ARITHMETICAL PROPERTIES OF POWERS OF ALGEBRAIC NUMBERS
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Publication:3377369
DOI10.1112/S0024609305017728zbMath1164.11025OpenAlexW2160380761MaRDI QIDQ3377369
Publication date: 22 March 2006
Published in: Bulletin of the London Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1112/s0024609305017728
PV-numbers and generalizations; other special algebraic numbers; Mahler measure (11R06) Distribution modulo one (11J71)
Related Items (30)
Periodic sequences modulo 1 and Pisot numbers ⋮ An approximation property of lacunary sequences ⋮ Arithmetical properties of linear recurrent sequences ⋮ On a sequence related to that of Thue-Morse and its applications ⋮ On the reduced length of a polynomial with real coefficients ⋮ Diophantine approximations with Fibonacci numbers ⋮ On the fractional parts of powers of Pisot numbers of length at most 4 ⋮ Fractional parts of powers of large rational numbers ⋮ On the two smallest Pisot numbers ⋮ An Approximation by Lacunary Sequence of Vectors ⋮ Diffraction intensities of a class of binary Pisot substitutions via exponential sums ⋮ On the reduced length of a polynomial with real coefficients. II ⋮ Fractional parts of powers and Sturmian words ⋮ Divisibility properties of certain recurrent sequences ⋮ Lower bounds for Z-numbers ⋮ A Mahler miscellany ⋮ On the distribution of powers of a complex number ⋮ An arithmetical property of powers of Salem numbers ⋮ Powers of rationals modulo 1 and rational base number systems ⋮ ON INTEGER SEQUENCES GENERATED BY LINEAR MAPS ⋮ Roots of polynomials of bounded height ⋮ ON THE FRACTIONAL PARTS OF RATIONAL POWERS ⋮ Prime and composite integers close to powers of a number ⋮ Linear recurrence sequences without zeros ⋮ Recurrence with prescribed number of residues ⋮ Seventy years of Salem numbers ⋮ Diophantine properties of powers of some Pisot numbers ⋮ Intervals without primes near elements of linear recurrence sequences ⋮ Divisibility of integers obtained from truncated periodic sequences ⋮ There are infinitely many limit points of the fractional parts of powers
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