On a family of Laurent polynomials generated by 2x2 matrices
Abstract
To a 2×2 matrix G with complex entries, we relate the sequence of Laurent polynomial Ln(z,G)= (G[smallmatrixz&0\\ 0&z-1smallmatrix]G)n. It turns out that for each \(n\), the family \Ln(z,G)\G, where G runs over the set of all 2×2 matrices, is a three-parametric family. A natural parametrization of this family is found. The polynomial Ln(z,G) is expressed in terms of these parameters and the Chebyshev polynomial Tn. The zero set of the polynomial Ln(z,G) is described.
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