On the weighted Bojanov-Chebyshev Problem and the sum of translates method of Fenton
Abstract
Minimax and maximin problems are investigated for a special class of functions on the interval [0,1]. These functions are sums of translates of positive multiples of one kernel function and a very general external field function. Due to our very general setting the obtained minimax, equioscillation, and characterization results extend those of Bojanov, Fenton, Hardin, Kendall, Saff and Ambrus, Ball, Erd\'elyi. Moreover, we discover a surprising intertwining phenomenon of interval maxima, which provides new information even in the most classical extremal problem of Chebyshev.
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