Survival probability of a diffusing particle in the presence of Poisson-distributed mobile traps

Blythe, Richard A.; Bray, A. J.

doi:10.1103/physreve.67.041101

Cited by 68 publications

(110 citation statements)

References 26 publications

Supporting

Mentioning

101

Contrasting

Order By: Relevance

“…Yet surprisingly, in the two-species pair annihilation process there occurs no marked qualitative change at two dimensions for the case of equal initial densities. However, the critical dimension d c = 2 strongly impacts the scenario with unequal initial densities, where the minority species decays exponentially with a presumably nonuniversal rate for all d > 2, exhibits logarithmic corrections in d c = 2, and decays according to a stretched exponential law [16,17] with universal exponent and probably also coefficient [18,19] for d < 2 (see section 4.3). The critical dimension is similarly revealed in the scaling of the reaction zones, which develop when the A and B particles are initially segregated (section 5.2).…”

Section: The Origin Of Universality In Relaxational Reactionsmentioning

confidence: 99%

Applications of field-theoretic renormalization group methods to reaction–diffusion problems

Täuber¹,

Howard²,

Vollmayr-Lee³

2005

J. Phys. A: Math. Gen.

274

506

View full text Add to dashboard Cite

Abstract. We review the application of field-theoretic renormalization group (RG) methods to the study of fluctuations in reaction-diffusion problems. We first investigate the physical origin of universality in these systems, before comparing RG methods to other available analytic techniques, including exact solutions and Smoluchowski-type approximations. Starting from the microscopic reaction-diffusion master equation, we then pedagogically detail the mapping to a field theory for the single-species reaction kA → ℓA (ℓ < k). We employ this particularly simple but non-trivial system to introduce the field-theoretic RG tools, including the diagrammatic perturbation expansion, renormalization, and Callan-Symanzik RG flow equation. We demonstrate how these techniques permit the calculation of universal quantities such as density decay exponents and amplitudes via perturbative ǫ = d c − d expansions with respect to the upper critical dimension d c . With these basics established, we then provide an overview of more sophisticated applications to multiple species reactions, disorder effects, Lévy flights, persistence problems, and the influence of spatial boundaries. We also analyze field-theoretic approaches to nonequilibrium phase transitions separating active from absorbing states. We focus particularly on the generic directed percolation universality class, as well as on the most prominent exception to this class: evenoffspring branching and annihilating random walks. Finally, we summarize the state of the field and present our perspective on outstanding problems for the future.

show abstract

Section: The Origin Of Universality In Relaxational Reactionsmentioning

confidence: 99%

Applications of field-theoretic renormalization group methods to reaction–diffusion problems

Täuber¹,

Howard²,

Vollmayr-Lee³

2005

J. Phys. A: Math. Gen.

274

506

View full text Add to dashboard Cite

show abstract

“…The last decade witnessed the rapid growth of interest in reaction-diffusion models 1,2,3,4,5,6,7,8,9,10,11,12,13,14,15 . Such models are employed for a description of phenomena ranging from kinetics of chemical reactions to the evolution of biological populations.…”

Section: Introductionmentioning

confidence: 99%

Classification of phase transitions in reaction-diffusion models

2006

View full text Add to dashboard Cite

Equilibrium phase transitions are associated with rearrangements of minima of a (Lagrangian) potential. Treatment of nonequilibrium systems requires doubling of degrees of freedom, which may be often interpreted as a transition from the "coordinate" -to the "phase"-space representation. As a result, one has to deal with the Hamiltonian formulation of the field theory instead of the Lagrangian one. We suggest a classification scheme of phase transitions in reaction-diffusion models based on the topology of the phase portraits of corresponding Hamiltonians. In models with an absorbing state such a topology is fully determined by intersecting curves of zero "energy." We identify four families of topologically distinct classes of phase portraits stable upon renormalization group transformations.

show abstract

“…The calculation of Q 1 (r, t; R) for subdiffusive particles can be directly adapted from the corresponding calculation of this quantity for diffusive particles [17,18,19]. We introduce the probability density w(r ′ , t|r; R) that the particle is at location r ′ at time t if it started at position r at t = 0.…”

Section: Survival Probability: the Formalismmentioning

confidence: 99%

Subdiffusive target problem: Survival probability

Yuste

Lindenberg

2007

Phys. Rev. E

View full text Add to dashboard Cite

The asymptotic survival probability of a spherical target in the presence of a single subdiffusive trap or surrounded by a sea of subdiffusive traps in a continuous Euclidean medium is calculated. In one and two dimensions the survival probability of the target in the presence of a single trap decays to zero as a power law and as a power law with logarithmic correction, respectively. The target is thus reached with certainty, but it takes the trap an infinite time on average to do so. In dimensions higher than two a single trap may never reach the target and so the survival probability is finite and, in fact, does not depend on whether the traps move diffusively or subdiffusively. When the target is surrounded by a sea of traps, on the other hand, its survival probability decays as a stretched exponential in all dimensions (with a logarithmic correction in the exponent for d = 2). A trap will therefore reach the target with certainty, and will do so in a finite time. These results may be directly related to enzyme binding kinetics on DNA in the crowded cellular environment.

show abstract

Survival probability of a diffusing particle in the presence of Poisson-distributed mobile traps

Cited by 68 publications

References 26 publications

Applications of field-theoretic renormalization group methods to reaction–diffusion problems

Applications of field-theoretic renormalization group methods to reaction–diffusion problems

Classification of phase transitions in reaction-diffusion models

Subdiffusive target problem: Survival probability

Contact Info

Product

Resources

About