69 research outputs found
Hysteresis in one-dimensional reaction-diffusion systems
We introduce a simple nonequilibrium model for a driven diffusive system with
nonconservative reaction kinetics which exhibits ergodicity breaking and
hysteresis in one dimension. These phenomena can be understood through a
description of the dominant stochastic many-body dynamics in terms of an
equilibrium single-particle problem, viz. the random motion of a shock in an
effective potential. This picture also leads to the exact phase diagram of the
system and suggests a new generic mechanism for "freezing by heating".Comment: 4 Pages, 5 figure
Phase transitions and correlations in the bosonic pair contact process with diffusion: Exact results
The variance of the local density of the pair contact process with diffusion
(PCPD) is investigated in a bosonic description. At the critical point of the
absorbing phase transition (where the average particle number remains constant)
it is shown that for lattice dimension d>2 the variance exhibits a phase
transition: For high enough diffusion constants, it asymptotically approaches a
finite value, while for low diffusion constants the variance diverges
exponentially in time. This behavior appears also in the density correlation
function, implying that the correlation time is negative. Yet one has dynamical
scaling with a dynamical exponent calculated to be z=2.Comment: 20 pages, 5 figure
Spatial clustering of interacting bugs: Levy flights versus Gaussian jumps
A biological competition model where the individuals of the same species
perform a two-dimensional Markovian continuous-time random walk and undergo
reproduction and death is studied. The competition is introduced through the
assumption that the reproduction rate depends on the crowding in the
neighborhood. The spatial dynamics corresponds either to normal diffusion
characterized by Gaussian jumps or to superdiffusion characterized by L\'evy
flights. It is observed that in both cases periodic patterns occur for
appropriate parameters of the model, indicating that the general macroscopic
collective behavior of the system is more strongly influenced by the
competition for the resources than by the type of spatial dynamics. However,
some differences arise that are discussed.Comment: This version incorporates in the text the correction published as an
Erratum in Europhysics Letters (EPL) 95, 69902 (2011) [doi:
10.1209/0295-5075/95/69902
Scaling of the linear response in simple ageing systems without disorder
The time-dependent scaling of the thermoremanent and zero-field-cooled
susceptiblities in ferromagnetic spin systems undergoing ageing after a quench
to a temperature at or below criticality is studied. A recent debate on their
interpretation is resolved by showing that for systems with a short-ranged
equilibrium spin-spin correlator and above their roughening temperature, the
field-cooled susceptibility where
is related to the equilibrium magnetization and the exponent A is related to
the time-dependent scaling of the interface width between ordered domains. The
same effect also dominates the scaling of the zero-field-cooled susceptibility
, but does not enter into the thermoremanent
susceptibility . However, there may be large finite-time
corrections to the scaling of which are explicitly
derived and may be needed in order to extract reliable ageing exponents.
Consistency with the predictions of local scale invariance is confirmed in the
Glauber-Ising and spherical models.Comment: Latex2e, 14 pages, with 6 figure
Management of Febrile Neutropenia - a German Prospective Hospital Cost Analysis in Lymphoproliferative Disorders, Non-Small Cell Lung Cancer, and Primary Breast Cancer
Background: Febrile neutropenia/leukopenia (FN/FL) is the most frequent dose-limiting toxicity of myelosuppressive chemotherapy, but German data on economic consequences are limited. Patients and Methods: A prospective, multicentre, longitudinal, observational study was carried out to evaluate the occurrence of FN/FL and its impact on health resource utilization and costs in non-small cell lung cancer (NSCLC), lymphoproliferative disorder (LPD), and primary breast cancer (PBC) patients. Costs are presented from a hospital perspective. Results: A total of 325 consecutive patients (47% LPD, 37% NSCLC, 16% PBC; 46% women; 38% age >= 65 years) with 68 FN/FL episodes were evaluated. FN/FL occurred in 22% of the LPD patients, 8% of the NSCLC patients, and 27% of the PBC patients. 55 FN/FL episodes were associated with at least 1 hospital stay (LPD n = 34, NSCLC n = 10, PBC n = 11). Mean (median) cost per FN/FL episode requiring hospital care amounted to (sic) 3,950 ((sic) 2,355) and varied between (sic) 4,808 ((sic) 3,056) for LPD, (sic) 3,627 ((sic) 2,255) for NSCLC, and (sic) 1,827 ((sic) 1,969) for PBC patients. 12 FN/FL episodes (LPD n = 9, NSCLC n = 3) accounted for 60% of the total expenses. Main cost drivers were hospitalization and drugs (60 and 19% of the total costs). Conclusions: FN/FL treatment has economic relevance for hospitals. Costs vary between tumour types, being significantly higher for LPD compared to PBC patients. The impact of clinical characteristics on asymmetrically distributed costs needs further evaluation
Scaling of the magnetic linear response in phase-ordering kinetics
The scaling of the thermoremanent magnetization and of the dissipative part
of the non-equilibrium magnetic susceptibility is analysed as a function of the
waiting-time for a simple ferromagnet undergoing phase-ordering kinetics
after a quench into the ferromagnetically ordered phase. Their scaling forms
describe the cross-over between two power-law regimes governed by the
non-equilibrium exponents and , respectively. A relation
between , the dynamical exponent and the equilibrium exponent is
derived from scaling arguments. Explicit tests in the Glauber-Ising model and
the kinetic spherical model are presented.Comment: 7 pages, 2 figures included, needs epl.cls, version to appear in
Europhys. Let
Finite-dimensional representation of the quadratic algebra of a generalized coagulation-decoagulation model
The steady-state of a generalized coagulation-decoagulation model on a
one-dimensional lattice with reflecting boundaries is studied using a
matrix-product approach. It is shown that the quadratic algebra of the model
has a four-dimensional representation provided that some constraints on the
microscopic reaction rates are fulfilled. The dynamics of a product shock
measure with two shock fronts, generated by the Hamiltonian of this model, is
also studied. It turns out that the shock fronts move on the lattice as two
simple random walkers which repel each other provided that the same constraints
on the microscopic reaction rates are satisfied.Comment: Minor revision
Ergodicity breaking in one-dimensional reaction-diffusion systems
We investigate one-dimensional driven diffusive systems where particles may
also be created and annihilated in the bulk with sufficiently small rate. In an
open geometry, i.e., coupled to particle reservoirs at the two ends, these
systems can exhibit ergodicity breaking in the thermodynamic limit. The
triggering mechanism is the random motion of a shock in an effective potential.
Based on this physical picture we provide a simple condition for the existence
of a non-ergodic phase in the phase diagram of such systems. In the
thermodynamic limit this phase exhibits two or more stationary states. However,
for finite systems transitions between these states are possible. It is shown
that the mean lifetime of such a metastable state is exponentially large in
system-size. As an example the ASEP with the A0A--AAA reaction kinetics is
analyzed in detail. We present a detailed discussion of the phase diagram of
this particular model which indeed exhibits a phase with broken ergodicity. We
measure the lifetime of the metastable states with a Monte Carlo simulation in
order to confirm our analytical findings.Comment: 25 pages, 14 figures; minor alterations, typos correcte
Ageing without detailed balance: local scale invariance applied to two exactly solvable models
I consider ageing behaviour in two exactly solvable reaction-diffusion
systems. Ageing exponents and scaling functions are determined. I discuss in
particular a case in which the equality of two critical exponents, known from
systems with detailed balance, does not hold any more. Secondly it is shown
that the form of the scaling functions can be understood by symmetry
considerations.Comment: 6 pages, contribution to the summer school "Ageing and the Glass
Transition" held in Luxemburg in September 05. Published versio
Multi shocks in Reaction-diffusion models
It is shown, concerning equivalent classes, that on a one-dimensional lattice
with nearest neighbor interaction, there are only four independent models
possessing double-shocks. Evolution of the width of the double-shocks in
different models is investigated. Double-shocks may vanish, and the final state
is a state with no shock. There is a model for which at large times the average
width of double-shocks will become smaller. Although there may exist stationary
single-shocks in nearest neighbor reaction diffusion models, it is seen that in
none of these models, there exist any stationary double-shocks. Models
admitting multi-shocks are classified, and the large time behavior of
multi-shock solutions is also investigated.Comment: 17 pages, LaTeX2e, minor revisio
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