2020
DOI: 10.1155/2020/2503154
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Fractal Characteristics of Porosity of Electrospun Nanofiber Membranes

Abstract: In this paper, the method of measuring the porosity of electrostatic nanofiber membrane by VC++ and Matlab is introduced. It is found that the ratio of the calculated porosity to the porosity measured by the mercury intrusion method accords with the famous Feigenbaum constant (α � 2.5029078750957 · · ·). e porosity distribution of nanofiber membranes was studied by VC++ and Matlab based on the image obtained by using a scanning electron microscope. e porosity distribution calculated by using a computer is magn… Show more

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Cited by 3 publications
(6 citation statements)
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“…The fractal dimension of the average pore width obtained is consistent with the fractal dimension of porosity obtained by Ting Wang etc. [13] under the meaning of the relative error less than 10%, this shows that it is reasonable to discuss the correlation fractal dimension.…”
Section: A Little Thoughmentioning
confidence: 83%
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“…The fractal dimension of the average pore width obtained is consistent with the fractal dimension of porosity obtained by Ting Wang etc. [13] under the meaning of the relative error less than 10%, this shows that it is reasonable to discuss the correlation fractal dimension.…”
Section: A Little Thoughmentioning
confidence: 83%
“…In this paper, the correlation fractal dimension was selected as a tool to analyze the chaotic and disordered pore distribution of electrospun nanofiber membrane. The relationship between the correlation fractal dimension of the average pore width of samples and its resistance [13,14] is shown in Table 3. Matlab was used to fit Table 3, and the correlation fractal dimension of the average pore width of the sample has a quadratic function relation with its resistance, that is, y=-0.000762226660605591x^2+0.0288271256410095x+1.3232485018709.…”
Section: Resultsmentioning
confidence: 99%
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