We continue the investigation of the behavior of the contact process
on infinite connected graphs of bounded degree. Some questions left open by
Salzano and Schonmann (1997) concerning the notions of complete convergence,
partial convergence and the criterion $r = s$ are answered.
¶ The continuity properties of the survival probability and the
recurrence probability are studied. These order parameters are found to have a
richer behavior than expected, with the possibility of the survival probability
being discontinuous at or above the threshold for survival. A condition which
guarantees the continuity of the survival probability above the survival point
is introduced and exploited. The recurrence probability is shown to always be
left-continuous above the recurrence point, and a necessary and sufficient
condition for its right-continuity is introduced and exploited. It is shown
that for homogeneous graphs the survival probability can only be discontinuous
at the survival point, and the recurrence probability can only be discontinuous
at the recurrence point.
¶ For graphs which are obtained by joining a finite number of severed
homogeneous trees by means of a finite number of vertices and edges, the
survival point, the recurrence point and the discontinuity points of the
survival and recurrence probabilities are located.
Publié le : 1999-04-15
Classification:
Contact process,
graphs,
invariant measures,
ergodic behavior,
critical points,
complete convergence,
partial convergence,
criterion r = s,
order parameters,
continuity properties,
60K35
@article{1022677388,
author = {Salzano, Marcia and Schonmann, Roberto H.},
title = {The Second Lowest Extremal Invariant Measure of the Contact
Process II},
journal = {Ann. Probab.},
volume = {27},
number = {1},
year = {1999},
pages = { 845-875},
language = {en},
url = {http://dml.mathdoc.fr/item/1022677388}
}
Salzano, Marcia; Schonmann, Roberto H. The Second Lowest Extremal Invariant Measure of the Contact
Process II. Ann. Probab., Tome 27 (1999) no. 1, pp. 845-875. http://gdmltest.u-ga.fr/item/1022677388/