Christoph baxa
WebJan 28, 2009 · C. Baxa Published 28 January 2009 Mathematics, Philosophy We prove that every γ > log 1+√5/2 is the Levy constant of a transcendental number; i.e., there exists a … WebFaculties and Centers Faculty of Mathematics Department of Mathematics Kontakt: Mail: [email protected] Sekretariat: Phone: +43-1-4277-50601 Fax: +43-1-4277-9506 http://mathematik.univie.ac.at/ Oskar-Morgenstern-Platz 1, 1090 Wien Kolingasse 14-16, 1090 Wien Head: Radu Ioan Bot Deputy Head: Ilse Fischer
Christoph baxa
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WebChristoph Baxa Homepage: http://www.mat.univie.ac.at/~baxa/ Fields of interest: My research interests are uniform distribution with emphasis on discrepancies of special sequences, and continued fractions and their connections with Diophantine approximation. Furthermore, I take an active interest in Hilbert's Tenth Problem. Selected publications http://yadda.icm.edu.pl/yadda/element/bwmeta1.element.bwnjournal-article-aav81i4p357bwm
WebChristoph Baxa. Search within Christoph Baxa's work. Search Search. Home Christoph Baxa. Christoph Baxa. Skip slideshow. Most frequent co-Author ... WebTed Baxa has 736 books on Goodreads, and is currently reading Kochland: The Secret History of Koch Industries and Corporate Power in America by Christoph...
WebOct 8, 1996 · autor Christoph Baxa Institut für Mathematik, Universität Wien, Strudlhofgasse 4, A-1090 Wien, Austria Bibliografia [1] A. Baker, Continued fractions of transcendental numbers, Mathematika 9 (1962), 1-8. [2] A. Baker, On Mahler's classification of transcendental numbers, Acta Math. 111 (1964), 97-120. WebCHRISTOPH BAXA (Communicated by Ken Ono) Abstract. We prove that everyγ ≥log1+ 5 2 is the L´evy constant of a tran- scendental number; i.e., there exists a transcendental numberαsuch thatγ= lim m→∞ 1 m logqm(α), whereqm(α) denotes the denominator of themth conver- gent ofα. 1.
WebChristoph Baxa ABSTRACT. An irrational number fi is said to have L¶evy constant fl(fi) if the limit lim m!1 1 m logqm(fi) =: fl(fi) exists where qm(fi) denotes the denominator of the mth convergent of fi. We give a new proof of the fact that the L¶evy constants of quadratic irrationalities are dense in the interval £ log 1+ p 5 2;+1 ¢.
WebAbstract. We give a necessary and sufficient condition for the relation to hold as N → ∞. Here α is an irrational number, {x} denotes the fractional part of x and f is from a suitable … quartet inview custom whiteboardWebC. Baxa's 22 research works with 70 citations and 334 reads, including: The number of solutions of a Diophantine equation over a recursive ring ship manufacturing companies in worldWebChristoph Baxa. "Some Remarks on the Distribution of a Sequence Connected with $\zeta(\frac12)$." Experiment. Math.11(4)465 - 468,2002. Information Published: 2002 … ship manufacturing companies in usaWebWork. Former Customer Egineer II at NCR Corporation. 2014 - 2016. Former CSM at Walmart. May 2010 - 2014·Buckhannon, West Virginia. ship manufacturing companiesWebChristoph Baxa CONTENTS 1. Introduction 2. Uniformly Distributed Sequences 3. Concluding Remarks Acknowledgments References 2000 AMS Subject Classification: Primary 11K31, 11M06; Secondary 11K38 Keywords: Riemann zeta-function, uniform distribution, discrepancy As a complement to a recent paper by Jade Vinson we study … shipman va countyWebCHRISTOPH BAXA (Communicated by Ken Ono) ABSTRACT. We prove that every 'y > log 1+ is the Levy constant of a tran scendental number; i.e., there exists a transcendental number a such that -y = lim m log qm (a), where q, (a) denotes the denominator of the mth conver gent of a. 1. INTRODUCTION shipman united methodist churchWeb358 C. Baxa It is the purpose of the present paper to strengthen these results and to prove: Theorem 1. Let Bt:= {α∈B αis transcendental}and Bu:= {α∈ B αis a U2-number}.Then ν∗(Bt) = ν∗(Bu) = [ν∗([2]),∞). Theorem 2. Let Bt b:= {α ∈Bb αis transcendental}and Bu b:= {α∈Bb αis a U2-number}(where again b≥4 is assumed to be an even integer shipman va news