Open AccessExactly solvable irreversible processes on one-dimensional lattices
Author(s) -
Nicholas Owen Wolf,
James W. Evans,
David K. Hoffman
Publication year - 1984
Publication title -
journal of mathematical physics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.708
H-Index - 119
eISSN - 1089-7658
pISSN - 0022-2488
DOI - 10.1063/1.526435
Subject(s) - lattice (music) , combinatorics , mathematics , statistical physics , k nearest neighbors algorithm , range (aeronautics) , physics , computer science , materials science , artificial intelligence , acoustics , composite material
We consider the kinetics of a process where the sites of an infinite 1‐D lattice are filled irreversibly and, in general, cooperatively by N‐mers (taking N consecutive sites at a time). We extend the previously available exact solution for nearest neighbor cooperative effects to range N cooperative effects. Connection with the continuous ‘‘cooperative car parking problem’’ is indicated. Both uniform and periodic lattices, and empty and certain partially filled lattice initial conditions are considered. We also treat monomer ‘‘filling in stages’’ for certain highly autoinhibitory cooperative effects of arbitrary range.
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