摘要
对平冲头压入半无限体问题建立了柱坐标流函数速度场,证明了该速度场散度为零,旋度为剪切应变速度的2倍。采用上界定理对该速度场积分,变形力与滑移线法结果相一致,证明了流线为一族同心圆(曲线族滑移线),柱坐标流函数的解法比直角坐标的简化。
With stream function in cylindrical coordinates, a velocity field for indentation of semi-infinite medium by a flat punch is established. The divergence of the field has been shown to be zero and the vorticity be 2 times of the shear strain rate. Using upper-bound theorem and integrating, the result of the indentation force is the same as that by the slip line solution. It shows that the stream line is a family of concentric circles(curve slip lines) and solution by stream function in cylindrical coordinates is simplier than that in rectangular ones.
出处
《塑性工程学报》
CAS
CSCD
1994年第2期11-16,共6页
Journal of Plasticity Engineering
关键词
流函数
柱坐标
塑性加工力学
半无限体压力
Stream function, Cylindrical coordinate, Stream line, Divergence, Vorticity, Dual vector
