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arxiv: 1711.02492 · v2 · pith:AD6WZ6BAnew · submitted 2017-11-07 · 🧮 math.DS · math.NT

Binary constant-length substitutions and Mahler measures of Borwein polynomials

classification 🧮 math.DS math.NT
keywords mahlerbinaryconstant-lengthmeasuressubstitutionsborweindynamicshaving
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We show that the Mahler measure of every Borwein polynomial -- a polynomial with coefficients in $ \{-1,0,1 \}$ having non-zero constant term -- can be expressed as a maximal Lyapunov exponent of a matrix cocycle that arises in the spectral theory of binary constant-length substitutions. In this way, Lehmer's problem for height-one polynomials having minimal Mahler measure becomes equivalent to a natural question from the spectral theory of binary constant-length substitutions. This supports another connection between Mahler measures and dynamics, beyond the well-known appearance of Mahler measures as entropies in algebraic dynamics.

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