双凹碟形囊泡在平基底上的粘附
首发时间:2014-01-23
摘要:本文对"内凹形"囊泡的粘附研究提供了一种可行的方法。利用生物膜泡的自发曲率模型,研究了双凹碟形囊泡在平基底上的粘附。通过对系统自由能积分式的变分,得到了该问题分区间的两组常微分方程组,根据推导所得的边界条件,给出了问题的数值结果。结果表明,双凹碟形囊泡的粘附,首先会从囊泡的纵坐标最低点发生,粘附长度随粘附能的增加而增加。
For information in English, please click here
Adhesion of biconcave vesicle act on flat substrate
Abstract:This paper provides a feasible method to study the adhesion of biconcave vesicle. By using the spontaneous curvature model, the adhesion of biconcave vesicle act on flat substrate is studied. Based on the variation of system free energy intergral, two sets of ordinary differential equations are derived, according to the corresponding boundary conditions, the numerical results are obtained. The result indicates that biconcave vesicle would first happen from the lowest point of vertical coordinate and adhesion length tends to increase with adhesion energy.
论文图表:
引用
No.4582267952333138****
同行评议
勘误表
双凹碟形囊泡在平基底上的粘附
评论
全部评论0/1000