The Nonlocal-to-Local Limit for the Inviscid Leray-α Equations

Abstract

We consider the inviscid Leray-α equations - an inviscid nonlocal regularisation of the Euler equations. In the first part, we prove the convergence of strong solutions of the Leray-α equations to strong solutions of the Euler equations in Hs(Rd) for s>d/2 +1 , d∈ \2,3\, for a large class of regularising kernels. In the second part, we consider weak solutions on a bounded domain with a local scaling property far away from the boundary. The scaling relates to second-order structure functions from turbulence theory and does not imply regularity. Nonetheless, under these assumptions, the weak solutions converge to (possibly wild) weak solutions of Euler in L2 for almost every t.