Chebyshev polynomials on equipotential curves
Abstract
For an analytic function φ(z) with a Laurent expansion at ∞ of the form equation* φ(z)=z+c0+c1z+c2z2+·s, equation* the Faber polynomial Fn of degree n associated to φ is the polynomial part of the Laurent series at ∞ of φ(z)n. We prove that the nth Chebyshev polynomial Tn,Lr for the equipotential curve Lr=\z∈ C:|φ(z)|=r \ converges to Fn as r∞. The proof makes use of the fact that zero is the strongly unique best approximation to the monomial zn on the unit circle by polynomials of degree less than n.
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