Emergent Hydrodynamics in an Exclusion Process with Long-Range Interactions
Pith reviewed 2026-05-21 23:12 UTC · model grok-4.3
The pith
A lattice gas with long-range Coulomb interactions shows non-local hydrodynamics where the current is a sine times the hyperbolic sine of the Hilbert transform of the density.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
The SDEP displays ballistic scaling and non-local hydrodynamics governed by the continuity equation partial_t rho + partial_x j[rho] = 0, with the current j[rho] = (1/pi) sin(pi rho(x,t)) sinh(pi H rho(x,t)) where H denotes the Hilbert transform. This one-field non-local description is equivalent to a local two-field complex Hopf system for finite particle density.
What carries the argument
The non-local current functional j[rho] that multiplies the sine of pi times the density by the hyperbolic sine of pi times the Hilbert transform of the density, which encodes the long-range interactions at the macroscopic level.
If this is right
- The melting dynamics of single and double block initial states admit closed evolution formulas that produce explicit limit shapes and arctic curves.
- The non-local one-field hydrodynamic description is equivalent to a local two-field complex Hopf system at finite density.
- Large-scale Monte Carlo simulations confirm the predicted shapes arising from the non-local current.
- The model provides a concrete example of emergent non-local hydrodynamics driven by long-range interactions in an exclusion process.
Where Pith is reading between the lines
- The appearance of the Hilbert transform suggests that analogous non-local currents could arise in other one-dimensional systems with inverse-square or long-range potentials.
- A direct hydrodynamic limit derivation from the microscopic rates, independent of the quantum mapping, would provide an independent check of the conjecture.
- The equivalence to the complex Hopf system opens the possibility of linking the dynamics to integrable hierarchies or complex-fluid models in neighboring contexts.
Load-bearing premise
The exact microscopic mapping to the XX chain via the Doob transform produces the specific non-local macroscopic current equation at large scales.
What would settle it
High-resolution Monte Carlo simulations of the melting of a double-block initial state on large lattices would show whether the observed arctic curve matches the one predicted by the hydrodynamic equation.
Figures
read the original abstract
We study the symmetric Dyson exclusion process (SDEP) - a lattice gas with exclusion and long-range, Coulomb-type interactions that emerge both as the maximal-activity limit of the symmetric exclusion process and as a discrete version of Dyson's Brownian motion on the unitary group. Exploiting an exact ground-state (Doob) transform, we map the stochastic generator of the SDEP onto the spin-$1/2$ XX quantum chain, which in turn admits a free-fermion representation. At macroscopic scales we conjecture that the SDEP displays ballistic (Eulerian) scaling and non-local hydrodynamics governed by the equation $\partial_t \rho+\partial_x j[\rho]=0$ with $j[\rho]=(1/\pi)\sin(\pi\rho(x,t))\sinh(\pi\mathcal{H}\rho(x,t))$, where $\mathcal{H}$ is the Hilbert transform, making the current a genuinely non-local functional of the density. This non-local one-field description is equivalent to a local two-field "complex Hopf" system for finite particle density. Closed evolution formulas allow us to solve the melting of single and double block initial states, producing limit shapes and arctic curves that agree with large-scale Monte Carlo simulations. The model thus offers a tractable example of emergent non-local hydrodynamics driven by long-range interactions.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The paper introduces the symmetric Dyson exclusion process (SDEP), a lattice gas with exclusion and long-range Coulomb-type interactions. It establishes an exact mapping of the stochastic generator to the spin-1/2 XX quantum chain via the Doob transform, which admits a free-fermion representation. At macroscopic scales the authors conjecture ballistic Eulerian scaling with non-local hydrodynamics governed by the continuity equation ∂_t ρ + ∂_x j[ρ] = 0, where the current is the non-local functional j[ρ] = (1/π) sin(πρ) sinh(π ℋ ρ) and ℋ denotes the Hilbert transform. Closed-form solutions are derived for the melting of single- and double-block initial states, producing limit shapes and arctic curves that are shown to agree with large-scale Monte Carlo simulations.
Significance. If the conjectured hydrodynamic equation is valid, the work supplies a tractable, exactly mappable example of emergent non-local hydrodynamics driven by long-range interactions. The exact Doob transform to the XX chain and the free-fermion representation constitute clear technical strengths, as do the closed evolution formulas that permit explicit limit-shape calculations and direct comparison with simulations.
major comments (1)
- [hydrodynamic conjecture paragraph] The specific non-local current j[ρ] = (1/π) sin(πρ) sinh(π ℋ ρ) is introduced only as a conjecture (abstract and the paragraph immediately following the XX-chain mapping). No intermediate scaling analysis, mode expansion, or explicit limit from the microscopic generator (or from the fermionic dispersion of the XX chain) is supplied to derive the Hilbert-transform non-locality in the one-field current. This step is load-bearing for the central claim of emergent non-local hydrodynamics.
minor comments (1)
- The equivalence between the non-local one-field description and the local two-field complex Hopf system is stated but not derived in detail; a short appendix sketching the transformation would improve clarity.
Simulated Author's Rebuttal
We thank the referee for the careful reading and for recognizing the technical strengths of the exact Doob transform to the XX chain and the free-fermion representation. We address the single major comment below.
read point-by-point responses
-
Referee: The specific non-local current j[ρ] = (1/π) sin(πρ) sinh(π ℋ ρ) is introduced only as a conjecture (abstract and the paragraph immediately following the XX-chain mapping). No intermediate scaling analysis, mode expansion, or explicit limit from the microscopic generator (or from the fermionic dispersion of the XX chain) is supplied to derive the Hilbert-transform non-locality in the one-field current. This step is load-bearing for the central claim of emergent non-local hydrodynamics.
Authors: We agree that the hydrodynamic equation is introduced as a conjecture without a complete scaling-limit derivation or mode expansion from the microscopic generator. The form of the current is motivated by the long-range Coulomb interactions of the original SDEP and by the structure that emerges from the exact mapping to the XX chain: the free-fermion representation of the XX Hamiltonian naturally produces non-local functionals involving the Hilbert transform when the continuum limit is taken for the conserved density. While we do not supply the full intermediate analysis in the present manuscript, the conjecture is strongly supported by the closed-form solutions for single- and double-block initial states, which generate explicit limit shapes and arctic curves that agree quantitatively with large-scale Monte Carlo simulations. In the revised version we will expand the discussion immediately after the XX-chain mapping to include a heuristic argument based on the fermionic dispersion and the expected non-local current arising from the long-range interactions, while making the conjectural status more explicit. revision: partial
Circularity Check
Exact Doob mapping to XX chain supports independent conjecture for non-local hydrodynamics
full rationale
The paper establishes an exact microscopic mapping of the SDEP generator to the XX quantum chain via Doob transform, which is independent of the macroscopic description. The specific non-local current j[ρ] = (1/π) sin(πρ) sinh(π ℋ ρ) is introduced explicitly as a conjecture for the Eulerian scaling limit rather than derived, fitted, or defined in terms of itself. No self-citations, ansatzes smuggled via prior work, or reductions of the central PDE to input data by construction are present in the provided derivation chain. The subsequent closed-form solutions for block initial conditions and their agreement with Monte Carlo simulations provide external checks, rendering the overall chain self-contained.
Axiom & Free-Parameter Ledger
axioms (2)
- domain assumption The symmetric Dyson exclusion process admits an exact ground-state (Doob) transform mapping its stochastic generator onto the spin-1/2 XX quantum chain.
- ad hoc to paper At macroscopic scales the SDEP displays ballistic scaling and is governed by the non-local hydrodynamic equation with current involving the Hilbert transform.
Lean theorems connected to this paper
-
IndisputableMonolith/Cost/FunctionalEquation.leanwashburn_uniqueness_aczel unclear?
unclearRelation between the paper passage and the cited Recognition theorem.
At macroscopic scales we conjecture that the SDEP displays ballistic (Eulerian) scaling and non-local hydrodynamics governed by the equation ∂_t ρ + ∂_x j[ρ]=0 with j[ρ]=(1/π)sin(πρ(x,t)) sinh(π H ρ(x,t)), where H is the Hilbert transform
-
IndisputableMonolith/Foundation/AlexanderDuality.leanalexander_duality_circle_linking unclear?
unclearRelation between the paper passage and the cited Recognition theorem.
Exploiting an exact ground-state (Doob) transform, we map the stochastic generator of the SDEP onto the spin-1/2 XX quantum chain
What do these tags mean?
- matches
- The paper's claim is directly supported by a theorem in the formal canon.
- supports
- The theorem supports part of the paper's argument, but the paper may add assumptions or extra steps.
- extends
- The paper goes beyond the formal theorem; the theorem is a base layer rather than the whole result.
- uses
- The paper appears to rely on the theorem as machinery.
- contradicts
- The paper's claim conflicts with a theorem or certificate in the canon.
- unclear
- Pith found a possible connection, but the passage is too broad, indirect, or ambiguous to say the theorem truly supports the claim.
Forward citations
Cited by 1 Pith paper
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Schr\"odinger-invariance in non-equilibrium critical dynamics
Scaling functions for correlators in non-equilibrium critical dynamics with z=2 are predicted from a new time-dependent non-equilibrium Schrödinger algebra representation and confirmed in exactly solvable ageing models.
Reference graph
Works this paper leans on
-
[1]
Large Scale Dynamics of Interacting Particles
H. Spohn, Large Scale Dynamics of Interacting Particles , Theoretical and Math- ematical Physics. Springer, Berlin \slash Heidelberg, doi:10.1007/978-3-642-84371-6 (1991)
-
[2]
C. Kipnis and C. Landim, Scaling Limits of Interacting Particle Systems , vol. 320 of Grundlehren der mathematischen Wissenschaften , Springer, Berlin \slash Heidelberg, doi:10.1007/978-3-662-03752-2 (1999)
-
[3]
T. M. Liggett, Continuous Time Markov Processes: An Introduction , vol. 113 of Graduate Studies in Mathematics , American Mathematical Society, Providence, RI, doi:10.1090/gsm/113 (2010)
-
[4]
P. L. Garrido, J. L. Lebowitz, C. Maes and H. Spohn, Long-range correlations for con- servative dynamics, Physical Review A 42(4) (1990), doi:10.1103/PhysRevA.42.1954
-
[5]
G. L. Eyink, J. L. Lebowitz and H. Spohn, Lattice gas models in contact with stochas- tic reservoirs: Local equilibrium and relaxation to the steady state , Communications in Mathematical Physics 140, 119 (1991), doi:10.1007/BF02099293
-
[6]
C. Bahadoran, Hydrodynamics and Hydrostatics for a Class of Asymmetric Particle Systems with Open Boundaries , Communications in Mathematical Physics 310(1) (2012), doi:10.1007/s00220-011-1395-6
-
[7]
P. Gon¸ calves,Hydrodynamics for Symmetric Exclusion in Contact with Reservoirs , In Stochastic Dynamics Out of Equilibrium , vol. 282 of Springer Proceedings in Math- ematics & Statistics . Springer, Cham (2019)
work page 2019
-
[8]
T. M. Liggett, Long-range exclusion processes, Annals of Probability 8, 861 (1980), doi:10.1214/aop/1176994618
-
[9]
E. D. Andjel and H. Guiol, Long-range exclusion processes, genera- tor and invariant measures , Annals of Probability 33(6), 2314 (2005), doi:10.1214/009117905000000486
-
[10]
P. Gon¸ calves and M. Jara, Density fluctuations for exclusion processes with long jumps, Probability Theory and Related Fields 170, 311 (2018), doi:10.1007/s00440- 017-0758-0
-
[11]
V. Belitsky, N. P. N. Ngoc and G. M. Sch¨ utz, Asymmetric exclusion process with long-range interactions, doi:10.48550/arXiv.2409.05017 (2024), 2409.05017. 20 SciPost Physics Submission
-
[12]
G. M. Sch¨ utz,Exactly Solvable Models for Many-Body Systems Far from Equilibrium, In Phase Transitions and Critical Phenomena , vol. 19. Academic Press, London, doi:10.1016/S1062-7901(01)80015-X (2001)
-
[13]
F. C. Alcaraz, M. Droz, M. Henkel and V. Rittenberg, Reaction–Diffusion Pro- cesses, Critical Dynamics and Quantum Chains , Annals of Physics 230 (1994), doi:10.1006/aphy.1994.1026
-
[14]
H. Spohn, Bosonization, vicinal surfaces, and hydrodynamic fluctuation theory, Phys- ical Review E 60(5) (1999), doi:10.1103/PhysRevE.60.6411
-
[16]
G. M. Sch¨ utz, The Space–Time Structure of Extreme Current and Activity Events in the ASEP , In Nonlinear Mathematical Physics and Natural Hazards , vol. 163 of Springer Proceedings in Physics, pp. 13–28. Springer, Cham, doi:10.1007/978-3-319- 14328-6 2 (2015)
-
[17]
R. L. Jack and P. Sollich, Large deviations and ensembles of trajectories in stochastic models , Progress of Theoretical Physics Supplement 184 (2010), doi:10.1143/PTPS.184.304
-
[18]
R. Chetrite and H. Touchette, Nonequilibrium Markov processes conditioned on large deviations, Annales Henri Poincar´ e16(9) (2015), doi:10.1007/s00023-014-0375-8
-
[19]
F. J. Dyson, A Brownian-Motion Model for the Eigenvalues of a Random Matrix , Journal of Mathematical Physics 3 (1962), doi:10.1063/1.1703862
-
[20]
F. Calogero, Ground State of a One-Dimensional N-Body System , Journal of Math- ematical Physics 10 (1969), doi:10.1063/1.1664821
-
[21]
Sutherland, Exact Results for a Quantum Many-Body Problem in One Dimension
B. Sutherland, Exact Results for a Quantum Many-Body Problem in One Dimension. II, Physical Review A 5 (1972), doi:10.1103/PhysRevA.5.1372
-
[22]
A. G. Abanov, E. Bettelheim and P. Wiegmann, Integrable hydrodynamics of Calogero–Sutherland model: bidirectional Benjamin–Ono equation, Journal of Physics A: Mathematical and Theoretical 42 (2009), doi:10.1088/1751-8113/42/13/135201
-
[23]
I. M. Krichever, Elliptic solutions of nonlinear integrable equations and related topics, Acta Applicandae Mathematicae 36 (1994), doi:10.1007/BF01001540
-
[24]
V. Lecomte, J. P. Garrahan and F. v. Wijland, Inactive dynamical phase of a symmet- ric exclusion process on a ring , Journal of Physics A: Mathematical and Theoretical 45 (2012), doi:10.1088/1751-8113/45/17/175001
-
[25]
R. L. Jack, I. R. Thompson and P. Sollich, Hyperuniformity and Phase Separation in Biased Ensembles of Trajectories for Diffusive Systems , Physical Review Letters 114 (2015), doi:10.1103/PhysRevLett.114.060601
-
[26]
Conformal invariance in driven diffusive systems at high currents
D. Karevski and G. M. Sch¨ utz, Conformal invariance in driven dif- fusive systems at high currents , Physical Review Letters 118 (2017), doi:10.1103/PhysRevLett.118.030601, eprint: arXiv:1606.04248. 21 SciPost Physics Submission
work page internal anchor Pith review Pith/arXiv arXiv doi:10.1103/physrevlett.118.030601 2017
-
[27]
Interaction of Markov processes
F. Spitzer, Interaction of Markov processes , Advances in Mathematics 5(2) (1970), doi:10.1016/0001-8708(70)90034-4
-
[28]
T. M. Liggett, Stochastic Interacting Systems: Contact, Voter and Exclusion Pro- cesses, vol. 324 of Grundlehren der mathematischen Wissenschaften , Springer, Berlin/Heidelberg, doi:10.1007/978-3-662-03990-8 (1999)
-
[29]
E. Lieb, T. Schultz and D. Mattis, Two Soluble Models of an Antiferromagnetic Chain, Annals of Physics 16, 407 (1961), doi:10.1016/0003-4916(61)90115-4
-
[30]
T. Niemeijer, Some exact calculations on a chain of spins 1/2 , Physica 36 (1967), doi:10.1016/0031-8914(67)90235-2
-
[31]
I. Bouchoule, B. Doyon and J. Dubail, The effect of atom losses on the distribu- tion of rapidities in the one-dimensional Bose gas , SciPost Physics 9(4) (2020), doi:10.21468/SciPostPhys.9.4.044
-
[32]
A. G. Abanov, Hydrodynamics of correlated systems , In ´E. Br´ ezin, V. Kazakov, D. Serban, P. Wiegmann and A. Zabrodin, eds., Applications of Random Matrices in Physics, vol. 221 of NATO Science Series II: Mathematics, Physics and Chemistry , pp. 139–161. Springer, Dordrecht, doi:10.1007/1-4020-4531-X 5 (2006)
-
[33]
T. Antal, Z. R´ acz, A. R´ akos and G. M. Sch¨ utz,Transport in the XX chain at zero temperature: Emergence of flat magnetization profiles , Physical Review E 59 (1999), doi:10.1103/PhysRevE.59.4912
-
[34]
E. Bettelheim, A. G. Abanov and P. Wiegmann, Orthogonality catastrophe and shock waves in a nonequilibrium Fermi gas , Physical Review Letters 97, 246402 (2006), doi:10.1103/PhysRevLett.97.246402
-
[35]
E. Bettelheim and L. Glazman, Quantum ripples over a semiclassical shock , Physical Review Letters 109 (2012), doi:10.1103/PhysRevLett.109.260602
-
[36]
P. Ruggiero, Y. Brun and J. Dubail, Conformal field theory on top of a breathing one-dimensional gas of hard core bosons , SciPost Physics 6(4) (2019), doi:10.21468/SciPostPhys.6.4.051
-
[37]
S. Scopa et al., Exact entanglement growth of a one-dimensional hard-core quantum gas during a free expansion , Journal of Physics A: Mathematical and Theoretical 54(40) (2021), doi:10.1088/1751-8121/ac20ee
-
[38]
P.-G. d. Gennes, Soluble model for fibrous structures with steric constraints , Journal of Chemical Physics 48(5) (1968), doi:10.1063/1.1669420
-
[39]
R. Kenyon and A. Okounkov, Limit shapes and the complex burgers equation , Acta Mathematica 199(2), 263 (2007), doi:10.1007/s11511-007-0021-0
-
[40]
N. Allegra, J. Dubail, J.-M. St´ ephan and J. Viti, Inhomogeneous field theory inside the arctic circle, Journal of Statistical Mechanics: Theory and Experiment (5) (2016), doi:10.1088/1742-5468/2016/05/053108
-
[41]
Gorin, Lectures on Random Lozenge Tilings , vol
V. Gorin, Lectures on Random Lozenge Tilings , vol. 193 of Cambridge Studies in Advanced Mathematics , Cambridge University Press, Cambridge, doi:10.1017/9781108921183 (2021). 22 SciPost Physics Submission
-
[42]
A. M. Matytsin, Large-\emphN limit of the Itzykson–Zuber integral , Nuclear Physics B 411 (1994), doi:10.1016/0550-3213(94)90471-5
-
[43]
V. E. Korepin, A. G. Izergin and N. M. Bogoliubov, Quantum Inverse Scattering Method and Correlation Functions, Cambridge Monographs on Mathematical Physics. Cambridge University Press, Cambridge, doi:10.1017/CBO9780511628832 (1993)
-
[44]
A. G. Abanov and F. Franchini, Emptiness formation probability for the anisotropic XY spin chain in a magnetic field , Physics Letters A 316(5), 342 (2003), doi:10.1016/j.physleta.2003.07.009
-
[45]
F. Franchini and A. G. Abanov, Asymptotics of Toeplitz determinants and the empti- ness formation probability for the XY spin chain , Journal of Physics A: Mathematical and General 38(23), 5069 (2005), doi:10.1088/0305-4470/38/23/002
-
[46]
J.-M. St´ ephan,Emptiness formation probability, toeplitz determinants, and conformal field theory, Journal of Statistical Mechanics: Theory and Experiment p. P05010 (2014), doi:10.1088/1742-5468/2014/05/P05010
-
[47]
J. S. Pallister, S. H. Pickering, D. M. Gangardt and A. G. Abanov, Phase transitions in full counting statistics of free fermions and directed polymers , Physical Review Research 7(2) (2025), doi:10.1103/PhysRevResearch.7.L022008
-
[48]
D. G. Crowdy, Viscous Marangoni flow driven by insoluble surfactant and the complex Burgers equation , SIAM Journal on Applied Mathematics 81(6) (2021), doi:10.1137/21M1400316
-
[49]
S. Andraus and M. Katori, Characterizations of the hydrodynamic limit of the Dyson model, Published: arXiv:1602.00449 (2016)
-
[50]
R. Dandekar, P. L. Krapivsky and K. Mallick, Dynamical fluctuations in the Riesz gas, Physical Review E 107(4) (2023), doi:10.1103/PhysRevE.107.044129
-
[51]
R. Dandekar, P. L. Krapivsky and K. Mallick, Current fluctuations in the Dyson gas , Physical Review E 110(6) (2024), doi:10.1103/PhysRevE.110.064153
-
[52]
P. L. Krapivsky and K. Mallick, Expansion into the vacuum of stochas- tic gases with long-range interactions , Physical Review E 111(6) (2025), doi:10.1103/PhysRevE.111.064109
-
[53]
C. Rottman and M. Wortis, Statistical mechanics of equilibrium crystal shapes: interfacial phase diagrams and phase transitions , Physics Reports 103 (1984), doi:10.1016/0370-1573(84)90066-8
-
[54]
B. Nienhuis, H. J. Hilhorst and H. W. J. Bl¨ ote, Triangular SOS models and cubic-crystal shapes , Journal of Physics A: Mathematical and General 17 (1984), doi:10.1088/0305-4470/17/18/025
-
[55]
Random Domino Tilings and the Arctic Circle Theorem
W. Jockusch, J. Propp and P. Shor, Random domino tilings and the arctic circle theorem, doi:10.48550/arXiv.math/9801068 (1998)
work page internal anchor Pith review Pith/arXiv arXiv doi:10.48550/arxiv.math/9801068 1998
-
[56]
N. Elkies, G. Kuperberg, M. Larsen and J. Propp, Alternating-sign matrices and domino tilings. Part I , Journal of Algebraic Combinatorics 1, 111 (1992), doi:10.1023/A:1022420103267. 23 SciPost Physics Submission
-
[57]
N. Elkies, G. Kuperberg, M. Larsen and J. Propp, Alternating-sign matrices and domino tilings. Part II , Journal of Algebraic Combinatorics 1, 219 (1992), doi:10.1023/A:1022483817303
-
[58]
B. F. Logan and L. A. Shepp, A variational problem for random Young tableaux , Advances in Mathematics 26 (1977), doi:10.1016/0001-8708(77)90030-5
-
[59]
V. Korepin and P. Zinn-Justin, Thermodynamic limit of the six-vertex model with domain wall boundary conditions , Journal of Physics A: Mathematical and General 33 (2000), doi:10.1088/0305-4470/33/40/304
-
[60]
F. Colomo and A. G. Pronko, The arctic circle revisited , In Integrable Sys- tems and Random Matrices: In Honor of Percy Deift , vol. 458 of Contempo- rary Mathematics , pp. 361–376. American Mathematical Society, Providence, RI, doi:10.1090/conm/458/08947 (2008)
-
[61]
The 6-vertex model with fixed boundary conditions
K. Palamarchuk and N. Reshetikhin, The 6-vertex model with fixed boundary condi- tions, doi:10.48550/arXiv.1010.5011 (2010), 1010.5011
work page internal anchor Pith review Pith/arXiv arXiv doi:10.48550/arxiv.1010.5011 2010
-
[62]
J.-M. St´ ephan, Extreme boundary conditions and random tilings , SciPost Physics Lecture Notes 26 (2021), doi:10.21468/SciPostPhysLectNotes.26
-
[63]
R. Kenyon, Lectures on dimers, doi:10.48550/arXiv.0910.3129 (2009)
work page internal anchor Pith review Pith/arXiv arXiv doi:10.48550/arxiv.0910.3129 2009
-
[64]
F. Colomo and A. G. Pronko, The arctic curve of the domain-wall six-vertex model , Journal of Statistical Physics 138(4), 662 (2010), doi:10.1007/s10955-009-9902-2
-
[65]
F. Colomo, A. G. Pronko and P. Zinn-Justin, The arctic curve of the domain-wall six- vertex model in its antiferroelectric regime , Journal of Statistical Mechanics: Theory and Experiment (3) (2010), doi:10.1088/1742-5468/2010/03/L03002
-
[66]
E. Granet, L. Budzynski, J. Dubail and J. L. Jacobsen, Inhomogeneous Gaussian free field inside the interacting arctic curve , Journal of Statistical Mechanics: Theory and Experiment (1) (2019), doi:10.1088/1742-5468/aaf71b
-
[67]
P. D. Francesco and E. Guitter, The arctic curve for Aztec rectangles with defects via the tangent method, Journal of Statistical Physics 176(3) (2019), doi:10.1007/s10955- 019-02315-2
-
[68]
T. Imamura, M. Mucciconi and T. Sasamoto, New approach to KPZ models through free fermions at positive temperature , Journal of Mathematical Physics 64, 083301 (2023), doi:10.1063/5.0089778
-
[69]
P. Kechagia, Y. C. Yortsos and P. Lichtner, Nonlocal Kardar-Parisi-Zhang equation to model interface growth , Physical Review E 64(1), 016315 (2001), doi:10.1103/PhysRevE.64.016315, Publisher: APS
-
[70]
C. Bernardin and R. Chetrite, Macroscopic Fluctuation Theory for Ginzburg–Landau Dynamics with Long-Range Interactions , Journal of Statistical Physics 192(1), 7 (2025), doi:10.1007/s10955-024-03384-8, Publisher: Springer
-
[71]
J. Hager, J. Krug, V. Popkov and G. Sch¨ utz, Minimal current phase and universal boundary layers in driven diffusive systems , Physical Review E 63(5), 056110 (2001), doi:10.1103/PhysRevE.63.056110, Publisher: APS. 24 SciPost Physics Submission
-
[72]
R. Boccagna, Stationary currents in long-range interacting magnetic systems , Math- ematical Physics, Analysis and Geometry 23(3), 30 (2020), doi:10.1007/s11040-020- 09354-2, Publisher: Springer
-
[73]
M. Mourragui, Large deviations of the empirical current for the boundary driven Kawasaki process with long range interaction , ALEA, Latin Amer- ican Journal of Probability and Mathematical Statistics 11(2), 643 (2014), doi:10.48550/arXiv.1406.1463, 1406.1463
work page internal anchor Pith review Pith/arXiv arXiv doi:10.48550/arxiv.1406.1463 2014
-
[74]
R. J. Harris and G. M. Sch¨ utz,Fluctuation theorems for stochastic dynamics, Journal of Statistical Mechanics: Theory and Experiment (07) (2007), doi:10.1088/1742- 5468/2007/07/P07020
-
[75]
C. Monthus, Microcanonical conditioning of Markov processes on time-additive ob- servables, Journal of Statistical Mechanics: Theory and Experiment p. 023207 (2022), doi:10.1088/1742-5468/ac4e81. 25
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