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Global Schauder estimates for kinetic Kolmogorov-Fokker-Planck equations

https://doi.org/10.1515/ans-2023-0167

Dong, Hongjie; Yastrzhembskiy, Timur (March 2025, Advanced Nonlinear Studies)

Abstract We present global Schauder type estimates in all variables and unique solvability results in kinetic Hölder spaces for kinetic Kolmogorov-Fokker-Planck (KFP) equations. The leading coefficients are Hölder continuous in thex,vvariables and are merely measurable in the temporal variable. Our proof is inspired by Campanato’s approach to Schauder estimates and does not rely on the estimates of the fundamental solution of the KFP operator.
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Free, publicly-accessible full text available March 12, 2026
Global Well-Posedness for Supercritical SQG With Perturbations of Radially Symmetric Data

https://doi.org/10.1093/imrn/rnae253

Bulut, Aynur; Dong, Hongjie (November 2024, International Mathematics Research Notices)

Abstract We study the global well-posedness of the supercritical dissipative surface quasi-geostrophic (SQG) equation, a key model in geophysical fluid dynamics. While local well-posedness is known, achieving global well-posedness for large initial data remains open. Motivated by enhanced decay in radial solutions, we aim to establish global well-posedness for small perturbations of potentially large radial data. Our main result shows that for small perturbations of radial data, the SQG equation admits a unique global solution.
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Free, publicly-accessible full text available November 22, 2025
Second order $$L_p$$ estimates for subsolutions of fully nonlinear equations

https://doi.org/10.1007/s00526-025-02929-3

Dong, Hongjie; Kitano, Shuhei (February 2025, Calculus of Variations and Partial Differential Equations)

Abstract We obtain new$$L_p$$ $L_{p}$ estimates for subsolutions to fully nonlinear equations. Based on our$$L_p$$ $L_{p}$ estimates, we further study several topics such as the third and fourth order derivative estimates for concave fully nonlinear equations, critical exponents of$$L_p$$ $L_{p}$ estimates and maximum principles, and the existence and uniqueness of solutions to fully nonlinear equations on the torus with free terms in the$$L_p$$ $L_{p}$ spaces or in the space of Radon measures.
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The Dirichlet problem for second-order elliptic equations in non-divergence form with continuous coefficients

https://doi.org/10.1007/s00208-025-03097-7

Dong, Hongjie; Kim, Dong-ha; Kim, Seick (May 2025, Mathematische Annalen)

Free, publicly-accessible full text available May 1, 2026
Schauder type estimates for degenerate or singular elliptic equations with DMO coefficients

https://doi.org/10.1007/s00526-024-02840-3

Dong, Hongjie; Jeon, Seongmin; Vita, Stefano (December 2024, Calculus of Variations and Partial Differential Equations)

Free, publicly-accessible full text available December 1, 2025
Asymptotics of the solution to the perfect conductivity problem with p-Laplacian

https://doi.org/10.1007/s00208-024-02876-y

Dong, Hongjie; Yang, Zhuolun; Zhu, Hanye (December 2024, Mathematische Annalen)

Free, publicly-accessible full text available December 1, 2025
The Local Well-Posedness of the Relativistic Vlasov–Maxwell–Landau System with the Specular Reflection Boundary Condition

https://doi.org/10.1137/23M1608938

Dong, Hongjie; Guo, Yan; Ouyang, Zhimeng; Yastrzhembskiy, Timur (October 2024, SIAM Journal on Mathematical Analysis)

Free, publicly-accessible full text available October 31, 2025
On higher regularity of Stokes systems with piecewise Hölder continuous coefficients

https://doi.org/10.1090/tran/9165

Dong, Hongjie; Li, Haigang; Xu, Longjuan (September 2024, Transactions of the American Mathematical Society)

In this paper, we consider higher regularity of a weak solution $(u, p)$ to stationary Stokes systems with variable coefficients. Under the assumptions that coefficients and data are piecewise $C^{s, δ<#comment/>}$ in a bounded domain consisting of a finite number of subdomains with interfacial boundaries in $C^{s + 1, μ<#comment/>}$ , where $s$ is a positive integer, $δ<#comment/> \in<#comment/> (0, 1)$ , and $μ<#comment/> \in<#comment/> (0, 1]$ , we show that $D u$ and $p$ are piecewise $C^{s, {δ<#comment/>}_{μ<#comment/>}}$ , where ${δ<#comment/>}_{μ<#comment/>} = min {\frac{1}{2}, μ<#comment/>, δ<#comment/>}$ . Our result is new even in the 2D case with piecewise constant coefficients.
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