chechkin-ga 1
1. ON ZAREMBA PROBLEM FOR SECOND–ORDER LINEAR ELLIPTIC EQUATION WITH DRIFT IN CASE OF LIMIT EXPONENT
2. Bojarski–Meyers estimate for a solution to the Zaremba problem for Poisson’s equations with drift
3. Boyarsky–Meyers Estimate for Solutions to Zaremba Problem
4. Increased Integrability of the Gradient of the Solution to the Zaremba Problem for the Poisson Equation
5. Multidimensional Zaremba problem for the p(.) -Laplace equation. A Boyarsky–Meyers estimate
6. On Higher Integrability of the Gradient of a Solution to the Zaremba Problem for p(.)-Laplace Equation in a Plane Domain
7. On the Boyarsky–Meyers Estimate for the Solution of the Dirichlet Problem for a Second-Order Linear Elliptic Equation with Drift
8. The Boyarsky–Meyers Inequality for Solutions to p-Elliptic Equation with Lower Order Terms and Dirichlet Boundary Condition
9. The Boyarsky–Meyers Inequality for the Zaremba Problem for p(∙)-Laplacian
10. TheMeyers estimate of solutions to Zaremba problem for second-order elliptic equations in divergent form
11. Unique Solvability of the Zaremba Problem for Linear Second Order Elliptic Equations with Drift
12. Homogenization of attractors to reaction–diffusion equations in domains with rapidly oscillating boundary: Critical case
13. HOMOGENIZATION OF ATTRACTORS TO REACTION–DIFFUSION EQUATIONS IN DOMAINS WITH RAPIDLY OSCILLATING BOUNDARY: SUPERCRITICAL CASE
14. Homogenization of Attractors to Reaction–Diffusion Equations in Domains with Rapidly Oscillating Boundary: Subcritical Case
15. HOMOGENIZATION OF ATTRACTORS TO THE REACTION-DIFFUSION SYSTEM IN A DOMAIN WITH ROUGH BOUNDARY
16. Application of Fatou’s Lemma for Strong Homogenization of Attractors to Reaction–Diffusion Systems with Rapidly Oscillating Coefficients in Orthotropic Media with Periodic Obstacles
17. Attractors of 2D Navier-Stokes system of equations in a locally periodic porous medium
18. Attractors of Ginzburg–Landau equations with oscillating terms in porous media: homogenization procedure
19. Attractors of the Navier–Stokes Equations in a Two-Dimensional Porous Medium
20. Homogenization of Attractors of Reaction–Diffusion System with Rapidly Oscillating Terms in an Orthotropic Porous Medium
21. Homogenization of Attractors to Ginzburg-Landau Equations in Media with Locally Periodic Obstacles: Critical Case
22. Homogenization of Attractors to Ginzburg-Landau Equations in Media with Locally Periodic Obstacles: Sub- and Supercritical Cases
23. HOMOGENIZATION OF ATTRACTORS TO REACTION-DIFFUSION SYSTEM IN A MEDIUM WITH RANDOM OBSTACLES
24. On Asymptotics of Attractors of the Navier–Stokes System in Anisotropic Medium with Small Periodic Obstacles
25. On Attractors of Ginzburg–Landau Equations in Domain with Locally Periodic Microstructure: Subcritical, Critical, and Supercritical Cases
26. On Attractors of Reaction–Diffusion Equations in a Porous Orthotropic Medium
27. Strong convergence of attractors of reaction-diffusion system with rapidly oscillating terms in an orthotropic porous medium
28. On Higher Integrability of Solutions to the Poisson Equation with Drift in Domains Perforated Along the Boundary
29. On the Eringen model for nematic liquid crystals
30. The Boyarsky–Meyers Estimate for Second Order Elliptic Equations in Divergence Form. Two Spatial Examples
31. The meyers estimates for domains perforated along the boundary
32. Erratum to: On Thermal Boundary Layer in a Viscous Non-Newtonian Medium (Doklady Mathematics, (2022), 105, 1, (23-27), 10.1134/S1064562422010070)
33. On Solutions to Equations of Magnetohydrodynamic Boundary Layer with an Injection of a Medium Obeying the Ladyzhenskaya Rheological Law
34. On Thermal Boundary Layer in a Viscous Non-Newtonian Medium
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