Weak solutions to 2D viscous resistive MHD are non-unique in L^2_t L^p(R^2) ∩ L^1_t W^{1,p}(R^2) for all 1 ≤ p < ∞, with byproducts for Navier-Stokes and large BMO^{-1} data.
Nonuniquene ss of leray-hopf solutions to the unforced incom- pressible 3d navier-stokes equation
6 Pith papers cite this work. Polarity classification is still indexing.
citation-role summary
citation-polarity summary
years
2026 6roles
background 1polarities
background 1representative citing papers
Derives a minimax formula for optimal upper bounds on ensemble averages in 3D NS via Foias-Prodi stationary statistical solutions, with maximizers as convex combinations of at most two Dirac measures.
Constructs C^∞ self-similar blowup profiles for 1D models of 3D Euler at α=1/3 using fixed-point around a numerical approximation, plus nearby exact profiles for α slightly below 1/3.
Numerical construction of unstable self-similar axially symmetric swirl-free solutions to the incompressible Navier-Stokes equations on R^3 with global pointwise residuals of order 10^{-10}.
The work introduces a modulation-based analytical method for singularity proofs in singular PDEs and refines ML techniques like PINNs and KANs to identify blowup solutions, with application to the open 3D Keller-Segel problem.
Theorems on uniqueness and continuous dependence on initial data for stochastic Navier-Stokes equations with Wiener and Poisson noise, generalizing results from GK2026.
citing papers explorer
-
Sharp non-uniqueness of weak solutions to 2D magnetohydrodynamic equations
Weak solutions to 2D viscous resistive MHD are non-unique in L^2_t L^p(R^2) ∩ L^1_t W^{1,p}(R^2) for all 1 ≤ p < ∞, with byproducts for Navier-Stokes and large BMO^{-1} data.
-
Optimal minimax formula for bounds on ensemble averages of statistically stationary three-dimensional Navier-Stokes flows
Derives a minimax formula for optimal upper bounds on ensemble averages in 3D NS via Foias-Prodi stationary statistical solutions, with maximizers as convex combinations of at most two Dirac measures.
-
Asymptotically Self-Similar Blowup for 3D Incompressible Euler with $C^{1, 1/3-}$ Velocity I: $C^{\infty}$ 1D Limiting Profiles
Constructs C^∞ self-similar blowup profiles for 1D models of 3D Euler at α=1/3 using fixed-point around a numerical approximation, plus nearby exact profiles for α slightly below 1/3.
-
On the non-uniqueness of solutions of the axi-symmetric swirl-free Navier-Stokes equations, I
Numerical construction of unstable self-similar axially symmetric swirl-free solutions to the incompressible Navier-Stokes equations on R^3 with global pointwise residuals of order 10^{-10}.