Derivative estimates of solutions of elliptic systems in narrow regions

An optimal estimate for electric fields on the shortest line segment between two spherical insulators in three dimensions ⋮ Asymptotic analysis for the electric field concentration with geometry of the core-shell structure ⋮ On an elliptic equation arising from composite materials ⋮ Singularities of the stress concentration in the presence of 𝐶^{1,𝛼}-inclusions with core-shell geometry ⋮ Estimates for elliptic systems in a narrow region arising from composite materials ⋮ Gradient estimates for solutions of the Lamé system with partially infinite coefficients in dimensions greater than two ⋮ Gradient estimates for elliptic systems from composite materials with closely spaced stiff \(C^{1, \gamma}\) inclusions ⋮ Lower bounds of gradient's blow-up for the Lamé system with partially infinite coefficients ⋮ Quantitative estimates for enhancement of the field excited by an emitter due to presence of two closely located spherical inclusions ⋮ Gradient asymptotics of solutions to the Lamé systems in the presence of two nearly touching \(C^{1, \gamma }\)-inclusions ⋮ Upper and lower bounds for stress concentration in linear elasticity when 𝐶^{1,𝛼} inclusions are close to boundary ⋮ Optimal estimates and asymptotics for the stress concentration between closely located stiff inclusions ⋮ Two types of electric field enhancements by infinitely many circular conductors arranged closely in two parallel lines ⋮ Optimal Estimates for the Perfect Conductivity Problem with Inclusions Close to the Boundary ⋮ Stress Blowup Analysis When a Suspending Rigid Particle Approaches the Boundary in Stokes Flow: 2-Dimensional Case ⋮ Optimal estimates for transmission problems including relative conductivities with different signs ⋮ Quantitative Estimates for Stress Concentration of the Stokes Flow Between Adjacent Circular Cylinders ⋮ The Interaction Between Two Close-To-Touching Convex Acoustic Subwavelength Resonators ⋮ Estimates for stress concentration between two adjacent rigid inclusions in Stokes flow ⋮ Stress blow-up analysis when suspending rigid particles approach boundary in 3D Stokes flow ⋮ Boundary Blow-Up Analysis of Gradient Estimates for Lamé Systems in the Presence of $m$-Convex Hard Inclusions ⋮ Optimal estimates for the conductivity problem by Green's function method ⋮ Quantitative characterization of stress concentration in the presence of closely spaced hard inclusions in two-dimensional linear elasticity ⋮ Asymptotics for the Electric Field Concentration in the Perfect Conductivity Problem ⋮ Asymptotics for the concentrated field between closely located hard inclusions in all dimensions ⋮ Gradient estimates for solutions of the Lamé system with partially infinite coefficients ⋮ Estimates and asymptotics for the stress concentration between closely spaced stiff \(C^{1, \gamma }\) inclusions in linear elasticity ⋮ Optimal gradient estimates for the perfect conductivity problem with \(C^{1,\alpha}\) inclusions ⋮ Asymptotics of the Gradient of Solutions to the Perfect Conductivity Problem ⋮ Gradient estimates for parabolic systems from composite material ⋮ The asymptotics for the perfect conductivity problem with stiff \(C^{1,\alpha}\)-inclusions ⋮ Characterization of electric fields between two spherical perfect conductors with general radii in 3D ⋮ Optimal boundary gradient estimates for Lamé systems with partially infinite coefficients

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• Gradient estimates for the perfect conductivity problem
• Decomposition theorems and fine estimates for electrical fields in the presence of closely located circular inclusions
• Gradient estimates for solutions to divergence form elliptic equations with discontinuous coefficients
• Gradient estimates for solutions to the conductivity problem
• Asymptotics and computation of the solution to the conductivity equation in the presence of adjacent inclusions with extreme conductivities
• Spectral analysis of the Neumann-Poincaré operator and characterization of the stress concentration in anti-plane elasticity
• Damage analysis of fiber composites. I: Statistical analysis of fiber scale
• Optimal estimates for the electric field in two dimensions
• Optimal bound on high stresses occurring between stiff fibers with arbitrary shaped cross-sections
• Gradient Estimates for the Perfect and Insulated Conductivity Problems with Multiple Inclusions
• High Shear Stresses in Stiff-Fiber Composites
• Blow-up of Electric Fields between Closely Spaced Spherical Perfect Conductors
• Conductivity of a Medium Containing a Dense Array of Perfectly Conducting Spheres or Cylinders or Nonconducting Cylinders
• Stresses in Narrow Regions
• Estimates for elliptic systems from composite material
• An Elliptic Regularity Result for a Composite Medium with "Touching" Fibers of Circular Cross-Section
• Estimates for Electric Fields Blown Up between Closely Adjacent Conductors with Arbitrary Shape
• Estimates for the electric field in the presence of adjacent perfectly conducting spheres