A Remark on Unconditional Uniqueness in the Chern-Simons-Higgs Model

Abstract

The solution of the Chern-Simons-Higgs model in Lorenz gauge with data for the potential in Hs-1/2 and for the Higgs field in Hs × Hs-1 is shown to be unique in the natural space C([0,T];Hs-1/2 × Hs × Hs-1) for s 1, where s=1 corresponds to finite energy. Huh and Oh recently proved local well-posedness for s > 3/4, but uniqueness was obtained only in a proper subspace Ys of Bourgain type. We prove that any solution in C([0,T];H1/2 × H1 × L2) must in fact belong to the space Y3/4+ε, hence it is the unique solution obtained by Huh and Oh.