Extremal problems of nonoverlapping domains with free poles on a circle

Abstract

Let α₁, α₂ > and let r(B, a) be the interior radius of the domain B lying in the extended complex plane

relative to the point a ∈ B. In terms of quadratic differentials, we give a complete description of extremal configurations in the problem of maximization of the functional \(\left( {\frac{{r(B_1 ,a_1 ) r(B_3 ,a_3 )}}{{\left| {a_1 - a_3 } \right|^2 }}} \right)^{\alpha _1 } \left( {\frac{{r(B_2 ,a_2 ) r(B_4 ,a_4 )}}{{\left| {a_2 - a_4 } \right|^2 }}} \right)^{\alpha _2 } \) defined on all collections consisting of points a ₁, a ₂, a ₃, a ₄ ∈ {z ∈ ℂ: |z| = 1} and pairwise-disjoint domains B ₁, B ₂, B ₃, B ₄ ⊂

such that a ₁ ∈ B ₁, a ₁ ∈ B ₂, a ₃ ∈ B ₃, and a ₄ ∈ B ₄.