id: 01325120
dt: j
an: 01325120
au: Jensen, Iwan
ti: Series expansions for the percolation probability of a generalized
    Domany-Kinzel cellular automaton.
so: J. Phys. A, Math. Gen. 30, No.24, 8471-8478 (1997).
py: 1997
pu: IOP Publishing Ltd., Bristol, UK
la: EN
cc: 
ut: series expansions; Dlog-Padé approximants; percolation probability;
    generalized Domany-Kinzel cellular automaton; absorbing states;
    critical exponent
ci: 
li: doi:10.1088/0305-4470/30/24/012
ab: Summary: Series expansions have been derived for the percolation
    probability of a generalized Domany-Kinzel cellular automaton with two
    equivalent absorbing states. The analysis of the series generally
    yields estimates of the critical exponent $β= 100\pm 0,05$, consistent
    with earlier Monte Carlo studies thus confirming that the model belongs
    to the same universality class as branching annihilating random walks
    with an even number of offspring. There is evidence to suggest that
    when the probability of spreading from two active sites becomes small a
    new critical behaviour emerges.
rv: