Continuation of the zero set for discretely self-similar solutions to the Euler equations

Abstract

We are concerned on the study of the unique continuation type property for the 3D incompressible Euler equations in the self-similar type form. Discretely self-similar solution is a generalized notion of the self-similar solution, which is equivalent to a time periodic solution of the time dependent self-similar Euler equations. We prove the unique continuation type theorem for the discretely self-similar solutions to the Euler equations in R3. More specifically, we suppose there exists an open set G⊂ R3 containing the origin such that the velocity field V∈ Cs1C2y ( R3+1) vanishes on G× (0, S0), where S0 > 0 is the temporal period for V(y,s). Then, we show V(y,s)=0 for all (y,s)∈ R3+1. Similar property also holds for the inviscid magnetohydrodynamic system