摘要We analyze the two-dimensional peristaltic flow of a micropolar fluid in a curved channel. Long wavelength and low Reynolds number assumptions are used in deriving the governing equations. A shooting method with fourth-order Runge-Kutta algorithm is employed to solve the equations. The influence of dimensionless curvature radius on pumping and trapping phenomena is discussed with the help of graphical results. It is seen that the pressure rise per wavelength in the pumping region increases with an increase in the curvature of the channel. Moreover the symmetry of the trapped bolus destroys in going from straight to curved channel.
Abstract:We analyze the two-dimensional peristaltic flow of a micropolar fluid in a curved channel. Long wavelength and low Reynolds number assumptions are used in deriving the governing equations. A shooting method with fourth-order Runge-Kutta algorithm is employed to solve the equations. The influence of dimensionless curvature radius on pumping and trapping phenomena is discussed with the help of graphical results. It is seen that the pressure rise per wavelength in the pumping region increases with an increase in the curvature of the channel. Moreover the symmetry of the trapped bolus destroys in going from straight to curved channel.
N. Ali**;M. Sajid;T. Javed;Z. Abbas
. An Analysis of Peristaltic Flow of a Micropolar Fluid in a Curved Channel[J]. 中国物理快报, 2011, 28(1): 14704-014704.
N. Ali**, M. Sajid, T. Javed, Z. Abbas
. An Analysis of Peristaltic Flow of a Micropolar Fluid in a Curved Channel. Chin. Phys. Lett., 2011, 28(1): 14704-014704.
[1] Latham T W 1966 MS Thesis (Massachusetts Institute of Technology)
[2] Shapiro A H et al 1969 J. Fluid Mech. 37 799
[3] Fung Y C and Yih C S 1968 Trans. ASME J. Appl. Mech. 33 669
[4] Siddiqui A M and Schwarz W H 1994 J. Non-Newtonian Fluid Mech. 53 257
[5] Hayat T et al 2004 Math. Problems Eng. 2004 347
[6] Hayat T, Ali N and Asghar S 2007 Phys. Lett. A 363 397
[7] Wang Y, Hayat T and Hutter K 2007 Theor. Comput. Fluid Dyn. 21 369
[8] Haroun M H 2007 Commun. Nonlinear Sci. Numer. Simul. 8 1464
[9] Ali N, Wang Y et al 2008 Biorheology 45 611
[10] Srinivas S and Kothandapani M 2008 Int. J. Nonlinear Mech. 43 915
[11] Rao A R and Mishra M 2004 J. Non-Newtonian Fluid Mech. 121 163
[12] Hakeem A E et al 2006 Physica A 367 79
[13] Radhakrishnamacharya G 1982 Rheol. Acta 21 30
[14] Eringen A C 1966 J. Math. Mech. 16 1
[15] Ariman T et al 1974 Int. J. Eng. Sci. 12 273
[16] Lukasazewicz G 1999 Micropolar Fluids: Theory and Applications (Boston: Birkhauser)
[17] Eringen A C 2001 Micro-continuum Field Theories II: Fluent Media (New York: Springer)
[18] Raju K K and Devanathan R 1972 Rheol. Acta 11 170
[19] Devi G and Devanathan R 1975 Proc. Indian. Acad. Sci. 81(A) 149
[20] Srinivasacharya D, Mishra M and Rao A R 2003 Acta Mech. 161 165
[21] Hayat T and Ali N 2008 Math. Comp. Model. 48 721
[22] Sato H, Kawai T, Fujita T and Okabe 2000 Jpn. Soc. Mech. Eng. B 66 679
[23] Ali N, Sajid M and Hayat T 2010 Z. Naturforschung A 65a 191
2011, Vol. 28 
