The additive structure of elliptic homogenization

Sedimentation of random suspensions and the effect of hyperuniformity ⋮ Scaling limit of the homogenization commutator for Gaussian coefficient fields ⋮ Large-scale regularity of nearly incompressible elasticity in stochastic homogenization ⋮ Quantitative homogenization of degenerate random environments ⋮ Quantitative stochastic homogenization and regularity theory of parabolic equations ⋮ Quantitative homogenization theory for random suspensions in steady Stokes flow ⋮ Quantitative hydrodynamic limits of the Langevin dynamics for gradient interface models ⋮ Convergence rates for linear elasticity systems on perforated domains ⋮ Generalization of Orlicz spaces ⋮ Higher-order linearization and regularity in nonlinear homogenization ⋮ High order correctors and two-scale expansions in stochastic homogenization ⋮ The structure of fluctuations in stochastic homogenization ⋮ Stochastic homogenisation of free-discontinuity problems ⋮ On the Periodic Homogenization of Elliptic Equations in Nondivergence Form with Large Drifts ⋮ Optimal decay of the parabolic semigroup in stochastic homogenization for correlated coefficient fields ⋮ Stochastic Homogenization of Linear Elliptic Equations: Higher-Order Error Estimates in Weak Norms Via Second-Order Correctors ⋮ Liouville Principles and a Large-Scale Regularity Theory for Random Elliptic Operators on the Half-Space ⋮ Non-perturbative approach to the Bourgain-Spencer conjecture in stochastic homogenization ⋮ Optimal Hardy weights on the Euclidean lattice ⋮ Locality properties of standard homogenization commutator ⋮ Quantitative nonlinear homogenization: control of oscillations ⋮ The maximum of log‐correlated Gaussian fields in random environment ⋮ Robustness of the pathwise structure of fluctuations in stochastic homogenization ⋮ Multiscale functional inequalities in probability: constructive approach ⋮ Green's function for elliptic systems: moment bounds ⋮ An informal introduction to quantitative stochastic homogenization ⋮ Time harmonic wave propagation in one dimensional weakly randomly perturbed periodic media ⋮ Higher-order pathwise theory of fluctuations in stochastic homogenization ⋮ Uniform estimate of an iterative method for elliptic problems with rapidly oscillating coefficients ⋮ Sparse Compression of Expected Solution Operators ⋮ An Introduction to the Qualitative and Quantitative Theory of Homogenization ⋮ Effective multipoles in random media ⋮ Interplay of analysis and probability in applied mathematics. Abstracts from the workshop held February 11--17, 2018 ⋮ Efficient methods for the estimation of homogenized coefficients ⋮ Optimal corrector estimates on percolation cluster ⋮ Rough flows and homogenization in stochastic turbulence ⋮ Sublinear growth of the corrector in stochastic homogenization: optimal stochastic estimates for slowly decaying correlations ⋮ Optimal quantitative estimates in stochastic homogenization for elliptic equations in nondivergence form ⋮ Quantitative homogenization of the disordered \(\nabla \phi \) model ⋮ Quantitative hydrodynamic limits of the Langevin dynamics for gradient interface models ⋮ Convergence rates on periodic homogenization of \(p\)-Laplace type equations ⋮ Berry-Esseen theorem and quantitative homogenization for the random conductance model with degenerate conductances ⋮ Quantitative homogenization of the parabolic and elliptic Green's functions on percolation clusters ⋮ Computing homogenized coefficientsviamultiscale representation and hierarchical hybrid grids ⋮ Quantitative homogenization of differential forms ⋮ Optimal homogenization rates in stochastic homogenization of nonlinear uniformly elliptic equations and systems ⋮ Homogenization of parabolic equations with non-self-similar scales ⋮ The random heat equation in dimensions three and higher: the homogenization viewpoint ⋮ Optimal artificial boundary condition for random elliptic media ⋮ The choice of representative volumes in the approximation of effective properties of random materials ⋮ A regularity theory for random elliptic operators ⋮ On the averaged Green's function of an elliptic equation with random coefficients ⋮ An efficient algorithm for solving elliptic problems on percolation clusters ⋮ Quantitative homogenization of interacting particle systems ⋮ A Priori Error Analysis of a Numerical Stochastic Homogenization Method ⋮ Quantitative estimates in stochastic homogenization for correlated coefficient fields ⋮ Fluctuation estimates for the multi-cell formula in stochastic homogenization of partitions

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• Noise-stability and central limit theorems for effective resistance of random electric networks
• Bounded correctors in almost periodic homogenization
• Mesoscopic higher regularity and subadditivity in elliptic homogenization
• Normal approximation for the net flux through a random conductor
• Correlation structure of the corrector in stochastic homogenization
• Normal approximation for a random elliptic equation
• An optimal variance estimate in stochastic homogenization of discrete elliptic equations
• Annealed estimates on the Green function
• A new method of normal approximation
• Fluctuations of eigenvalues and second order Poincaré inequalities
• Nonlinear stochastic homogenization
• On the correlation for Kac-like models in the convex case
• Quantitative results on the corrector equation in stochastic homogenization
• A tightness criterion for random fields, with application to the Ising model
• Scaling limit of the corrector in stochastic homogenization
• A central limit theorem for the effective conductance: linear boundary data and small ellipticity contrasts
• The structure of fluctuations in stochastic homogenization
• Quantification of ergodicity in stochastic homogenization: optimal bounds via spectral gap on Glauber dynamics
• On homogenization and scaling limit of some gradient perturbations of a massless free field
• An optimal error estimate in stochastic homogenization of discrete elliptic equations
• Gaussian free fields for mathematicians
• Scaling Limit of Fluctuations in Stochastic Homogenization
• Quantitative
• A higher-order large-scale regularity theory for random elliptic operators
• A Quantitative Central Limit Theorem for the Effective Conductance on the Discrete Torus
• An optimal quantitative two-scale expansion in stochastic homogenization of discrete elliptic equations
• Compactness methods in the theory of homogenization
• Lipschitz regularity for elliptic equations with random coefficients