Abstract
Let △ be the open unit disk in the complex plane and let ∂△ be the unit circle. A sense-preserving homeomorphism h of ∂△ onto itself is called quasisymmetric if there exists a quasiconformal (qc) mapping f: △ →△ such that f║∂△ = h. For a quasiconformal mapping f we shall denote its complex dilatation by μ f and maximal dilatation by K f .Key wordsquasisymmetric homeomorphismquasiconformal mappingStrebel point.
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