The positivity of the Jacobian in the weak limit of generalised axisymmetric maps

Abstract

Let (uj)j be a sequence of maps in W1,2(; R3), where is a domain in R3. When can we conclude that its weak limit u has non-negative Jacobian a.e.? Hencl and Onninen shows that it is sufficient that each uj is an orientation-preserving homeomorphism, using an ingenious analysis of a topological invariant called the linking number. Following their approach, we show that if each uj is a generalised axisymmetric map that has positive Jacobian a.e. and is one-to-one a.e., then Du 0 a.e. Our proof is based on using the divergence identities to control the sign of the linking numbers of the images of links in under uj.