Effect of Rolling Massage on Particle Moving Behaviour in Blood Vessels

Chin. Phys. Lett.

2008, Vol. 25

Issue (9): 3496-3499 DOI:

Original Articles

Effect of Rolling Massage on Particle Moving Behaviour in Blood Vessels

YI Hou-Hui¹, FAN Li-Juan¹, YANG Xiao-Feng², CHEN Yan-Yan³

¹Department of Physics and Electronic Science, Binzhou University, Shandong 256600²Department of Computer Engineering, Yiwu Industrial and Commercial College, Zhejiang 322000³Shanghai Institute of Applied Physics, Chinese Academy of Sciences, PO Box 800-204, Shanghai 201800

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YI Hou-Hui, FAN Li-Juan, YANG Xiao-Feng et al 2008 Chin. Phys. Lett. 25 3496-3499

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Abstract The rolling massage manipulation is a classic Chinese massage, which is expected to eliminate many diseases. Here the effect of the rolling massage on the particle moving property in the blood vessels under the rolling massage manipulation is studied by the lattice Boltzmann simulation. The simulation results show that the particle moving behaviour depends on the rolling velocity, the distance between particle position and rolling position. The average values, including particle translational velocity and angular velocity, increase as the rolling velocity increases almost linearly. The result is helpful to understand the mechanism of the massage and develop the rolling techniques.

Keywords: 87.19.-j 87.19.Uv 47.11.+j

Received: 09 June 2008 Published: 29 August 2008

PACS:	87.19.-j	(Properties of higher organisms)
	87.19.Uv
	47.11.+j

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https://cpl.iphy.ac.cn/ OR https://cpl.iphy.ac.cn/Y2008/V25/I9/03496

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	YI Hou-Hui
	FAN Li-Juan
	YANG Xiao-Feng
	CHEN Yan-Yan

[1] Fung Y C 1997 Biomechanics Circulation (Berlin:Springer)
[2] Stround J S, Berger S A and Saloner D 2002 J.Biomech. Eng. 124 9
[3] Maria Mercati 1997 The Handbook of Chinese Massage:Tuina Techniques to Awaken Body and Mind (Rochester, VT:Healing Art)
[4] Sun C N 1990 Chinese Massage Therapy (Jinan:Shandong Science and Technology Press)
[5] Xu S X 1997 Proceeding of 9th InternationalConference of Biomedical Engineering (Singapore: SingaporeUniversity Press) p 306
[6] Xu S X, Ji L and Wang Q W 2005 Appl. Math. Mech.Engl. 26 753
[7] McNamara G R and Zanetti G 1988 Phys. Rev. Lett. 61 2332
[8] Qian Y H et al 1992 Europhys. Lett. 17 479
[9] Chen S, Chen H, Martinez D O and Matthaeus W H 1991 Phys. Rev. Lett. 67 3776
[10] Chen H, Chen S and Matthaeus W H 1992 Phys. Rev.A 45 5339
[11] Chen H D et al 2003 Science 301 633
[12] Succi S 2001 The Lattice Boltzmann Equation forFluid Dynamics and Beyond (Oxford: Clarendon)
[13] Ladd A J C 1994 J. Fluid Mech. 271 285
[14] Wan R Z, Fang H P, Lin Z F and Chen S Y 2003 Phys.Rev. E 68 011401
[15] Zhang C Y, Shi J, Tan H L, Liu M R and Kong L J 2004 Chin. Phys. Lett. 21 1108
[16] Zhang C Y, Li H B, Tan H L, Liu M R and Kong L J 2004 Acta Phys. Sin. 54 1982 (in Chinese)
[17] Zhang C Y, Tan H L, Liu M R, Kong L J and Shi J 2005 Chin. Phys. Lett. 22 896
[18] Li H B, Lu X Y, Fang H P and Qian Y H 2004 Phys.Rev. E 70 026701
[19] Fang H P and Chen S Y 2004 Chin. Phys. 13 47
[20] Shan X and Chen H D 1993 Phys. Rev. E 47 1815
[21] Guo Z L and Zhao T S 2003 Phys. Rev. E 68035302
[22] Guo Z L and Zhao T S 2005 Phys. Rev. E 71026701
[23] Swift M R, Orlandini S E, Osborn W R and Yeomans J M 1995 Phys. Rev. Lett. 75 830
[24] Xu A G, Gonnella G and Lamura A 2004 Physica A 331 10
[25] Xu Y S, Wu F M, Chen Y Y and Xu X Z 2003 Chin.Phys. 12 621
[26] Xu Y S, Wu F M, Chen Y Y and Xu X Z 2003 Mod. Phys.Lett. B 19 1351
[27] Xu Y S 2003 Acta Phys. Sin. 52 626 (inChinese)
[28] Xu Y S, Li H B, Fang H P and Huang G X 2004 ActaPhys. Sin. 53 773 (in Chinese)
[29] Wu B Z, Xu Y S, Liu Y and Huang G X 2005 Chin.Phys. 14 2046
[30] Fang H P, Lin Z F and Wang Z W 1998 Phys. Rev. E 57 R25
[31] Fang H P, Wang Z W, Lin Z F and Liu M R 2002 Phys.Rev. E 65 051905
[32] Li H B, Fang H P, Lin Z F, Xu S X and Chen S Y 2004 Phys. Rev. E 69 031919
[33] Yi H H, Xu S X, Qian Y H, Fang H P 2005 Chin. Phys.Lett. 22 3210
[34] Kang X Y, Liu D H, Zhou J and Jin Y J 2005 Chin.Phys. Lett. 22 2873
[35] Lu X Y, Yi H H, Chen J Y, Fang H P 2006 Chin. Phys.Lett. 23 738
[36] Li H B, Yi H H, Shan X W, Fang H P 2008 Europhys.Lett. 81 54002
[37] Migliorini C et al 2002 Biophys. J. 83 1834
[38] Sun C H, Migliorini C and Munn L L 2003 Biophys.J. 85 208
[39] Segr\'e G and Silberberg A 1961 Nature 189209
[40] Segr\'e G and Silberberg A 1962 J. Fluid Mech. 14 115
[41] Zou Q and He X 1997 Phys. Fluids. 9 1591
[42] Allen M P and Tildesley D J 1987 ComputerSimulation of Liquid (Oxford: Clarendon)

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