Using a simple three-dimensional lattice copolymer model and Monte Carlo
dynamics, we study the collapse and folding of protein-like heteropolymers. The
polymers are 27 monomers long and consist of two monomer types. Although these
chains are too long for exhaustive enumeration of all conformations, it is
possible to enumerate all the maximally compact conformations, which are 3x3x3
cubes. This allows us to select sequences that have a unique global minimum. We
then explore the kinetics of collapse and folding and examine what features
determine the various rates. The folding time has a plateau over a broad range
of temperatures and diverges at both high and low temperatures. The folding
time depends on sequence and is related to the amount of energetic frustration
in the native state. The collapse times of the chains are sequence independent
and are a few orders of magnitude faster than the folding times, indicating a
two-phase folding process. Below a certain temperature the chains exhibit
glass-like behavior, characterized by a slowing down of time scales and loss of
self-averaging behavior. We explicitly define the glass transition temperature
(Tg), and by comparing it to the folding temperature (Tf), we find two classes
of sequences: good folders with Tf > Tg and non-folders with Tf < Tg.Comment: 23 pages (plus 10 figures included in a seperate file) LaTeX, no
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