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Finite time blow-up in a 1D model of the incompressible porous media equation

https://doi.org/10.1088/1361-6544/adcdb8

Kiselev, Alexander; Sarsam, Naji A (April 2025, Nonlinearity)

Abstract We derive a PDE that models the behavior of a boundary layer solution to the incompressible porous media (IPM) equation posed on the 2D periodic half-plane. This 1D IPM model is a transport equation with a non-local velocity similar to the well-known Córdoba–Córdoba–Fontelos (CCF) equation. We discuss how this modification of the CCF equation can be regarded as a reasonable model for solutions to the IPM equation. Working in the class of bounded smooth periodic data, we then show local well-posedness for the 1D IPM model as well as finite time blow-up for a class of initial data.
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Free, publicly-accessible full text available April 29, 2026
The α$$\alpha$$‐SQG patch problem is illposed in C2,β and W2,p

https://doi.org/10.1002/cpa.22236

Kiselev, Alexander; Luo, Xiaoyutao (April 2025, Communications on Pure and Applied Mathematics)

Abstract We consider the patch problem for the ‐(surface quasi‐geostrophic) SQG system with the values and being the 2D Euler and the SQG equations respectively. It is well‐known that the Euler patches are globally wellposed in non‐endpoint Hölder spaces, as well as in , spaces. In stark contrast to the Euler case, we prove that for , the ‐SQG patch problem is strongly illposed ineveryHölder space with . Moreover, in a suitable range of regularity, the same strong illposedness holds foreverySobolev space unless .
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Free, publicly-accessible full text available April 1, 2026
On the Space-Time Analyticity of the Keller–Segel–Navier–Stokes System

https://doi.org/10.1007/s00332-025-10158-3

Abdo, Elie; Hu, Zhongtian (June 2025, Journal of Nonlinear Science)

Free, publicly-accessible full text available June 1, 2026
Suppression of Chemotactic Singularity by Buoyancy

https://doi.org/10.1007/s00039-025-00706-0

Hu, Zhongtian; Kiselev, Alexander; Yao, Yao (February 2025, Geometric and Functional Analysis)

Free, publicly-accessible full text available February 13, 2026
Small scale formation for the 2-dimensional Boussinesq equation

https://doi.org/10.2140/apde.2025.18.171

Kiselev, Alexander; Park, Jaemin; Yao, Yao (January 2025, Analysis & PDE)

Free, publicly-accessible full text available January 1, 2026
Suppression of Chemotactic Singularity via Viscous Flow with Large Buoyancy

https://doi.org/10.1137/24M1669001

Hu, Zhongtian (December 2024, SIAM Journal on Mathematical Analysis)

Free, publicly-accessible full text available December 31, 2025
Small Scale Creation for 2D Free Boundary Euler Equations with Surface Tension

https://doi.org/10.1007/s40818-024-00179-8

Hu, Zhongtian; Luo, Chenyun; Yao, Yao (December 2024, Annals of PDE)

Free, publicly-accessible full text available December 1, 2025
Suppression of chemotactic blowup by strong buoyancy in Stokes-Boussinesq flow with cold boundary

https://doi.org/10.1016/j.jfa.2024.110541

Hu, Zhongtian; Kiselev, Alexander (October 2024, Journal of Functional Analysis)

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