Ill-posedness for the Hamilton-Jacobi equation in Besov spaces B0∞,q

Abstract

In this paper, we study the Cauchy problem for the following Hamilton-Jacobi equation tu- u=| u|2, t>0, \ x∈ d,\\ u(0,x)=u0, x∈ d. align* We show that the solution map in Besov spaces B0∞,q(d),1≤ q≤ ∞ is discontinuous at origin. That is, we can construct a sequence initial data \uN0\ satisfying ||uN0||B0∞,q(d)→ 0, \ N→ ∞ such that the corresponding solution \uN\ with uN(0)=uN0 satisfies ||uN||L∞T(B0∞,q(d))≥ c0, ∀ \ T>0, N 1, align* with a constant c0>0 independent of N.