Fronts, propagating into an unstable state $\phi=0$, whose asymptotic speed
$v_{\text{as}}$ is equal to the linear spreading speed $v^*$ of infinitesimal
perturbations about that state (so-called pulled fronts) are very sensitive to
changes in the growth rate $f(\phi)$ for $\phi \ll 1$. It was recently found
that with a small cutoff, $f(\phi)=0$ for $\phi < \epsilon$, $v_{\text{as}}$
converges to $v^*$ very slowly from below, as $\ln^{-2} \epsilon$. Here we show
that with such a cutoff {\em and} a small enhancement of the growth rate for
small $\phi$ behind it, one can have $v_{\text{as}} > v^*$, {\em even} in the
limit $\epsilon \to 0$. The effect is confirmed in a stochastic lattice model
simulation where the growth rules for a few particles per site are accordingly
modified.Comment: 4 pages, 4 figures, to appear in Rapid Comm., Phys. Rev. 

D. Panja

D.A. Kessler

Debabrata Panja

E. Ben-Jacob

E. Brener

E. Brunet

H.P. Breuer

L. Pechenik

R. van Zon

U. Ebert

W. van Saarloos

Wim van Saarloos

English

arXiv

Fronts, propagating into an unstable state phi=0, whose asymptotic speed v(as) is equal to the linear spreading speed v* of infinitesimal perturbations about that state (so-called pulled fronts), are very sensitive to changes in the growth rate f(phi) for phiv*, even in the limit epsilon -->0. The effect is confirmed in a stochastic lattice model simulation where the growth rules for a few particles per site are accordingly modified.Theoretical Physic

Panja, D.

Saarloos, W. van

Leiden University Scholary Publications

RAPID COMMUNICATIONSPHYSICAL REVIEW E 66, 015206~R! ~2002!Fronts with a growth cutoff but with speed higher than the linear spreading speedDebabrata Panja and Wim van SaarloosInstituut-Lorentz, Universiteit Leiden, Postbus 9506, 2300 RA Leiden, The Netherlands~Received 5 April 2002; published 24 July 2002!Fronts, propagating into an unstable statef50, whose asymptotic speedvas is equal to the linear spreadingspeedv* of infinitesimal perturbations about that state~so-called pulled fronts!, are very sensitive to changesin the growth ratef (f) for f!1. It was recently found that with a small cutoff,(f)50 for f,«, vasconverges tov* very slowly from below, as ln22 «. Here we show that with such a cutoffand a smallenhancement of the growth rate for smallf behind it, one can havevas.v* , evenin the limit «→0. The effectis confirmed in a stochastic lattice model simulation where the growth rules for a few particles per site areaccordingly modified.DOI: 10.1103/PhysRevE.66.015206 PACS number~s!: 05.45.2a, 05.70.Ln, 47.20.Kyarsthwivisuldatheylfo.-ionicsn-stchetthityheicpeeyiontoofg,ththePulled fronts are those fronts that propagate into a lineunstable state, and whose asymptotic front speedvas equalsthe linear spreading speedv* of infinitesimal perturbationsabout the unstable state@1–3#. The name pulled front referto the picture that in the leading edge of these fronts,perturbation about the unstable state grows and spreadsspeedv* , while the rest of the front gets ‘‘pulled along’’ bythe leading edge. That this notion is not merely an intuitpicture but can be turned into a mathematically precanalysis is illustrated by the recent derivation of exact resfor the general power law convergence of the front speethe asymptotic valuev* @3#. Fronts that propagate intolinearly unstable state and whose asymptotic speedvas.v*are referred to as pushed, as it is the nonlinear growth inregion behind the leading edge that pushes their front spto higher values. If the state is not linearly unstable, thenv*is trivially zero; in such cases the front propagation is alwadominated by the nonlinear growth in the front region itseand hence fronts in this case are in a sense ‘‘pushed’’ toFor the fieldf(x,t), the dynamics of fronts that we consider in this paper is given by the usual nonlinear diffusequation]f]t5]2f]x21 f ~f!. ~1!In the standard case, the growth functionf (f) has the formf (f)5f2fn, with n.1. Equation~1! has two stationarystates for f(x,t): f(x,t)50 and f(x,t)51. Of these,f(x,t)51 is stable and f(x,t)50 is unstable. Theasymptotic speed of~pulled! fronts propagating fromf(x,t)51 into f(x,t)50 in Eq. ~1! is v* 52.The sensitivity of pulled fronts to the precise dynamfor small perturbations about the unstable state has recesurfaced in a remarkable way@4#. Often, in equations likeEq. ~1!, the fieldf(x,t) is the density of particles in a continuum description. If one then considers fronts in stochaparticle model versions of Eq.~1!, the linear growth term inf (f) implies that for small particle density, the rate at whinew particles are created is proportional to the density itsBrunet and Derrida@4# were the first to realize the fact thafor new particles to be created in any given realization,1063-651X/2002/66~1!/015206~4!/$20.00 66 0152lyeitheetstoeeds,tlyiclf.edensity must be at least one ‘‘quantum’’ of particle densstrong, and that this provides a natural lower cutoff for tgrowth that strongly affects the front speed. Indeed, to mimthis effect, they considered a deterministic front of the tyin Eq. ~1! with n53, and by hand introduced a cutoff of thype sketched in Fig. 1~a! in the growth function atf5«!1. In this paper, we denote their growth function bf (f,«)[@f2f3#Q(f2«), whereQ is the unit step func-tion. For small«, the asymptotic front speedvas(«) was thenfound to be@4#vas~«!.v* 2p2~ ln «!21•••. ~2!Brunet and Derrida subsequently identified« with 1/N,whereN is the average number of particles at the saturatstate of the front, corresponding to the stable statef(x,t)51 of the density field. The slow logarithmic convergencethe asymptotic front speed from below as a function ofN,implied by Eq.~2!, has been confirmed in various studiesstochastic lattice models@4–9#. Note that for f,«, thegrowth functionf vanishes, and as a result, strictly speakinFIG. 1. ~a! Shape of the functionf (f,«) used by Brunet andDerrida to study the effect of a finite particle cutoff in the growrate on the front speed.~b! The growth functionf (f,«,r ) ~thickline! we analyze in this paper. In both cases we have kept onlylinear term of f (f) to plot the graphs, since«!1, so that thenonlinear terms inf are much smaller than the linear terms.©2002 The American Physical Society06-1isfinnciovioNei-orheuauteerithnedon-ar-theti-edre-ion-di-ddsticingRAPID COMMUNICATIONSDEBABRATA PANJA AND WIM van SAARLOOS PHYSICAL REVIEW E66, 015206~R! ~2002!the statef50 is not linearly unstable; hence fronts in thmodel are always weakly pushed for any nonzero value o«@10#.In this paper, we demonstrate an even more surprisaspect of the sensitivity to small changes in the growth fution f of the ‘‘pulled’’ fronts that we have at«50: if f issufficiently enhancedin a range of of the order of«, theasymptotic front speedvas can become larger thanv* andnot converge tov* as «→0. For fluctuating fronts, this im-plies that if the stochastic growth rates for small occupatdensitiesni are somewhat enhanced over a linear beha;ni , then such stochastic fronts may move faster thanv*and never converge to their naive mean field limit for→`. This effect may be of relevance for the coarse-grainfield theory for diffusion-limited aggregation, as it is empircally known to be essential to modify the growth function fsmall cluster densities@11#.We now discuss our results first, and then summarize tderivation.To be specific, we consider the nonlinear diffusion eqtion ~1! with the growth function sketched in Fig. 1~b!,f ~f,«,r !5 f ~f,«! for f,« and5«/r for «<f<«/r , ~3!with r ,1. We show that while for any fixed value ofrlim«→0f ~f,«,r !5 f ~f!, ~4!the asymptotic front speedvas(«,r ) has the property thatlim«→0vas~«,r !5v* for r .r c ,lim«→0vas~«,r !.v* for r ,r c , ~5!wherer c511e2(v*222)v* 250.283 833 . . . . ~6!Hereafter, for simplicity, we denotevas(«,r ) simply by v.For «→0, the asymptotic speed at a given value ofr<r c inour model is given by the relationr 51v2F 11 12 2vAv24 21112vAv24213expS 2H v22 211 2vAv2421J D G , ~7!01520g-nrdir-from which the value ofr c , given by Eq.~6!, follows.These expressions show that the limits do not commfor r ,r c : taking the limit«→0 first in f yields a front speedv* but the limit vas(«→0,r ).v* . The reason is that forr,r c there is always a little tail of the front that runs fastthan v* and makesf nonzero. Oncef is nonzero, growthcontinues and the region behind it just has to follow it wthe same asymptotic speed.Our analysis is corroborated by numerical results obtaiby solving Eq.~1! forward in time, ~with Gaussian initialconditions!. The data forv vs r at «5231025 are shown assolid dots in Fig. 2. Note that forr ,r c , the solid dots fall ontop of our prediction~7! drawn with a solid line, while forr .r c , they systematically fall below the solid linev5v* .The reason for it is the difference between the rates of cvergence as«→0, which is illustrated in the inset of Fig. 2by means of the schematically drawn dashed line. Therows in the inset indicate the rate of convergence ofdashedr-v curve towards the limiting one, given by Eq.~7!.For r .r c , the convergence is; ln22 « as in the case for51, analyzed in Ref.@4#; but for r ,r c the convergence ismuch faster,«n21. This latter behavior is illustrated forr50.2 andn52,3 in Fig. 3—note the fine scale on the vercal axis.The fact that the effect of increasing asymptotic spewith decreasingr below r c is a real effect for stochasticfronts too is illustrated by the crosses in Fig. 2: these repsent the data for the average speed of fronts in a reactdiffusion systemX2X, for discreteX particles on a latticewith N5104 @12#, where the growth rates have been mofied when the number of particlesni on a lattice sitei is lessthan 1/r . In accord with the shape of the growth functionfillustrated in Fig. 1~b!, the rate at which particles are createat a lattice sitei with 1<ni,1/r particles is simply taken tobe the same as the rate forni51/r ~corresponding to theFIG. 2. Comparison of simulation data forvas(«,r ) with theanalytical prediction~7!, which is plotted as the solid line. The solidots represent the numerical data for Eq.~3! with «5231025 andn53. The crosses are the data points for fronts in the stochagrowth model described in the text. Inset: illustration of the leadorder rate of convergence of thevas(«,r ) curve to the«→0 limit,by means of the schematic dashed curve.6-2s-yestcathathea-ou-stetlyeftiseofsfen-oticRAPID COMMUNICATIONSFRONTS WITH A GROWTH CUTOFF BUT WITH SPEED . . . PHYSICAL REVIEW E66, 015206~R! ~2002!integral values 1/r 51, 2, 3, 4, 5, 7, and 10, due to the dicreteness of particles!. As one can see from Fig. 2, alreadwhen r 50.5, i.e., when only the growth rate at lattice sitwith one particle is increased by a factor 2, the asymptogrowth speed is above the valuev* 52.In the remainder of this paper, we derive the analytiresults for the nonlinear diffusion equation with the growfunction ~3!. Our analysis is based on the following observtion: for «50, it is well known that the nonlinear diffusionequation allows a continuous family of front solutions wiv>v* . When such fronts solutions are parametrized by thvelocity v, and when the growth rate is modified to allowtransition to a ‘‘pushed’’ front with velocityv†, it is alsoknown @2,3# that solutions withv,v† are unstable to a localized mode. In our analysis, we therefore consider a frwith a given fixed velocityv and, for small«, determinewhen upon decreasingr a localized mode of the stabilityoperator crosses the eigenvalue zero. In the limit«→0 thismarks the selected pushed front in ther -v diagram.To carry out the linear stability analysis of the front soltion, it is convenient to follow the standard route of tranforming the linear eigenvalue equation into a Schro¨dingereigenvalue problem@1,3#. We consider a functionf(x,t),which is infinitesimally different from the asymptotic fronsolution fas(j) in the comoving framej5x2vt, i.e.,f(x,t)5fas(j)1h(j,t). Upon linearizing Eq.~1! in the co-moving frame, one finds that the functionh(j,t) obeys thefollowing equation:]h]t5v]h]j1]2h]j21d f ~f!df Uf5fash. ~8!Since this equation is linear inh, the question of stability canbe answered by studying the spectrum of the temporal eigvalues. To this end, we expressh(j,t) ash~j,t !5e2Ete2vj/2cE~j!, ~9!FIG. 3. Numerical data forvas(«,r ) as a function of« for n52 and 3, atr 50.2. The graph demonstrates the insensitivity ovto « for small values of« ~note the fine scale on the vertical axis!,as well as the convergence as«n21 to its «→0 value.2.246, givenby Eq. ~7!, for two different values ofn.01520icl-irnt-n-which converts Eq.~8! to a one-dimensional Schro¨dingerequation for a particle in a potential with\2/2m51,F2 d2dj2 1 v24 2 d f ~f!df Uf5fasGcE~j!5EcE~j!. ~10!In Eq. ~10!, the quantityV~j!5Fv24 2 d f ~f!df Uf5fasGplays the role of the potential. It is easily obtained explicifrom the expression~3! for f (f,«,r ) asV~j!5Fv24 211nfasn21~j!GQ~j12j!1 v24Q~j2j1!21rvd~j2j0!, ~11!wheref(j0)5« andf(j1)5«/r . The form of the potentialfor v.v* and small« is sketched in Fig. 4. Keep in mindthat fas(j) is a monotonically increasing function from«/rat j1 towards the left, and thatfas(j→2`)51. As a result,in Fig. 4,V(j) also increases monotonically towards the lfor j,j1. On the right ofj1 , V(j) is constant atv2/4, and atj0, there is an attractived-function potential of strength(rv)21 @13#. The crucial feature for the stability analysbelow is the fact thatV(j) stays remarkably flat at a valu2«/r over a distance (j12j2).u ln «/ru @10#, and on the leftof j2, it increases to the value ofv2/41n21, over a distanceof order unity.If there exist negative eigenvalues of the Schro¨dingerequation~10!, then according to Eq.~9!, h(j,t) grows intime in the comoving frame, i.e., the front solutionfas(j) isunstable. For our purpose, therefore, we look for the valuer at which there is a bound state of Eq.~10! with eigenvalueE, such thatE→02 for the potential sketched in Fig. 4. Thiis a problem in elementary quantum mechanics. For«→0,FIG. 4. The potentialV(j) for v>v* and infinitesimally small« in the Schro¨dinger operator that determines the temporal eigvalues of the stability analysis.j2 marks the position of the regionof finite width where the potential crosses over from the asymptvalue on the left wherefas'1 to the value in the well wherefas!1, j1 the position of the step andj0 the position of thed-functionterm in the potential.6-3r-ttoefefefisdssemen-e iss ofthe-fofanduaren-RAPID COMMUNICATIONSDEBABRATA PANJA AND WIM van SAARLOOS PHYSICAL REVIEW E66, 015206~R! ~2002!the potentialV(j) is essentially constant in the left neighbohood ofj1, and hence forv.v* andE→02,cE(j) can bewritten ascE~j!5A2el1(j2j1) for j<j1 ,5Ael2(j2j0)1Bel2(j02j) for j1<j<j0 ,5A2e2l2(j2j0) for j.j0 ,~12!wherel15Av2/421 andl25v/2. The functioncE(j) mustbe continuous atj1 and j0, while its slope is continuous aj1, but not atj0. Matching of these boundary conditionsdetermine the value ofr, where the bound state eigenvalueEcrosses zero, also requires an expression for the distancj02j1. To this end, we divide the range off values between 0and 1 into the three regions marked in Fig. 4:~i! region I,where fas,«, ~ii ! region II, where«<fas,«/r , and ~iii !region III, where fas>«/r . In the comoving frame, theasymptotic shapefas(j) of the front is the solution of thedifferential equationfas9 1vfas8 1 f (fas,«,r )50, where aprime denotes a derivative with respect toj. The solutions offas(j) in the regions I and II that satisfy the continuity ofas(j) andfas8 (j) are, respectively, given byfas~j!5«e2v(j2j0) andfas~j!5F«2 «rv2Gev(j02j)1 «~j02j!rv 1 «rv2 . ~13!The length j02j1 of region II is obtained by equatingfas(j1) from the second line of Eq.~13! to «/r . After divid-ing out a factor of«/r , this condition becomesF r 2 1v2Gev(j02j1)1 j02j1v 1 1v2 51. ~14!Thereafter, using Eqs.~12! and ~13!, one arrives at Eq.~7!.The above analysis yields the relation betweenv and thecritical value ofr in the limit «→0. The convergence with«,i.e., the rate of approach with« of the dashed curve to thsolid one in Fig. 2, can be obtained by considering the efgeet01520ctof the nfasn21(j) term of V(j) on the eigenfunctions andeigenvalues. Forv.v* , this term is simply a correction oorder «n21 to the finite bottom value of the potential. Thterm can be included perturbatively, and accordingly it leato a shift of order«n21 in the critical value ofr. As Fig. 3illustrates, this prediction is confirmed numerically. The cav5v* calls for a more detailed analysis, since the bottovalue of the potential vanishes in the limit«→0. In thiscase, it is known @3,4# that fas(j);(Cj1D)e2j, soV(j).n(«/r )n21(j/j1)n21e(n21)(j12j) in the leading orderof «. In dominant order, we need to keep only the expontial behavior, and the solution ofcE(j) is then given by theBessel functionA2K0(2An«n21e2(n21)(j12j)/r n21) in theleft neighborhood of j1. The u ln21«u scaling for theasymptotic approach of the dashed curve to the solid onthen easily obtained once the boundary conditions atj1 andj0 are matched using Eq.~14!.The logarithmic convergence ofv to v* from below forr .r c can be understood from an argument along the linethat for r 51 @4#. For v,v* , the front profilefas(j) in re-gion III is of the formfas(j);C sin@k(j2j2)1b#e2j. For r51, region II is absent; in that case, the matching toprofile in region I and the divergence of the widthj02j2.u ln «u implies k.pu ln «u21. For r c,r ,1, the matching toregion II will change the prefactor, butk will still scale asu ln «u21 because the width of region III still diverges logarithmically. As for r c<r ,1, this translates into a scaling ov* 2v as u ln «u22, with a prefactor that depends onr. Notethat this scaling is nicely consistent with the convergencethe r -v curve towards the point (r c ,v* ) from the left, due tothe fact that the slope of this curve vanishes at this point,the convergence from below to this point scales as the sqof the convergence from the left.We finally end this paper with the note that if the~nonne-gative! growth rate is bounded from above byf (f,«) in theinterval f<«/r , but is equal tof (f,«) for f.«/r , then as«→0, the asymptotic front speed converges tov* with thesamelogarithmic convergence of Eq.~2! for any r. It simplyfollows from the inequality vas(«/r ),v,vas(«), wherevas(«) is given by Eq.~2!.D.P. wishes to acknowledge financial support from ‘‘Fudamenteel Onderzoek der Materie’’~FOM!.-t@1# E. Ben-Jacob, H.R. Brand, G. Dee, L. Kramer, and J.S. LanPhysica D14, 348 ~1985!.@2# W. van Saarloos, Phys. Rev. A39, 6367~1989!.@3# U. Ebert and W. van Saarloos, Physica D146, 1 ~2000!.@4# E. Brunet and B. Derrida, Phys. Rev. E56, 2597~1997!.@5# H.P. Breuer, W. Huber, and F. Petruccione, Physica D73, 259~1994!.@6# R. van Zon, H. van Beijeren, and Ch. Dellago, Phys. Rev. L80, 2035~1998!.@7# D.A. Kessler, Z. Ner, and L.M. Sander, Phys. Rev. E58, 107~1998!.@8# L. Pechenik and H. Levine, Phys. Rev. E59, 3893~1999!.r,t.@9# D. Panja and W. van Saarloos, e-print cond-mat/0109528.@10# D. Panja and W. van Saarloos, Phys. Rev. E65, 057202~2002!.@11# E. Brener, H. Levine, and Y. Tu, Phys. Rev. Lett.66, 1978~1991!.@12# This corresponds tog̃51 andN5104 for the model consid-ered in Ref.@9#.@13# Thed-function in Eq.~11! appears from the functional derivative of f in V, since there is a discontinuity of magnitude« inf (fas,«,r ) at fas5«. This discontinuity contributes an amounequal to«r 21dQ(fas2«)/dfas5«@r ufas8 (j0)u#21d(j2j0) toV(j). As fas8 5«r according to Eq.~13!, the prefactor 1/(rv).6-4

Fronts with a growth cutoff but with speed higher than the linear spreading speed

van Saarloos, W.

NARCIS 

Fronts with a Growth Cutoff but Speed Higher than linear spreading speed

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Fronts, propagating into an unstable state phi=0, whose asymptotic speed v(as) is equal to the linear spreading speed v* of infinitesimal perturbations about that state (so-called pulled fronts), are very sensitive to changes in the growth rate f(phi) for phiv*, even in the limit epsilon -->0. The effect is confirmed in a stochastic lattice model simulation where the growth rules for a few particles per site are accordingly modified

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