Journal of Physics A: Mathematical and Theoretical, ISSN 1751-8113, 02/2017, Volume 50, Issue 10, p. 104001

J. Phys. A: Math. Theor. 50, 104001 (2017) We study the scaling properties of a one-dimensional interface at equilibrium, at finite temperature and in a...

interfaces in disordered media | Gaussian variational method | Kardar-Parisi-Zhang equation | scaling theory | directed polymer | disordered elastic systems | Physics - Statistical Mechanics

interfaces in disordered media | Gaussian variational method | Kardar-Parisi-Zhang equation | scaling theory | directed polymer | disordered elastic systems | Physics - Statistical Mechanics

Journal Article

Soft matter, ISSN 1744-683X, 07/2017, Volume 13, Issue 26, pp. 4653 - 4660

In this work we discuss possible physical origins of non-trivial exponents in the athermal rheology of soft materials at low but finite driving rates. A key...

Journal Article

Soft Matter, ISSN 1744-683X, 7/2017, Volume 13, Issue 26, pp. 4653 - 466

In this work we discuss possible physical origins of non-trivial exponents in the athermal rheology of soft materials at low but finite driving rates. A key...

FOAMS | POLYMER SCIENCE | PHYSICS, MULTIDISCIPLINARY | FIELD | MATERIALS SCIENCE, MULTIDISCIPLINARY | SOFT GLASSY MATERIALS | CHEMISTRY, PHYSICAL | VISCOSITY | MODEL | FLOW | AMORPHOUS SOLIDS | TRANSITION | TEMPERATURE | HIGHLY CONCENTRATED EMULSIONS | Stresses | Exponents | Noise | Mathematical analysis | Mathematical models | Stems | Relaxation time | Rheological properties

FOAMS | POLYMER SCIENCE | PHYSICS, MULTIDISCIPLINARY | FIELD | MATERIALS SCIENCE, MULTIDISCIPLINARY | SOFT GLASSY MATERIALS | CHEMISTRY, PHYSICAL | VISCOSITY | MODEL | FLOW | AMORPHOUS SOLIDS | TRANSITION | TEMPERATURE | HIGHLY CONCENTRATED EMULSIONS | Stresses | Exponents | Noise | Mathematical analysis | Mathematical models | Stems | Relaxation time | Rheological properties

Journal Article

Journal of Physics A: Mathematical and Theoretical, ISSN 1751-8113, 2019, Volume 52, Issue 14, p. 144002

We consider the Langevin dynamics of a many-body system of interacting particles in d dimensions, in a very general setting suitable to model several...

mean field | rheology | disordered systems | out-of-equilibrium dynamics | metastable glassy states | LENNARD-JONES MIXTURE | HARD-SPHERE FLUID | PHYSICS, MULTIDISCIPLINARY | METASTABLE STATES | CONNECTIONS | PHYSICS, MATHEMATICAL | MODE-COUPLING THEORY | MEAN-FIELD THEORY | STRUCTURAL GLASS-TRANSITION | NONEQUILIBRIUM DYNAMICS | LIQUIDS | Condensed Matter | Disordered Systems and Neural Networks | Statistical Mechanics | Physics

mean field | rheology | disordered systems | out-of-equilibrium dynamics | metastable glassy states | LENNARD-JONES MIXTURE | HARD-SPHERE FLUID | PHYSICS, MULTIDISCIPLINARY | METASTABLE STATES | CONNECTIONS | PHYSICS, MATHEMATICAL | MODE-COUPLING THEORY | MEAN-FIELD THEORY | STRUCTURAL GLASS-TRANSITION | NONEQUILIBRIUM DYNAMICS | LIQUIDS | Condensed Matter | Disordered Systems and Neural Networks | Statistical Mechanics | Physics

Journal Article

JOURNAL OF PHYSICS A-MATHEMATICAL AND THEORETICAL, ISSN 1751-8113, 08/2019, Volume 52, Issue 33, p. 334001

As an extension of the isotropic setting presented in the companion paper Agoritsas et al (2019 J. Phys. A: Math. Theor. 52 144002), we consider the Langevin...

GLASS | HARD-SPHERE FLUID | rheology | PHYSICS, MULTIDISCIPLINARY | METASTABLE STATES | out-of-equilibrium dynamics-mean field | metastable glassy states | SCENARIO | PHYSICS, MATHEMATICAL | disordered systems | Physics

GLASS | HARD-SPHERE FLUID | rheology | PHYSICS, MULTIDISCIPLINARY | METASTABLE STATES | out-of-equilibrium dynamics-mean field | metastable glassy states | SCENARIO | PHYSICS, MATHEMATICAL | disordered systems | Physics

Journal Article

JOURNAL OF PHYSICS A-MATHEMATICAL AND THEORETICAL, ISSN 1751-8113, 02/2018, Volume 51, Issue 8, p. 85002

Perceptrons are the building blocks of many theoretical approaches to a wide range of complex systems, ranging from neural networks and deep learning machines,...

STORAGE | perceptron | PHYSICS, MULTIDISCIPLINARY | SPIN-GLASS MODEL | METASTABLE STATES | RHEOLOGY | NEURAL-NETWORK MODELS | PHYSICS, MATHEMATICAL | COUPLING THEORY | out-of-equilibrium mean-field dynamical equations | REPLICAS | SYSTEMS | TRANSITIONS | disordered systems | LIQUIDS | Condensed Matter | Physics

STORAGE | perceptron | PHYSICS, MULTIDISCIPLINARY | SPIN-GLASS MODEL | METASTABLE STATES | RHEOLOGY | NEURAL-NETWORK MODELS | PHYSICS, MATHEMATICAL | COUPLING THEORY | out-of-equilibrium mean-field dynamical equations | REPLICAS | SYSTEMS | TRANSITIONS | disordered systems | LIQUIDS | Condensed Matter | Physics

Journal Article

Journal of Statistical Physics, ISSN 0022-4715, 9/2016, Volume 164, Issue 6, pp. 1394 - 1428

The response of spatially extended systems to a force leading their steady state out of equilibrium is strongly affected by the presence of disorder. We focus...

Disordered systems | Non-linear response | Physical Chemistry | Theoretical, Mathematical and Computational Physics | Quantum Physics | Kardar–Parisi–Zhang universality class | Creep law | Physics | Statistical Physics and Dynamical Systems | Non-equilibrium dynamics | HIGH-TEMPERATURE | DIRECTED POLYMERS | PHYSICS, MATHEMATICAL | RANDOM-MEDIA | FLUX LINES | Kardar-Parisi-Zhang universality class | CHARGE-DENSITY WAVES | DYNAMICS | RANDOM IMPURITIES | FREE-ENERGY | DISORDERED ELASTIC-SYSTEMS | SUPERCONDUCTORS | Physics - Statistical Mechanics | Probability | Mathematics

Disordered systems | Non-linear response | Physical Chemistry | Theoretical, Mathematical and Computational Physics | Quantum Physics | Kardar–Parisi–Zhang universality class | Creep law | Physics | Statistical Physics and Dynamical Systems | Non-equilibrium dynamics | HIGH-TEMPERATURE | DIRECTED POLYMERS | PHYSICS, MATHEMATICAL | RANDOM-MEDIA | FLUX LINES | Kardar-Parisi-Zhang universality class | CHARGE-DENSITY WAVES | DYNAMICS | RANDOM IMPURITIES | FREE-ENERGY | DISORDERED ELASTIC-SYSTEMS | SUPERCONDUCTORS | Physics - Statistical Mechanics | Probability | Mathematics

Journal Article

Physical Review E - Statistical, Nonlinear, and Soft Matter Physics, ISSN 1539-3755, 04/2013, Volume 87, Issue 4, p. 042406

Experimental realizations of a one-dimensional (1D) interface always exhibit a finite microscopic width xi > 0; its influence is erased by thermal fluctuations...

RANDOM-MEDIA | GROWING INTERFACES | SCALE-INVARIANCE | PROBABILITY-DISTRIBUTIONS | DISORDERED MEDIA | PHYSICS, FLUIDS & PLASMAS | GROWTH-PROCESSES | RANDOM IMPURITIES | PHYSICS, MATHEMATICAL | FREE-ENERGY | RANDOM MATRICES | BETHE-ANSATZ | Probability | Mathematics | Statistics | Statistics Theory

RANDOM-MEDIA | GROWING INTERFACES | SCALE-INVARIANCE | PROBABILITY-DISTRIBUTIONS | DISORDERED MEDIA | PHYSICS, FLUIDS & PLASMAS | GROWTH-PROCESSES | RANDOM IMPURITIES | PHYSICS, MATHEMATICAL | FREE-ENERGY | RANDOM MATRICES | BETHE-ANSATZ | Probability | Mathematics | Statistics | Statistics Theory

Journal Article

Physica B: Physics of Condensed Matter, ISSN 0921-4526, 06/2012, Volume 407, Issue 11, pp. 1725 - 1733

We briefly introduce the generic framework of disordered elastic systems (DES), giving a short ‘recipe’ of a DES modeling and presenting the quantities of...

Interfaces | Disordered elastic systems | Glassy phenomena | PHYSICS, CONDENSED MATTER | WALL | DIRECTED POLYMERS | RANDOM-MEDIA | FLUCTUATIONS | CREEP | CHARGE-DENSITY WAVES | DYNAMICS | MANIFOLDS | SUPERCONDUCTORS | Condensed matter | Dynamics | Mathematical analysis | Fluctuation | Disorders | Dynamical systems | Quenching (cooling) | Elastic systems | Statistical Mechanics | Pattern Formation and Solitons | Mathematical Physics | Condensed Matter | Mathematics | Nonlinear Sciences | Physics | Other

Interfaces | Disordered elastic systems | Glassy phenomena | PHYSICS, CONDENSED MATTER | WALL | DIRECTED POLYMERS | RANDOM-MEDIA | FLUCTUATIONS | CREEP | CHARGE-DENSITY WAVES | DYNAMICS | MANIFOLDS | SUPERCONDUCTORS | Condensed matter | Dynamics | Mathematical analysis | Fluctuation | Disorders | Dynamical systems | Quenching (cooling) | Elastic systems | Statistical Mechanics | Pattern Formation and Solitons | Mathematical Physics | Condensed Matter | Mathematics | Nonlinear Sciences | Physics | Other

Journal Article

Physical Review E - Statistical, Nonlinear, and Soft Matter Physics, ISSN 1539-3755, 06/2013, Volume 87, Issue 6, p. 062405

We study numerically the geometrical and free-energy fluctuations of a static one-dimensional (1D) interface with a short-range elasticity, submitted to a...

GROWING INTERFACES | SCALE-INVARIANCE | DISORDERED MEDIA | STATISTICS | PHYSICS, FLUIDS & PLASMAS | GROWTH-PROCESSES | UNIVERSAL FLUCTUATIONS | CREEP | RANDOMLY STIRRED FLUID | PHYSICS, MATHEMATICAL | EQUATION | RANDOM MATRICES | Thermodynamics | Models, Chemical | Polymers - chemical synthesis | Computer Simulation | Models, Molecular | Energy Transfer | Phase Transition

GROWING INTERFACES | SCALE-INVARIANCE | DISORDERED MEDIA | STATISTICS | PHYSICS, FLUIDS & PLASMAS | GROWTH-PROCESSES | UNIVERSAL FLUCTUATIONS | CREEP | RANDOMLY STIRRED FLUID | PHYSICS, MATHEMATICAL | EQUATION | RANDOM MATRICES | Thermodynamics | Models, Chemical | Polymers - chemical synthesis | Computer Simulation | Models, Molecular | Energy Transfer | Phase Transition

Journal Article

The European Physical Journal E, ISSN 1292-8941, 7/2015, Volume 38, Issue 7, pp. 1 - 22

We show that, at least at a mean-field level, the effect of structural disorder in sheared amorphous media is very dissimilar depending on the thermal or...

Polymer Sciences | Soft and Granular Matter, Complex Fluids and Microfluidics | Flowing Matter: Liquids and Complex Fluids | Biophysics and Biological Physics | Surfaces and Interfaces, Thin Films | Statistical Physics, Dynamical Systems and Complexity | Physics | Nanotechnology | PHYSICS, APPLIED | POLYMER SCIENCE | MATERIALS SCIENCE, MULTIDISCIPLINARY | SOLIDS | SOFT GLASSY MATERIALS | CHEMISTRY, PHYSICAL | RHEOLOGY | MODEL | REARRANGEMENTS | DEFORMATION | EQUATION | FLOW | Condensed Matter | Materials Science

Polymer Sciences | Soft and Granular Matter, Complex Fluids and Microfluidics | Flowing Matter: Liquids and Complex Fluids | Biophysics and Biological Physics | Surfaces and Interfaces, Thin Films | Statistical Physics, Dynamical Systems and Complexity | Physics | Nanotechnology | PHYSICS, APPLIED | POLYMER SCIENCE | MATERIALS SCIENCE, MULTIDISCIPLINARY | SOLIDS | SOFT GLASSY MATERIALS | CHEMISTRY, PHYSICAL | RHEOLOGY | MODEL | REARRANGEMENTS | DEFORMATION | EQUATION | FLOW | Condensed Matter | Materials Science

Journal Article

Physical Review Letters, ISSN 0031-9007, 10/2012, Volume 109, Issue 14, p. 147601

Using multiscaling analysis, we compare the characteristic roughening of ferroelectric domain walls in Pb(Zr0.2Ti0.8)O-3 thin films with numerical simulations...

SYSTEMS | DEFECTS | PHYSICS, MULTIDISCIPLINARY | DIMENSIONAL INTERFACES | MULTIFERROICS

SYSTEMS | DEFECTS | PHYSICS, MULTIDISCIPLINARY | DIMENSIONAL INTERFACES | MULTIFERROICS

Journal Article

Physical Review Letters, ISSN 0031-9007, 04/2017, Volume 118, Issue 15, p. 158105

The rheological response of dense active matter is a topic of fundamental importance for many processes in nature such as the mechanics of biological tissues....

MECHANICS | DRAINAGE | PHYSICS, MULTIDISCIPLINARY | DYNAMICS | CONTACT INHIBITION | SYSTEMS | PHYSICS | STRESS | CELL | FLUIDIZATION | Stresses | Rheology | Noise | Mechanical properties | Nonlinearity | Tissues (biology) | Crossovers | Shear rate | Condensed Matter | Materials Science | Physics

MECHANICS | DRAINAGE | PHYSICS, MULTIDISCIPLINARY | DYNAMICS | CONTACT INHIBITION | SYSTEMS | PHYSICS | STRESS | CELL | FLUIDIZATION | Stresses | Rheology | Noise | Mechanical properties | Nonlinearity | Tissues (biology) | Crossovers | Shear rate | Condensed Matter | Materials Science | Physics

Journal Article

Physical Review B - Condensed Matter and Materials Physics, ISSN 1098-0121, 11/2010, Volume 82, Issue 18

At finite temperature and in presence of disorder, a one-dimensional elastic interface displays different scaling regimes at small and large lengthscales....

RANDOM-MEDIA | PHYSICS, CONDENSED MATTER | ELASTIC-SYSTEMS | FLUX-CREEP | DISORDERED MEDIA | CONTACT LINE | FLUCTUATIONS | CHARGE-DENSITY WAVES | DYNAMICS | RANDOM DIRECTED POLYMERS | BETHE-ANSATZ

RANDOM-MEDIA | PHYSICS, CONDENSED MATTER | ELASTIC-SYSTEMS | FLUX-CREEP | DISORDERED MEDIA | CONTACT LINE | FLUCTUATIONS | CHARGE-DENSITY WAVES | DYNAMICS | RANDOM DIRECTED POLYMERS | BETHE-ANSATZ

Journal Article

Soft Matter, ISSN 1744-683X, 2017, Volume 13, Issue 26, pp. 4653 - 4660

In this work we discuss possible physical origins for non-trivial exponents in the athermal rheology of soft materials at low but finite driving rates. A key...

Soft Condensed Matter | Condensed Matter | Statistical Mechanics | Physics

Soft Condensed Matter | Condensed Matter | Statistical Mechanics | Physics

Journal Article

Physical Review E - Statistical, Nonlinear, and Soft Matter Physics, ISSN 1539-3755, 09/2012, Volume 86, Issue 3, p. 031144

We study the fluctuations of the directed polymer in 1 + 1 dimensions in a Gaussian random environment with a finite correlation length xi and at finite...

QUENCHED RANDOM IMPURITIES | GROWING INTERFACES | RANDOM-MEDIA | CONTACT LINE | PHYSICS, FLUIDS & PLASMAS | GROWTH-PROCESSES | UNIVERSAL FLUCTUATIONS | PHYSICS, MATHEMATICAL | DISORDERED ELASTIC-SYSTEMS | 1+1 DIMENSIONS | RANDOM MATRICES | BETHE-ANSATZ | Condensed Matter | Physics | Statistical Mechanics

QUENCHED RANDOM IMPURITIES | GROWING INTERFACES | RANDOM-MEDIA | CONTACT LINE | PHYSICS, FLUIDS & PLASMAS | GROWTH-PROCESSES | UNIVERSAL FLUCTUATIONS | PHYSICS, MATHEMATICAL | DISORDERED ELASTIC-SYSTEMS | 1+1 DIMENSIONS | RANDOM MATRICES | BETHE-ANSATZ | Condensed Matter | Physics | Statistical Mechanics

Journal Article

The European physical journal. E, Soft matter, 07/2015, Volume 38, Issue 7, p. 71

We show that, at least at a mean-field level, the effect of structural disorder in sheared amorphous media is very dissimilar depending on the thermal or...

Journal Article

02/2016

SoftMatter 13, 4653 (2017) In this work we discuss possible physical origins for non-trivial exponents in the athermal rheology of soft materials at low but...

Journal Article

Physical Review E : Statistical, Nonlinear, and Soft Matter Physics, ISSN 1539-3755, 09/2012, Volume 87, Issue 4, p. 042406

Physical Review E, volume 87, page 042406 (2013) Experimental realizations of a 1D interface always exhibit a finite microscopic width $\xi>0$; its influence...

Condensed Matter | Physics | Statistical Mechanics

Condensed Matter | Physics | Statistical Mechanics

Journal Article

Physical Review E : Statistical, Nonlinear, and Soft Matter Physics, ISSN 1539-3755, 2013, Volume 87, Issue 6

Journal Article

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