Flagellar elongation as a moving boundary problem
作者: E LEVY
DOI: 10.1016/S0092-8240(74)80027-3
关键词: Elongation 、 Boundary (topology) 、 Growth rate 、 Mathematics 、 Diffusion 、 Flagellum 、 Polymerization 、 Base (geometry) 、 Classical mechanics 、 Mechanics 、 Boundary problem
摘要: Movement of a proposed controlling factor along the growing flagellum is considered as special case one-dimensional diffusion with moving boundary. Flagellar elongation, which involves polymerization building units at distal tip, viewed taking place in series steps. The concentration tip computed function distance from base, and time between reactions. It that this responsible for regulating flagellar growth rate final length.
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