Dynamics of Microtubule Growth and Catastrophe
Abstract
We investigate a simple model of microtubule dynamics in which a microtubule evolves by: (i) attachment of guanosine triphosphate (GTP) to its end at rate lambda, (ii) GTP converting irreversibly to guanosine diphosphate (GDP) at rate 1, and (iii) detachment of GDP from the end of a microtubule at rate mu. As a function of these elemental rates, the microtubule can grow steadily or its length can fluctuate wildly. A master equation approach is developed to characterize these intriguing features. For mu=0, we find exact expressions for tubule and GTP cap length distributions, as well as a power-law length distributions of GTP and GDP islands. For mu=oo, we find the average time between catastrophes, where the microtubule shrinks to zero length, and extend this approach to also determine the size distribution of avalanches (sequence of consecutive GDP detachment events). We obtain the phase diagram for general rates and verify our predictions by numerical simulations.
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