Abstract :
Let C(w1,w2,w3) denote the circle in C through w1,w2,w3 and let w1w2 denote one of the two arcs
between w1,w2 belonging to C(w1,w2,w3). We prove that a domain Ω in the Riemann sphere, with no
antipodal points, is spherically convex if and only if for any w1,w2,w3 ∈ Ω, with w1 = w2, the arc w1w2
of the circle C(w1,w2,−1/w3 ) which does not contain −1/w3 lies in Ω. Based on this characterization
we call a domain G in the unit disk D, strongly hyperbolically convex if for any w1,w2,w3 ∈ G, with
w1 = w2, the arc w1w2 in D of the circle C(w1,w2, 1/w3 ) is also contained in G. A number of results on
conformal maps onto strongly hyperbolically convex domains are obtained.
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