Norm inflation with infinite loss of regularity for the generalized improved Boussinesq equation

Abstract

In this paper, we study the ill-posedness issue for the generalized improved Boussinesq equation. In particular we prove there is norm inflation with infinite loss of regularity at general initial data in ∇ -s(L2 L∞)(R) for any s < 0. This result is sharp in the L2-based Sobolev scale in view of the well-posedness in L2(R) L∞(R). We also show that the same result applies to the multi-dimensional generalized improved Boussinesq equation. Finally, we extend our norm inflation result to Fourier-Lebesgue, modulation and Wiener amalgam spaces.