Three problems for polynomials of small measure
Artūras Dubickas (2001)
Acta Arithmetica
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Displaying similar documents to “On a question of Schinzel about the length and Mahler's measure of polynomials that have a zero on the unit circle”
Three problems for polynomials of small measure
Mahler's measure of a polynomial in terms of the number of its monomials
Edward Dobrowolski (2006)
Acta Arithmetica
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Auxiliary polynomials for some problems regarding Mahler's measure
Artūras Dubickas, Michael J. Mossinghoff (2005)
Acta Arithmetica
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New methods providing high degree polynomials with small Mahler measure.
Rhin, G., Sac-Épée, J.-M. (2003)
Experimental Mathematics
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Mahler's measure and special values of -functions.
Boyd, David W. (1998)
Experimental Mathematics
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Problems of Number and Measure
Robert Morris Pierce
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Fubini’s Theorem on Measure
Noboru Endou (2017)
Formalized Mathematics
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The purpose of this article is to show Fubini’s theorem on measure [16], [4], [7], [15], [18]. Some theorems have the possibility of slight generalization, but we have priority to avoid the complexity of the description. First of all, for the product measure constructed in [14], we show some theorems. Then we introduce the section which plays an important role in Fubini’s theorem, and prove the relevant proposition. Finally we show Fubini’s theorem on measure.
Product Pre-Measure
Noboru Endou (2016)
Formalized Mathematics
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In this article we formalize in Mizar [5] product pre-measure on product sets of measurable sets. Although there are some approaches to construct product measure [22], [6], [9], [21], [25], we start it from σ-measure because existence of σ-measure on any semialgebras has been proved in [15]. In this approach, we use some theorems for integrals.
A classification of measure spaces
Robert E. Zink (1966)
Colloquium Mathematicae
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Small limit points of Mahler's measure.
Boyd, David W., Mossinghoff, Michael J. (2005)
Experimental Mathematics
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Construction of Measure from Semialgebra of Sets1
Noboru Endou (2015)
Formalized Mathematics
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In our previous article [22], we showed complete additivity as a condition for extension of a measure. However, this condition premised the existence of a σ-field and the measure on it. In general, the existence of the measure on σ-field is not obvious. On the other hand, the proof of existence of a measure on a semialgebra is easier than in the case of a σ-field. Therefore, in this article we define a measure (pre-measure) on a semialgebra and extend it to a measure on a σ-field. Furthermore,...
A problem of invariance for Lebesgue measure
James Fickett, Jan Mycielski (1979)
Colloquium Mathematicae
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On a theorem in the theory of binary relations
G. Fodor (1951)
Compositio Mathematica
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Irreducible polynomials with all but one zero close to the unit disk
DoYong Kwon (2016)
Colloquium Mathematicae
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We consider a certain class of polynomials whose zeros are, all with one exception, close to the closed unit disk. We demonstrate that the Mahler measure can be employed to prove irreducibility of these polynomials over ℚ.
Mahler measure of the Horie unit and Weber's class number problem in the cyclotomic ℤ₃-extension of ℚ
Takayuki Morisawa (2012)
Acta Arithmetica
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An alternative concept of the n-dimensional measure
Karol Borsuk (1983)
Annales Polonici Mathematici
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