共查询到20条相似文献,搜索用时 31 毫秒
1.
Artūras Dubickas 《Monatshefte für Mathematik》2004,141(2):119-126
We investigate which algebraic numbers can be Mahler measures. Adler and Marcus showed that these must be Perron numbers. We prove that certain integer multiples of every Perron number are Mahler measures. The results of Boyd give some necessary conditions on Perron number to be a measure. These do not include reciprocal algebraic integers, so it would be of interest to find one which is not a Mahler measure. We prove a result in this direction. Finally, we show that for every non-negative integer k there is a cubic algebraic integer having norm 2 such that precisely the kth iteration of its Mahler measure is an integer. 相似文献
2.
Artūras Dubickas 《Czechoslovak Mathematical Journal》2006,56(3):949-956
We prove that every cyclic cubic extension E of the field of rational numbers contains algebraic numbers which are Mahler measures but not the Mahler measures of algebraic
numbers lying in E. This extends the result of Schinzel who proved the same statement for every real quadratic field E. A corresponding conjecture is made for an arbitrary non-totally complex field E and some numerical examples are given. We also show that every natural power of a Mahler measure is a Mahler measure. 相似文献
3.
这篇文章给出了满足Mahler型代数函数方程的函数值的p-adic超越度量. 相似文献
4.
In this paper,we give the algebraic independence measures for the values of Mahler type functions in complex number field and p-adic number field,respectively. 相似文献
5.
Let M() be the Mahler measure of an algebraic number and let G() be the modulus of the product of logarithms of absolute values of its conjugates. We prove that if is a nonreciprocal algebraic number of degree d 2 then M()2
G()1/d
1/2d. This estimate is sharp up to a constant. As a main tool for the proof we develop an idea of Cassels on an estimate for the resultant of and 1/. We give a number of immediate corollaries, e.g., some versions of Smyth's inequality for the Mahler measure of a nonreciprocal algebraic integer from below. 相似文献
6.
Michael J. Mossinghoff. 《Mathematics of Computation》1998,67(224):1697-1705
We describe several searches for polynomials with integer coefficients and small Mahler measure. We describe the algorithm used to test Mahler measures. We determine all polynomials with degree at most 24 and Mahler measure less than , test all reciprocal and antireciprocal polynomials with height 1 and degree at most 40, and check certain sparse polynomials with height 1 and degree as large as 181. We find a new limit point of Mahler measures near , four new Salem numbers less than , and many new polynomials with small Mahler measure. None has measure smaller than that of Lehmer's degree 10 polynomial.
7.
8.
K. Mahler introduced the concept of perfect systems in the theory of simultaneous Hermite–Padé approximation of analytic functions. Recently, we proved that Nikishin systems, generated by measures with bounded support and non-intersecting consecutive supports contained on the real line, are perfect. Here, we prove that they are also perfect when the supports of the generating measures are unbounded or touch at one point. As an application, we give a version of the Stieltjes theorem in the context of simultaneous Hermite–Padé approximation. 相似文献
9.
Hirotaka Akatsuka 《Journal of Number Theory》2009,129(11):2713-2734
We introduce the zeta Mahler measure with a complex parameter, whose derivative is a generalization of the classical Mahler measure. We study a fundamental theory of the zeta Mahler measure, including holomorphic regions and transformation formulas. We also express some specific examples of zeta Mahler measures in terms of hypergeometric functions. 相似文献
10.
Artūras Dubickas 《Archiv der Mathematik》2007,88(1):29-34
Let K be a number field. We prove that the set of Mahler measures M(α), where α runs over every element of K, modulo 1 is everywhere dense in [0, 1], except when
or
, where D is a positive integer. In the proof, we use a certain sequence of shifted Pisot numbers (or complex Pisot numbers) in K and show that the corresponding sequence of their Mahler measures modulo 1 is uniformly distributed in [0, 1].
Received: 24 March 2006 相似文献
11.
Borwein Peter; Hare Kevin G.; Mossinghoff Michael J. 《Bulletin London Mathematical Society》2004,36(3):332-338
The minimum value of the Mahler measure of a nonreciprocal polynomialwhose coefficients are all odd integers is proved here to bethe golden ratio. The smallest measures of reciprocal polynomialswith ±1 coefficients and degree at most 72 are also determined.2000 Mathematics Subject Classification 11R09 (primary), 11C08,11Y40 (secondary). 相似文献
12.
13.
Matilde N. Lalín 《Journal of Number Theory》2008,128(5):1231-1271
In this work we apply the techniques that were developed in [M.N. Lalín, An algebraic integration for Mahler measure, Duke Math. J. 138 (2007), in press] in order to study several examples of multivariable polynomials whose Mahler measure is expressed in terms of special values of the Riemann zeta function or Dirichlet L-series. The examples may be understood in terms of evaluations of regulators. Moreover, we apply the same techniques to the computation of generalized Mahler measures, in the sense of Gon and Oyanagi [Y. Gon, H. Oyanagi, Generalized Mahler measures and multiple sine functions, Internat. J. Math. 15 (5) (2004) 425-442]. 相似文献
14.
张瑾 《纯粹数学与应用数学》2009,25(4):786-788
研究一个包含伪Smarandache函数及其对偶函数方程的可解性,利用初等及组合方法给出了该方程的一系列正整数解,并证明了该方程的所有奇数解必为奇素数p(≥5)的方幂. 相似文献
15.
In this paper, we introduce and study several norms which are constructed in order to satisfy an extremal property with respect to the Mahler measure. These norms are a natural generalization of the metric Mahler measure introduced by Dubickas and Smyth. We show that bounding these norms on a certain subspace implies Lehmer?s conjecture and in at least one case that the converse is true as well. We evaluate these norms on a class of algebraic numbers that include Pisot and Salem numbers, and for surds. We prove that the infimum in the construction is achieved in a certain finite dimensional space for all algebraic numbers in one case, and for surds in general, a finiteness result analogous to that of Samuels and Jankauskas for the t-metric Mahler measures. 相似文献
16.
R. Tijdeman 《Journal of Number Theory》1973,5(1):80-94
This is an improvement on some estimates of exponential polynomials proved by Gelfond, Mahler, and Baker. This type of estimate is useful in the theory of transcendental numbers. 相似文献
17.
We prove several identities relating three-variable Mahler measures to integrals of inverse trigonometric functions. After deriving closed forms for most of these integrals, we obtain ten explicit formulas for three-variable Mahler measures. Several of these results generalize formulas due to Condon and Lalín. As a corollary, we also obtain three q-series expansions for the dilogarithm. 相似文献
18.
A. Dubickas 《Lithuanian Mathematical Journal》2001,41(3):232-238
We give an upper bound for the modulus of the first non–zero trace among natural powers of an algebraic integer of small house. An upper bound for this power is obtained for the Pisot and Salem numbers. Although the house of these numbers is not at all small, similar bounds for the first non–zero trace are also established. Finally, we give an upper bound for the trace of an algebraic number with the Mahler measure bounded above by the square root of the degree. 相似文献
19.
The Ramanujan Journal - We use the elliptic regulator to prove an identity between the Mahler measures of a genus 3 polynomial family and of a genus 1 polynomial family that was initially... 相似文献
20.
The Ramanujan Journal - In this paper we study the Mahler measures of two families of Laurent polynomials. We prove several three-variable Mahler measure formulas initially conjectured by D. Samart. 相似文献