1) multi-viscousity-fluid
多介质黏性流体
1.
The compressible multi-viscousity-fluid piecewise parabolic method (MVPPM) is developed for Navier-Stokes equations based on the Eulerian multi-fluid piecewise parabolic method (MFPPM),the second order space central difference method and two-stage Rung-Kutta time marching method.
在可压缩多介质流体动力学高精度欧拉计算方法多介质流体分段抛物方法(multi-fluid piecewise parabolic method,MFPPM)基础上,运用算子分裂技术,增加二阶空间中心差方法和两步Rung-Kutta时间推进方法计算动力学黏性以及热流部分对流场的影响,发展适用于NS(Navier-Stokes)方程的可压缩多介质黏性流体计算方法多介质黏性流体分段抛物方法(multi-viscousity-fluid piecewise parabolic method,MVPPM)。
2) viscoelastic porous media
黏弹性多孔介质
3) viscoelastic granular media
黏弹性散体介质
4) multi-material fluid
多介质流体
1.
The numerical simulation of compressible multi-material fluids has become an increasing important aspect in CFD.
多介质流体运动界面问题的数值模拟已经成为计算流体力学研究领域的重要研究课题之一。
5) viscous medium
黏性介质
1.
Planar vibration of a thin elastic rod with circular cross section in viscous medium;
黏性介质中圆截面弹性细杆的平面振动
2.
Influence of tube blank diameter on necking forming under outer pressure in viscous medium
筒坯直径对黏性介质外压缩径成形的影响
6) fluid-satruiated porous medium
含流体多孔弹性介质
补充资料:多介质深层过滤器
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条