On linear combinations of Chebyshev polynomials
Abstract
We investigate an infinite sequence of polynomials of the form: \[a0Tn(x)+a1Tn-1(x)+·s+amTn-m(x)\] where (a0,a1,…,am) is a fixed m-tuple of real numbers, a0,am0, Ti(x) are Chebyshev polynomials of the first kind, n=m,m+1,m+2,… Here we analyse the structure of the set of zeros of such polynomial, depending on A and its limit points when n tends to infinity. Also the expression of envelope of the polynomial is given. An application in number theory, more precise, in the theory of Pisot and Salem numbers is presented.
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