The compressive stress in the Van der Waals state equation is coupled into the SPH model to simulate the droplet's surface tension. To improve model's stress stability, the tensile stress and compressive stresses are calculated, respectively with a modified Quintic kernel function and a Bell-Shaped kernel function. The model is verified by simulating the droplet impact on super hydrophobic surface, and the numerical result is in good agreement with experiment data. Furthermore, the solid surface's frictional stress and its effective region are analyzed. It is shown that, when the wall relative infiltration diameter φ<1, the effect of the solid surface viscosity υ' on the droplet's spreading is not significant. When φ≥1, under the same condition, the droplet spreading velocity and φmax (maximum φ) will decrease with the increase of υ'. During the spreading process φ≥1 is the main effective region of the frictional stress. The time taken to achieve the φmax at different υ' sees very small change, so υ' has little influence on the spreading time. Under the same solid boundary condition, the frictional stress of the spreading droplet will increase with the increase of the impact velocity ν0. The relation between υ' and ν0 is roughly in a parabola.
WANG Zhichao
,
NIU Jiao
. Research of droplet impact on super hydrophobic surface based on an improved stress algorithm of SPH method[J]. Science & Technology Review, 2017
, 35(2)
: 87
-91
.
DOI: 10.3981/j.issn.1000-7857.2017.02.012
[1] Rioboo Romain, Marengo Marco, Tropea Cameron. Time evolution of liq-uid drop impact onto solid, dry surfaces[J]. Experiments in Fluids, 2002, 33(1):112-124.
[2] Thoroddsen S T. The ejecting sheet generated by the impact of a drop[J]. Journal of Fluid Mechanics, 2002, 451:373-381.
[3] 刘赵淼, 刘华敏, 张谭. 液滴喷射技术在全聚合物薄膜晶体管制备中的应用[J]. 科技导报, 2008, 26(13):44-48. Liu Zhaomiao, Liu Huamin, Zhang Tan. Application of inkjet printing on preparation of all polymer thin film transistors[J]. Science & Tech-nology Review, 2008, 26(13):44-48.
[4] Malgarinos Ilias, Nikolopoulos Nikolaos, Marengo Marco, et al. VOF simulations of the contact angle dynamics during the drop spreading:Standard models and a new wetting force model[J]. Advances in Colloid and Interface Science, 2014, 212:1-20.
[5] Sang H L, Hur Nahmkeon, Kang Seongwon. A numerical analysis of drop impact on liquid film by using a level set method[J]. Journal of Mechanical Science and Technology, 2011, 25(10):2567-2572.
[6] Jesus W C, Roma A M, Pivello M R, et al. A 3D front-tracking ap-proach for simulation of a two-phase fluid with insoluble surfactant[J]. Journal of Computational Physics, 2015, 281:403-420.
[7] Song Baowei, Ren Feng, Hu Haibao, et al. Lattice Boltzmann simula-tion of liquid-vapor system by incorporating a surface tension term[J]. Chinese Physics B, 2015, 24(1):014703.
[8] 李大鸣, 王志超, 白玲, 等. 液滴撞击孔口附近壁面运动过程的模拟研究[J]. 物理学报, 2013, 62(19):194704. Li Daming, Wang Zhichao, Bai Ling, et al. Investigations on the pro-cess of droplet impact on an orifice plate[J]. Acta Physica Sinica, 2013, 62(19):194704.
[9] 潘建平, 曾庆筠. 基于SPH方法连续液滴撞击固壁面模拟[J]. 科技导报, 2015, 33(11):13-16. Pan Jianping, Zeng Qingyun. Simulation of continuous droplet imping-ing on solid surface based on SPH method[J]. Science & Technology Review, 2015, 33(11):13-16.
[10] Morris J P, Fox P J, Zhu Y. Modeling low Reynolds number incom-pressible flows using SPH[J]. Journal of Computational Physics, 1997, 136:214-226.
[11] Monaghan J J. Simulating free surface flows with SPH[J]. Journal of Computational Physics, 1994, 110:399-406.
[12] Randles P W, Libersky L D. Normalized SPH with stress points[J]. In-ternational Journal for Numerical Methods in Engineering, 2000, 48(10):1445-1462.
[13] 杨秀峰, 刘谋斌. 光滑粒子动力学SPH方法应力不稳定性的一种改进方案[J]. 物理学报, 2012, 61(22):224701. Yang Xiufeng, Liu Moubing. Improvement on stress instability in smoothed particle hydrodynamics[J]. Acta Physica Sinica, 2012, 61(22):224701.
[14] Swegle J W, Hicks D L, Attaways S W. Smoothed particle hydrody-namics stability analysis[J]. Journal of Computational Physics, 1995, 116:123-134.
[15] Monaghan J J. SPH without a tensile instability[J]. Journal of Computa-tional Physics, 2000, 159(2):290-311.
[16] 李西营. 液滴撞击固体壁面的实验及理论研究[D]. 大连:大连理工大学, 2010. Li Xiying. Experimental and theoretical studies on water droplet im-pacting dry solid surfaces[D]. Dalian:Dalian University of Teehnology, 2010.
[17] 刘栋. 液滴碰撞及其融合过程的数值模拟研究[D]. 北京:清华大学, 2013. Liu Dong. Numerical Simulations on Collision and Coalescence of Bi-nary Droplets[D]. Beijing:Tsinghua University, 2013.