A counterexample in unique continuation (Q5929465)

The authors prove the theorem: ``There are measurable functions \(u\), \(V\) defined on \(\mathbb{R}^2\), both supported in \(\overline B_1\), where \(B_1\) is the open unit disc, which are smooth in \(B_1\), such that \(u\), \(V\), \(Vu\in L^1(\mathbb{R}^2)\), and such that \(\Delta u-Vu= 0\) in \({\mathcal D}'\),'' thus answering a question of Carleman (1939).