Long-wave instability of periodic shear flows for the 2D Navier-Stokes equations

Abstract

In 1959, Kolmogorov proposed to study the instability of the shear flow ((y),0) in the vanishing viscosity regime in tori Tα× T. This question was later resolved by Meshalkin and Sinai. We extend the problem to general shear flows (U(y),0) and show that every U(y) exhibits long-wave instability whenever \|∂y-1 U\|L2 > and α , with being the kinematic viscosity. This instability mechanism confirms previous findings by Yudovich in 1966, supported also by several numerical results, and is established through two independent approaches: one via the construction of Kato's isomorphism and one via normal forms. Unlike in many other applications of the latter methods, both proofs deal with the presence of a delicate term in the linearized operator that becomes singular as α approaches 0.