V. Flammang, Sur la longueur des entiers algebriques totalement positifs, J. Number Theory 54 (1995), 60-72. Home/Search Document Not in Database Summary Related Articles Check |
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Chebyshev Polynomials With Integer Coefficients - Pritsker (Correct)
....various optimization techniques. Although this is by no means straightforward, both theoretically and practically, this nevertheless becomes more accessible for computations with growing power of modern computers. Thus, the upper bound in (1. 7) has recently been improved several times (cf. 3] [6], 7] and [9] The value in (1.7) is taken from [9] and to our knowledge is the best computed upper bound. 4 IGOR E. PRITSKER 2. Asymptotic structure of the integer Chebyshev polynomials We are interested in the asymptotic structure of the polynomials Q n 2 P n (Z) satisfying kQ n k [0;1] ....
V. Flammang, Sur la longueur des entiers alg'ebriques totalement positifs, J. Number Theory 54 (1995), 60-72.
Small Polynomials With Integer Coefficients - Pritsker (Correct)
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V. Flammang, Sur la longueur des entiers algebriques totalement positifs, J. Number Theory 54 (1995), 60-72.
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