Distortion of the triangular ratio metric under Moebius transformations

Abstract

Let U be the unit disk in the complex plane. Denote by sU(x,y) the triangular ratio metric in U; the value of sU(x,y) equals the ratio of the Euclidean distance |x-y| to the value ∈fz∈ ∂ U(|x-z|+|z-y|). In the monograph by P.~Hariri, R.~Klén, and M.~Vuorinen &#34;Conformally invariant metrics and quasiconformal mappings&#34; (2020) the following problem was stated: for every Moebius automorphism of the unit disk, w=f(z)=z+a1+za, 0 a<1, and every points z1, z2∈ U the sharp inequality sU(f(z1),f(z2)) (1+a)sU(z1,z2) holds. We prove that the conjecture is valid.