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Abstract: We consider the numerical ranges of composition operators on the Hardy space H^2 and, for inducing maps that fix a point of the unit disc, completely describe when zero is in the numerical range of the associated composition operator. We show that if zero is not in the numerical range then the operator is strictly positive definite, and in this case we determine when the numerical range lies in an acute sector of the right half-plane.In the course of our investigation we uncover surprising connections between composition operators, Chebyshev polynomials, and Pascal matrices.
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