Growth of Sobolev norms and loss of regularity in transport equations

Abstract

We consider transport of a passive scalar advected by an irregular divergence free vector field. Given any non-constant initial data ∈ H1loc( Rd), d≥ 2, we construct a divergence free advecting velocity field v (depending on ) for which the unique weak solution to the transport equation does not belong to H1loc( Rd) for any positive positive time. The velocity field v is smooth, except at one point, controlled uniformly in time, and belongs to almost every Sobolev space Ws,p that does not embed into the Lipschitz class. The velocity field v is constructed by pulling back and rescaling an initial data dependent sequence of sine/cosine shear flows on the torus. This loss of regularity result complements that in [Ann. PDE, 5(1):Paper No. 9, 19, 2019].