期刊信息
- 刊名: 河北师范大学学报(自然科学版)Journal of Hebei Normal University (Natural Science)
- 主办: 河北师范大学
- ISSN: 1000-5854
- CN: 13-1061/N
- 中国科技核心期刊
- 中国期刊方阵入选期刊
- 中国高校优秀科技期刊
- 华北优秀期刊
- 河北省优秀科技期刊
Robin边界条件下耦合退化抛物方程组解的爆破现象
- 广东财经大学 华商学院 数据科学学院, 广东 广州 511300
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DOI:10.13763/j.cnki.jhebnu.nse.202101009
Blow-up of Solutions for Coupled Degenerate Parabolic Systems with Robin Boundary Conditions
摘要/Abstract
摘要:
考虑了模拟许多物理现象的耦合退化抛物方程组,其中方程的解在区域的边界上满足Robin边界条件. 在前人工作的基础上,利用微分不等式,得到确保解全局存在的条件. 在对已知数据项做出适当的限制后,如果解在有限时刻爆破,推导了爆破时间的下界.
Abstract:
The coupled degenerate parabolic equations which simulate many physical phenomena are considered,where the solutions of the equations satisfy Robin boundary conditions on the boundary of the region.Based on the previous work, the conditions for ensuring the global existence of the solutions are obtained by using the differential inequality. After making appropriate restrictions on the known date, if the solutions blow-up in finite time, the lower bound of the blow-up time is deduced.
关键词
Key words:
degenerate parabolic equation
;
global solution
;
lower bound
参考文献 19
- [1] LIANG F.Blow-up and Global Solutions for Nonlinear Reaction-diffusion Equations with Nonlinear Boundary Condition[J].Applied Mathematics and Computation,2011,218(8):3993-3999.doi:10.1016/j.amc.2011.10.021
- [2] LIU B C,WU G C,SUN X Z,et al.Blow-up Estimate in a Reaction-diffusion Equation with Nonlinear Nonlocal Flux and Source[J].Computers and Mathematics with Applications,2019,78(6):1862-1877.doi:10.1016/j.camwa.2019.03.026
- [3] DU L L.Blow-up for a Degenerate Reaction-diffusion System with Nonlinear Nonlocal Sources[J].Journal of Computational and Applied Mathematics,2007,202(2):237-247.doi:10.1016/j.cam.2006.02.028
- [4] SONG J C.Lower Bounds for the Blow-up Time in a Nonlocal Reaction-diffusion Problem[J].Applied Mathematics Letters,2011,24(5):793-796.doi:10.1016/j.aml.2010.12.042
- [5] XU X J,YE Z.Life Span of Solutions with Large Initial Data for a Class of Coupled Parabolic Systems[J].Z Angew Math Phys,2013,64(12):705-717.doi:10.1007/s00033-012-0255-3
- [6] TIAN H M,ZHANG L L.Global and Blow-up Solutions for a Nonlinear Reaction Diffusion Equation with Robin Boundary Conditions[J].Boundary Value Problems,2020,2020:68-75.doi:10.1186/s13661-020-01363-y
- [7] WANG M X.Blow-up Rates for Semilinear Parabolic Systems with Nonlinear Boundary Conditions[J].Applied Mathematics Letters,2003,16(4):543-549.doi:10.1016/s0893-9659(03)00034-x
- [8] LIU Y.Lower Bounds for the Blow-up Time in a Nonlocal Reaction Diffusion Problem Under Nonlinear Boundary Conditions[J].Mathematical and Computer Modelling,2013,57(3/4):926-931.doi:10.1016/j.mcm.2012.10.002
- [9] LIU D M,MU C L,XIN Q.Lower Bounds Estimate for the Blow-up Time of a Nonlinear Nonlocal Porous Medium Equation[J].Acta Mathematica Scientia,2012,32B(3):1206-1212.doi:10.1016/s0252-9602(12)60092-7
- [10] GLADKOVA L,KAVITOVA T V.Blow-up Problem for Semilinear Heat Equation with Nonlinear Nonlocal Boundary Condition[J].Appl Anal,2015,95(9):1974-1988.doi:10.1080/00036811.2015.1080353
- [11] YANG X,ZHOU Z F.Blow-up Problems for the Heat Equation with a Local Nonlinear Neumann Boundary Condition[J].Journal of Differential Equations,2016,261(5):2738-2783.doi:10.1016/j.jde.2016.05.011
- [12] 李远飞.Keller-Segel抛物系统解的爆破现象[J].应用数学学报,2017,40(5):692-701. LI Yuanfei.Blow-up Phenomena for the Solutions to a Fully Parabolic Keller-Segel System[J].Acta Mathematicae Applicatae Sinica,2017,40(5):692-701.
- [13] 李远飞.Robin边界条件下更一般化的非线性抛物问题全局解的存在性和爆破[J].应用数学学报,2018,41(2):257-267. LI Yuanfei.Blow-up and Global Existence of the Solution to Some More General Nonlinear Parabolic Problems with Robin Boundary Conditions[J].Acta Mathematicae Applicatae Sinica,2018,41(2):257-267.
- [14] SEKI Y.Type Ⅱ Blow-up Mechanisms in a Semilinear Heat Equation with Critical Joseph-Lundgren Exponent[J].Journal of Functional Analysis,2018,275(12):3380-3456.doi:10.1016/j.jfa.2018.05.008
- [15] BOULAARAS S,CHOUCHA A,OUCHENANE D,et al.Blow up of Solutions of Two Singular Nonlinear Viscoe Lastic Equations with General Source and Localized Frictional Damping Terms[J].Advances in Difference Equations,2020,2020:310-317.doi:10.1186/s13662-020-02772-0
- [16] DANVERSD A.Faber-Krahn Inequality for Robin Problems in any Space Dimension[J].Mathe Ann,2006,335(4):767-785.doi:10.1007/s00208-006-0753-8
- [17] DING J T.Global and Blow-up Solutions for Nonlinear Parabolic Problems with a Gradient Term Under Robin Boundary Conditions[J].Boundary Value Problems,2013,2013:237-243.doi:10.1186/1687-2770-2013-237
- [18] ENACHE C.Blow-up Phenomena for a Class of Quasilinear Parabolic Problems Under Robin Boundary Condition[J].Applied Mathematics Letters,2011,24(3):288-292.doi:10.1016/j.aml.2010.10.006
- [19] LI Y F,LIU Y,LIN C H.Blow-up Phenomena for Some Nonlinear Parabolic Problems Under Mixed Boundary Conditions[J].Nonlinear Analysis:Real World Applications,2010,11(5):3815-3823.doi:10.1016/j.nonrwa.2010.02.011