An upper bound for the norm of the Chebyshev polynomial on two intervals

Let E:=[−1,α]∪[β,1]E:=[−1,α]∪[β,1], −1<α<β<1−1<α<β<1, be the union of two real intervals and consider the Chebyshev polynomial of degree n on E, that is, that monic polynomial which is minimal with respect to the supremum norm on E. For its norm, called the n-th Chebyshev number of E, an upper bound in terms of elementary functions of α and β is given. The proof is based on results of N.I. Achieser in the 1930s in which the norm is estimated with the help of Zolotarev's transformation using Jacobi's elliptic and theta functions.