Comparison of hyperbolic metric and triangular ratio metric in a square
Abstract
Let K be a square in the plane and ρK(x,y) be the hyperbolic distance between x, y∈ K. Denote by sK(x,y) the triangular ratio metric in K; for x≠ y the value of sK(x,y) equals the ratio of the Euclidean distance |x-y| between x, y∈ K to the value ∈fz∈ ∂ K(|x-z|+|z-y|). We obtain a sharp estimate for the ratio of þ(ρK(x,y)/2) to sK(x,y).
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