Acta mathematica scientia,Series A ›› 2026, Vol. 46 ›› Issue (3): 1160-1182.
Previous Articles Next Articles
Asymptotic Behavior of Solutions for Cauchy Problem of a Non-Newtonian Filtration Equation with Decaying Volumetric Moisture Content
Wentao Huo1(
), Zhongbo Fang2,*()
- 1
School of Mathematical Sciences ,Nankai University Tianjin 300071
2School of Mathematical Sciences ,Ocean University of China Shandong Qingdao 266100
-
Received:2025-03-10Revised:2025-06-27Online:2026-06-26Published:2026-06-16 -
Contact:Zhongbo Fang E-mail:huowentaoouc@163.com;fangzb7777@hotmail.com -
Supported by:Natural Science Foundation of Shandong Province of China(ZR2024MA034)
CLC Number:
- O175.23
Cite this article
Wentao Huo, Zhongbo Fang. Asymptotic Behavior of Solutions for Cauchy Problem of a Non-Newtonian Filtration Equation with Decaying Volumetric Moisture Content[J].Acta mathematica scientia,Series A, 2026, 46(3): 1160-1182.
share this article
Add to citation manager EndNote|Reference Manager|ProCite|BibTeX|RefWorks
| [1] | Wu Z Q, Zhao J N, Yin J X, Li H L. Nonlinear Diffusion Equations. Singapore: World Scientific, 2001 |
| [2] | Dibenedetto E. Degenerate Parabolic Equations. New York: Springer, 1993 |
| [3] | Samarskii A A, Galaktionov V A, Kurdyumov S P, Mikhailov A P. Blow-up in Quasilinear Parabolic Equations. Berlin: Walter de Gruyter, 1995 |
| [4] |
Zhao J N. On the Cauchy problem and initial traces for the evolution $p$-Laplacian equations with strongly nonlinear sources. J Differ Equations, 1995, 121 (2): 329-383
doi: 10.1006/jdeq.1995.1132 |
| [5] | Galaktionov V A. Conditions for nonexistence as a whole and localization of the solutions of Cauchy's problem for a class of nonlinear parabolic equations. Zh Vychisl Mat Mat Fiz, 1985, 23 : 1341-1354 |
| [6] |
DiBenedetto E, Herrero M A. On the Cauchy problem and initial traces for a degenerate parabolic equation. Trans Amer Math Soc, 1989, 314 : 187-224
doi: 10.1090/tran/1989-314-01 |
| [7] |
Galaktionov V A. Blow-up for quasilinear heat equations with critical Fujita's exponents. Proc Roy Soc Edinburgh, 1994, 124 : 517-525
doi: 10.1017/S0308210500028766 |
| [8] | Fujita H. On the blowing up of solutions to the Cauchy problem for $u_{t}=\Delta u+u^{1+\alpha}$. J Fac Sci Univ Tokyo, 1996, 13 (2): 109-124 |
| [9] | Hayakawa K. On nonexistence of global solutions of some semilinear parabolic differential equations. Proc Jpn Acad, 1973, 49 (7): 503-505 |
| [10] |
Weissler F B. Existence and nonexistence of global solutions for a semilinear heat equation. Isr J Math, 1981, 38 (1/2): 29-40
doi: 10.1007/BF02761845 |
| [11] | Quittner P. The decay of global solutions of a semilinear heat equation. Discrete Contin Dyn Syst, 2008, 21 : 307-318 |
| [12] |
Souplet P. Morrey spaces and classification of global solutions for a supercritical semilinear heat equation in $\mathbb{R}^{N}$. J Funct Anal, 2017, 272 : 2005-2037
doi: 10.1016/j.jfa.2016.09.002 |
| [13] | Qi Y W. Critical exponents of degenerate parabolic equations. Sci China, 1995, 38 : 1153-1162 |
| [14] |
Qi Y W. The global existence and nonuniqueness of a nonlinear degenerate equation. Nonlinear Anal, 1998, 31 (1/2): 117-136
doi: 10.1016/S0362-546X(96)00298-2 |
| [15] |
Kamin S, Kersner R. Disappearance of Interfaces in Finite Time. Meccanica, 1993, 28 (2): 117-120
doi: 10.1007/BF01020323 |
| [16] |
Kamin S, Pozio A, Tessi A. Admissible conditions for parabolic equations degenerating at infinity. St Petersb Math J, 2008, 19 (2): 239-251
doi: 10.1090/S1061-0022-08-00996-5 |
| [17] |
Tedeev A F. Conditions for the time global existence and nonexistence of a compact support of solutions to the Cauchy problem for quasilinear degenerate parabolic equations. Siberian Math J, 2004, 45 (1): 155-164
doi: 10.1023/B:SIMJ.0000013021.66528.b6 |
| [18] |
Tedeev A F. The interface blow-up phenomenon and local estimates for doubly degenerate parabolic equations. Appl Anal, 2007, 86 (6): 755-782
doi: 10.1080/00036810701435711 |
| [19] | Dzagoeva L F, Tedeev A F. Asymptotic behavior of the solution of doubly degenerate parabolic equations with inhomogeneous density. Vladikavkaz Mat Zh, 2022, 24 (3): 78-86 |
| [20] |
Baras P, Kersner R. Local and global solvability of a class of semilinear parabolic equations. J Differ Equations, 1987, 68 : 238-252
doi: 10.1016/0022-0396(87)90194-X |
| [21] |
Pinsky R G. Existence and nonexistence of global solutions for $u_{t}=\Delta u+a(x)u^{p}$ in $\mathbb{R}^{d}$. J Differ Equations, 1997, 133 : 152-177
doi: 10.1006/jdeq.1996.3196 |
| [22] | Eidelman S, Kamin S, Porper F. Uniqueness of solutions of the Cauchy problem for parabolic equations degenerating at infinity. Asymptotic Anal, 2000, 22 : 349-358 |
| [23] |
Pablo A D, Reyes G, Sanchez A. The Cauchy problem for a nonhomogeneous heat equation with reaction. Discrete Contin Dyn Syst, 2013, 33 : 643-662
doi: 10.3934/dcds.2013.33.643 |
| [24] | Li X, Xiang Z Y. Existence and nonexistence of local/global solutions for a nonhomogeneous heat equation. Commun Pur Appl Anal, 2014, 13 : 1465-1480 |
| [25] | Andreucci D, Tedeev A F. Universal bounds at the blow-up time for nonlinear parabolic equations. Adv Differential Equ, 2005, 10 (1): 89-120 |
| [26] |
Martynenko A V, Tedeev A F. Cauchy problem for a quasilinear parabolic equation with a source term and an inhomogeneous density. Comput Math Math Phys, 2007, 47 : 238-248
doi: 10.1134/S096554250702008X |
| [27] | Martynenko A V, Tedeev A F. Regularity of solutions of degenerate parabolic equation with inhomogenious density. Ukr Mat Visn, 2008, 5 : 116-145 |
| [28] |
Martynenko A V, Tedeev A F. On the behavior of solutions to the Cauchy problem for a degenerate parabolic equation with inhomogeneous density and a source. Comput Math Math Phys, 2008, 48 (7): 1145-1160
doi: 10.1134/S0965542508070087 |
| [29] |
Cianci P, Martynenko A V, Tedeev A F. The blow-up phenomenon for degenerate parabolic equations with variable coefficients and nonlinear source. Nonlinear Anal, 2010, 73 (7): 2310-2323
doi: 10.1016/j.na.2010.06.026 |
| [30] |
Martynenko A V, Tedeev A F, Shramenko V N. The Cauchy problem for a degenerate parabolic equation with inhomogeneous density and a source in the class of slowly vanishing initial functions. Izv Math, 2012, 76 (3): 563-580
doi: 10.1070/IM2012v076n03ABEH002595 |
| [31] |
Martynenko A V, Tedeev A F, Shramenko V N. On the behavior of solutions of the Cauchy problem for a degenerate parabolic equation with source in the case where the initial function slowly vanishes. Ukr Math J, 2013, 64 (11): 1698-1715
doi: 10.1007/s11253-013-0745-2 |
| [32] |
Martynenko A V. Global solvability for quasilinear parabolic equation with inhomogeneous density and a source. Appl Anal, 2013, 92 (9): 1863-1888
doi: 10.1080/00036811.2012.708408 |
| [33] |
Kato T. Schr$\ddot{\rm o}$dinger operators with singular potentials. Isr J Math, 1972, 13 : 135-148
doi: 10.1007/BF02760233 |
| [34] | D'Ambrosio L, Mitidieri E. A priori estimates and reduction principles for quasilinear elliptic problems and applications. Adv Differential Equ, 2012, 17 (9/10): 935-1000 |
|
||