirichlet kernel is proposed.
Shangqin He, Xiufang Feng
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In this paper, two Cauchy problems of Helmholtz equation in a three-dimensional case are considered. To address these problems, a mollification method with bivariate Dirichlet kernel is proposed.
Shangqin He, Xiufang Feng
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International Communications in Heat and Mass Transfer, 2011
Abstract In some inverse problem, the convergence of the inverse algorithm is impossible due to the correlation of the involving parameters. Several different approaches have been used to address this problem. This paper proposes a procedure to smooth the temperature data by wavelet transform and mollification method prior to utilizing the Levenberg ...
S.D. Farahani, M. Sefidgar, F. Kowsary
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Abstract In some inverse problem, the convergence of the inverse algorithm is impossible due to the correlation of the involving parameters. Several different approaches have been used to address this problem. This paper proposes a procedure to smooth the temperature data by wavelet transform and mollification method prior to utilizing the Levenberg ...
S.D. Farahani, M. Sefidgar, F. Kowsary
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Mathematical Methods in the Applied Sciences
We study the inverse issues for the heat equations with spatial‐dependent source and time‐dependent source, respectively. In this work, the source identification issues are ill‐posed, and the numerical solutions (if they exist) are not continuously dependent on the data.
Lan Yang +4 more
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We study the inverse issues for the heat equations with spatial‐dependent source and time‐dependent source, respectively. In this work, the source identification issues are ill‐posed, and the numerical solutions (if they exist) are not continuously dependent on the data.
Lan Yang +4 more
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2018
Supplemental Material for An Adaptive and Fully Automated Baseline Correction Method for Raman Spectroscopy Based on Morphological Operations and Mollification by Hao Chen, Weiliang Xu and Neil G.R.
Chen, Hao +2 more
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Supplemental Material for An Adaptive and Fully Automated Baseline Correction Method for Raman Spectroscopy Based on Morphological Operations and Mollification by Hao Chen, Weiliang Xu and Neil G.R.
Chen, Hao +2 more
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International Journal of Computer Mathematics, 2023
Lan Yang, Lin Zhu, Shangqin He
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Lan Yang, Lin Zhu, Shangqin He
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A New Method of Predicting US and State-Level Cancer Mortality Counts for the Current Calendar Year
Ca-A Cancer Journal for Clinicians, 2004Ahmedin Jemal Dvm, Eric J Feuer
exaly
The Mollification Method and the Numerical Solution of Ill-Posed Problems (Diego A. Murio)
SIAM Review, 1994openaire +1 more source
The Mollification Method and the Numerical Solution of Ill‐Posed Problems
1993openaire +1 more source