The Lavrentiev gap phenomenon for harmonic maps into spheres holds on a dense set of zero degree boundary data

Abstract

We prove that for each positive integer N the set of smooth, zero degree maps 2 S2 which have the following three properties: (1) there is a unique minimizing harmonic map u B3 S2 which agrees with on the boundary of the unit ball; (2) this map u has at least N singular points in B3; (3) the Lavrentiev gap phenomenon holds for , i.e., the infimum of the Dirichlet energies E(w) of all smooth extensions w B32 of is strictly larger than the Dirichlet energy ∫B3 |∇ u|2 of the (irregular) minimizer u, is dense in the set of all smooth zero degree maps φ S22 endowed with the W1,p-topology, where 1 p < 2. This result is sharp: it fails in the W1,2 topology on the set of all smooth boundary data.