2002
DOI: 10.1088/0305-4470/35/21/303
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Yang$ndash$Lee zeros for a nonequilibrium phase transition

Abstract: Equilibrium systems which exhibit a phase transition can be studied by investigating the complex zeros of the partition function. This method, pioneered by Yang and Lee, has been widely used in equilibrium statistical physics. We show that an analogous treatment is possible for a nonequilibrium phase transition into an absorbing state. By investigating the complex zeros of the survival probability of directed percolation processes we demonstrate that the zeros provide information about universal properties. Mo… Show more

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Cited by 40 publications
(36 citation statements)
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“…As is evident from Fig. 7, which was presented in [48], the zeros do not lie along a single curve but along a sequence of curves meeting at the critical point (as well as inside some region that encloses part of the real axis for p > 2).…”
Section: Iv2 Reaction-diffusion Systems and Directed Percolationmentioning
confidence: 88%
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“…As is evident from Fig. 7, which was presented in [48], the zeros do not lie along a single curve but along a sequence of curves meeting at the critical point (as well as inside some region that encloses part of the real axis for p > 2).…”
Section: Iv2 Reaction-diffusion Systems and Directed Percolationmentioning
confidence: 88%
“…Otherwise, on a finite system the steady state is simply the absorbing state and the steady-state normalisation is trivially equal to a constant. Nevertheless the work of [47,48], which we reviewed in section IV.2, indicates that the Lee-Yang theory can be relevant when one considers other properties of the nonequilibrium system such as the percolation probability.…”
Section: Discussionmentioning
confidence: 99%
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