Unbounded Topology of Nodal Sets of Harmonic Functions

Abstract

For every integer \(n 3\), every \(1 n-2\), and every sufficiently large integer \(m\), we construct harmonic functions \(um,\) on the unit ball \(B1(0)⊂Rn\) such that the frequency is bounded independently of \(m\), every point of the nodal set \(\um,=0\ B1/2(0)\) is regular, but the Betti numbers satisfy align* b(\um,=0\ B1/2(0)) 2m. align* Thus bounded frequency, even together with regularity of the nodal set, does not imply a uniform topological bound. In particular, these examples give counterexamples to the claimed global Betti-number bound of Lin and Liu.