Boyd's conjecture
Abstract
We determine the limit of the rate n,an between the number n,a of roots of the trinomial xn-ax-1, a∈ (0,2], which are greater than 1 in modulus, and degree n. The analogue of Boyd's Conjecture (C) for Perron numbers is a consequence of the limit, under the assumption that the conjecture of Lind-Boyd is valid. The product of these n,a roots has also a limit when n∞. The explicit expression of the limit by an integral is presented. The computing of the rate and the product for n=100,150 as well as of its limits is presented.
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