Herrera-Hernández, E. C.; Aguilar-Madera, C. G.; Espinosa-Paredes, G.; Hernández, D. Modeling single-phase fluid flow in porous media through non-local fractal continuum equation. (English) Zbl 1508.76108 J. Eng. Math. 138, Paper No. 8, 18 p. (2023). MSC: 76S05 76-10 28A80 26A33 PDFBibTeX XMLCite \textit{E. C. Herrera-Hernández} et al., J. Eng. Math. 138, Paper No. 8, 18 p. (2023; Zbl 1508.76108) Full Text: DOI
Xiao, Boqi; Li, Yupeng; Long, Gongbo A fractal model of power-law fluid through charged fibrous porous media by using the fractional-derivative theory. (English) Zbl 1494.76090 Fractals 30, No. 3, Article ID 2250072, 12 p. (2022). MSC: 76S05 76W05 76A05 28A80 26A33 PDFBibTeX XMLCite \textit{B. Xiao} et al., Fractals 30, No. 3, Article ID 2250072, 12 p. (2022; Zbl 1494.76090) Full Text: DOI
Zhang, Nangao; Zhu, Changjiang Convergence to nonlinear diffusion waves for solutions of \(M_1\) model. (English) Zbl 1487.85025 J. Differ. Equations 320, 1-48 (2022). MSC: 85A25 35L65 35B40 82B24 35J05 35P15 35P30 26B20 PDFBibTeX XMLCite \textit{N. Zhang} and \textit{C. Zhu}, J. Differ. Equations 320, 1--48 (2022; Zbl 1487.85025) Full Text: DOI arXiv
Chang, Ailian; Sun, HongGuang; Zhang, Yong; Zheng, Chunmiao; Min, Fanlu Spatial fractional Darcy’s law to quantify fluid flow in natural reservoirs. (English) Zbl 1514.76086 Physica A 519, 119-126 (2019). MSC: 76S05 26A33 PDFBibTeX XMLCite \textit{A. Chang} et al., Physica A 519, 119--126 (2019; Zbl 1514.76086) Full Text: DOI
Garra, R.; Salusti, E. Application of the nonlocal Darcy law to the propagation of nonlinear thermoelastic waves in fluid saturated porous media. (English) Zbl 1355.76066 Physica D 250, 52-57 (2013). MSC: 76S05 26A33 74F10 PDFBibTeX XMLCite \textit{R. Garra} and \textit{E. Salusti}, Physica D 250, 52--57 (2013; Zbl 1355.76066) Full Text: DOI