Novel steady state of a microtubule assembly in a confined geometry
release_dwr7v444f5ebbgx4bvjsl4widy
by
Bindu S. Govindan and William. B. Spillman,
Jr. (Virginia Tech Applied
Biosciences Center)
2004
Abstract
We study the steady state of an assembly of microtubules in a confined
volume, analogous to the situation inside a cell where the cell boundary forms
a natural barrier to growth. We show that the dynamical equations for growing
and shrinking microtubules predict the existence of two steady states, with
either exponentially decaying or exponentially increasing distribution of
microtubule lengths. We identify the regimes in parameter space corresponding
to these steady states. In the latter case, the apparent catastrophe frequency
near the boundary was found to be significantly larger than that in the
interior. Both the exponential distribution of lengths and the increase in the
catastrophe frequency near the cell margin is in excellent agreement with
recent experimental observations.
In text/plain
format
Archived Files and Locations
application/pdf
97.5 kB
file_k6y6qwriwvcvnn2ff6sxevjs74
|
archive.org (archive) |
q-bio/0401004v1
access all versions, variants, and formats of this works (eg, pre-prints)