Non-uniqueness of weak solutions to 2D generalized Navier-Stokes equations

Abstract

We study the non-uniqueness of weak solutions for the two-dimensional hyper-dissipative Navier-Stokes equations in the super-critical spaces LtγLxp when α∈[1,32), and obtain the conclusion that the non-uniqueness of the weak solutions at the endpoint (γ,p)=(∞, 22α-1) is sharp in view of the generalized Ladyzenskaja-Prodi-Serrin condition by using a different spatial-temporal building block from [Cheskidov-Luo, Ann. PDE, 9:13 (2023)] and taking advantage of the intermittency of the temporal concentrated function g(k) in an almost optimal way. Our results recover the above 2D non-uniqueness conclusion and extend to the hyper-dissipative case α ∈(1,32).

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