Abstract
Let a≥ 0 , ɛ >0 . We use potential theory to obtain a sharp lower bound for the linear Lebesgue measure of the set Open image in new window. Here P is an arbitrary polynomial of degree ≤ n . We then apply this to diagonal and ray Pade sequences for functions analytic (or meromorphic) in the unit ball. For example, we show that the diagonal \left{ [n/n]\right} n=1∞ sequence provides good approximation on almost one-eighth of the circles centre 0 , and the \left{ [2n/n]\right} n=1∞ sequence on almost one-quarter of such circles.
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