Application of diflerential constraint method to exact solution of second-grade fluid

Application of diflerential constraint method to exact solution of second-grade fluid

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摘要 A differential constraint method is used to obtain analytical solutions of a second-grade fluid flow. By using the first-order differential constraint condition, exact solutions of Poiseuille flows, jet flows and Couette flows subjected to suction or blowing forces, and planar elongational flows are derived. In addition, two new classes of exact solutions for a second-grade fluid flow are found. The obtained exact solutions show that the non-Newtonian second-grade flow behavior depends not only on the material viscosity but also on the material elasticity. Finally, some boundary value problems are discussed. A differential constraint method is used to obtain analytical solutions of a second-grade fluid flow. By using the first-order differential constraint condition, exact solutions of Poiseuille flows, jet flows and Couette flows subjected to suction or blowing forces, and planar elongational flows are derived. In addition, two new classes of exact solutions for a second-grade fluid flow are found. The obtained exact solutions show that the non-Newtonian second-grade flow behavior depends not only on the material viscosity but also on the material elasticity. Finally, some boundary value problems are discussed.

作者张道祥冯素晓卢志明刘宇陆

机构地区 Shanghai Institute of Applied Mathematics and Mechanics College of Mathematics and Computer Science

出处《Applied Mathematics and Mechanics(English Edition)》 SCIE EI 2009年第4期403-412,共10页 应用数学和力学（英文版）

基金 supported by the National Natural Science Foundation of China (No. 10772110)

关键词 non-Newtonian fluid differential constraint method second-grade fluid non-Newtonian fluid, differential constraint method, second-grade fluid

分类号 O358 [理学—流体力学]

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参考文献6

1黄军旗,刘慈群.AN ANALYTICAL SOLUTION AND ANALYSIS OF CHARACTERS FOR VISCOELASTIC FLUID FLOW IN ANNULAR PIPE[J].Applied Mathematics and Mechanics(English Edition),1997,18(6):535-541. 被引量：1
2沈芳,谭文长,赵耀华,T.增冈隆士.广义二阶流体涡流速度的衰减和温度扩散[J].应用数学和力学,2004,25(10):1053-1060. 被引量：8
3M.禹儒索一,吴承平.第二梯度流体的蠕变流和热传导相似解[J].应用数学和力学,2004,25(4):425-432. 被引量：4
4刘慈群,黄军旗.非牛顿流体管内不定常流的解析解[J].应用数学和力学,1989,10(11):939-946. 被引量：13
5朱文辉,刘慈群.ANALYTICAL SOLUTION OF FLOW OF SECOND-ORDER NON-NEWTONIAN FLUIDS THROUGH ANNULAR PIPES[J].Applied Mathematics and Mechanics(English Edition),1993,14(3):209-215. 被引量：1
6黄军旗,刘慈群.环空管内粘弹性流体不定常旋转流的解及流动特性分析[J].应用数学和力学,1997,18(6):499-506. 被引量：6

二级参考文献29

1谭文长,徐明瑜.PLANE SURFACE SUDDENLY SET IN MOTION IN A VISCOELASTIC FLUID WITH FRACTIONAL MAXWELL MODEL[J].Acta Mechanica Sinica,2002,18(4):342-349. 被引量：19
2刘慈群,黄军旗.非牛顿流体管内不定常流的解析解[J].应用数学和力学,1989,10(11):939-946. 被引量：13
3何光渝,黄军旗,刘慈群.广义二阶流体管内轴向流动[J].应用数学和力学,1995,16(9):767-773. 被引量：4
4[2]Fetecau C, Fetacau Corina, Zierep J. Decay of a potential vortex and propagation of a heat wave in a second grade fluid [J]. International Journal of Non-Linear Mechanics, 2002,37 (6): 1051 - 1056.
5[3]Bagley R L. A theoretical basis for the application of fractional calculus to viscoelasticity[J]. Journal of Rheology , 1983,27(3) :201-210.
6[4]Friedrich C H R. Relaxation and retardation function of the Maxwell model with fractional derivatives [J]. RheolActa, 1991,30(2): 151-158.
7[10]TAN Wen-chang,XU Ming-yu. The impulsive motion of flat plate in a general second grade fluid[J].Mechanics Research Communication , 2002 , 29 ( 1 ) :3-9.
8[12]TANWen-chang,PANWen-xiao,XUMing-yu. A note on unsteady flows of a viscoelastic fluid with the fractional Maxwell model between two parallel plates[J]. International Journal of Non-Linear Mechanics, 2003,38(5): 645-650.
9[14]Song D Y, Jiang T Q. Study on the constitutive equation with fractional derivative for the viscoelastic fluids-modified Jeffreys model and its application [J]. Rheologica Acta, 1998,27(5):512-517.
10[15]PodlubnyI. FractionalDifferential Equations[M].SanDiego: Academic Press , 1999, 1-303.

共引文献24

1CAI Ruixian1 & GOU Chenhua1,2 1. Institute of Engineering Thermophysics, Chinese Academy of Sciences, Beijing 100080, China,2. Graduate School, Chinese Academy of Sciences, Beijing 100080, China.Algebraically explicit analytical solu-tions for the unsteady non-Newtonian swirling flow in an annular pipe[J].Science China(Physics,Mechanics & Astronomy),2006,49(4):396-400. 被引量：4
2TONG Dengke WANG Ruihe YANG Heshan.Exact solutions for the flow of non-Newtonian fluid with fractional derivative in an annular pipe[J].Science China(Physics,Mechanics & Astronomy),2005,48(4):485-495. 被引量：15
3TAN Wenchang,XIAN Feng,WEI Lan.An exact solution of unsteady Couette flow of generalized second grade fluid[J].Chinese Science Bulletin,2002,47(21):1783-1785. 被引量：17
4朱文辉,刘慈群.二阶非牛顿流体环管流动解析解[J].应用数学和力学,1993,14(3):195-201. 被引量：3
5同登科,王瑞和,杨河山.管内非Newton流体分数阶流动的精确解[J].中国科学（G辑）,2005,35(3):318-326. 被引量：16
6黄军旗,刘慈群.双筒流变仪中粘弹性流体的解析解及运动特性分析[J].中国科学（A辑）,1995,25(11):1159-1167.
7Asif Aii,Ahmer Mehmood,Muhammad R.Mohyuddin.Lie group analysis of viscoelastic MHD aligned flow and heat transfer[J].Acta Mechanica Sinica,2005,21(4):342-345.
8刘慈群,黄军旗.环空套管内粘弹性流体[J].应用数学学报,1996,19(1):10-14. 被引量：7
9蔡睿贤,苟晨华.环管中非定常非Newton旋流的代数显式解析解[J].中国科学（G辑）,2006,36(4):445-448. 被引量：1
10Haitao Qi,Hui Jin.Unsteady rotating flows of a viscoelastic fluid with the fractional Maxwell model between coaxial cylinders[J].Acta Mechanica Sinica,2006,22(4):301-305. 被引量：9

1严静,曹毅.电流变液泊肃叶流动中球形颗粒运动方程的近似解[J].江苏理工学院学报,2014,20(4):50-52.
2付强.纺丝拉伸流动共转Oldroyd B流体模型的建立[J].西南民族大学学报（自然科学版）,2009,35(6):1233-1235.
3马增威,汪志勇,韦建卫,刘改琴,胡南,李锐峰.大学物理中流体力学问题的计算机模拟研究[J].大学物理,2016,35(10):17-19. 被引量：4
4李宏杰,江体乾.聚丙烯腈溶液的拉伸流动[J].力学学报,1994,26(6):664-670. 被引量：2
5曾于,吴望一.圆球壳Stokes渗透流动的一个准确解[J].北京大学学报（自然科学版）,1990,26(3):299-308.
6曾于,吴望一.轴对称拉伸流动中大表面张力下球形液滴Stokes流动的准确解[J].水动力学研究与进展（A辑）,1991,6(3):15-22.
7罗振华.两平行平板间粘塑性Poiseuille流动的解析解[J].宁夏大学学报（自然科学版）,1993,14(4):52-54.
8张玮,王元,徐忠,金文.应用粒子图像速度场仪对泊肃叶流动及圆柱绕流的测量[J].西安交通大学学报,2002,36(3):246-251. 被引量：12
9韩式方.扰动本构方程及粘弹流体拉伸流动不稳定性[J].力学学报,1993,25(2):213-217. 被引量：2
10张艳,张敏,黄震.广义二阶流体的脉冲泊肃叶流动分析[J].工程科学学报,2016,38(7):1002-1007.

Applied Mathematics and Mechanics(English Edition)

2009年第4期

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Application of diflerential constraint method to exact solution of second-grade fluid

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