Dirichlet-type energy of mappings between two concentric annuli

Abstract

Let A and A* be two non-degenerate spherical annuli in Rn equipped with the Euclidean metric and the weighted metric |y|1-n, respectively. Let F(A,A*) denote the class of homeomorphisms in W1,n-1(A,A*). For n=3, the second author kalaj2018 proved that the minimizers of the Dirichlet-type energy E[h]=∫A \|Dh(x)\|n-1|h(x)|n-1dx are certain generalized radial diffeomorphisms, where h∈ F(A,A*). For the case n≥ 4, he conjectured that the minimizers are also certain generalized radial diffeomorphisms between A and A*. The main aim of this paper is to consider this conjecture. First, we investigate the minimality of the following combined energy integral: E[a,b][h] =∫Aa2n-1(x)\|DS(x)\|n-1+b2|∇ (x)|n-1|(x)|n-1dx, where h= S∈ F(A,A*), =|h| and a,b>0. The obtained result is a generalization of [Theorem 1.1]kalaj2018. As an application, we show that the above conjecture is almost true for the case n≥ 4, i.e., the minimizer of the energy integral E[h] does not exist but there exists a minimizing sequence which belongs to the generalized radial mappings.