Periodic words connected with the tribonacci-Lucas numbers
From MaRDI portal
Publication:2414402
DOI10.15330/ms.49.2.181-185zbMath1439.11044OpenAlexW2903172879WikidataQ128857728 ScholiaQ128857728MaRDI QIDQ2414402
Ya. M. Kholyavka, G. Barabash, I. Tytar
Publication date: 13 May 2019
Published in: Matematychni Studiï (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.15330/ms.49.2.181-185
Transcendence theory of other special functions (11J91) Special sequences and polynomials (11B83) Fibonacci and Lucas numbers and polynomials and generalizations (11B39)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- The development of Euclidean axiomatics. The systems of principles and the foundations of mathematics in editions of the \textit{Elements} in the early modern age
- Who gave you the Cauchy-Weierstrass tale? The dual history of rigorous calculus
- Stevin numbers and reality
- Leibniz's syncategorematic infinitesimals
- Leibniz's infinitesimals: their fictionality, their modern implementations, and their foes from Berkeley to Russell and beyond
- Differentials, higher-order differentials and the derivative in the Leibnizian calculus
- Galileo and Leibniz: Different approaches to infinity
- Is Leibnizian calculus embeddable in first order logic?
- Gregory's sixth operation
- Cauchy's infinitesimals, his sum theorem, and foundational paradigms
- The Jesuits and the method of indivisibles
- On indivisibles and infinitesimals: a response to David Sherry, ``The Jesuits and the method of indivisibles
- Fermat's dilemma: Why did he keep mum on infinitesimals? and the European theological context
- Reply to Knobloch
- Approaches to analysis with infinitesimals following Robinson, Nelson, and others
- The metaphysics of the calculus: A foundational debate in the Paris Academy of Sciences, 1700-1706
- Leibniz's rigorous foundation of infinitesimal geometry by means of Riemannian sums
- Internal approach to external sets and universes. III. Partially saturated universes
- Leibniz and the infinite
- Arithmetic properties of polyadic series with periodic coefficients
- On what has been called Leibniz's rigorous foundation of infinitesimal geometry by means of Riemannian sums
- Letter to the editors of the journal \textit{Historia Mathematica}
- Cauchy, infinitesimals and ghosts of departed quantifiers
- Klein vs Mehrtens: restoring the reputation of a great modern
- Conflicts between generalization, rigor and intuition. Number concepts underlying the development of analysis in 17th--19th century France and Germany
- Éléments d'analyse de Karl Weierstrass
- Fermat, Leibniz, Euler, and the Gang: The True History of the Concepts of Limit and Shadow
- The Real and the Complex: A History of Analysis in the 19th Century
- Leibniz’s Rigorous Foundations of the Method of Indivisibles
- Is mathematical history written by the victors?
- Deux moments de la critique du calcul infinitésimal : Michel Rolle et George Berkeley
- On the strength of nonstandard analysis
- Internal set theory: A new approach to nonstandard analysis
- Period of a linear recurrence
- Almost Equal: the Method of Adequality from Diophantus to Fermat and Beyond
- Leibniz and the Structure of Sciences
- Leibniz’s Actual Infinite in Relation to His Analysis of Matter
- Comparability of Infinities and Infinite Multitude in Galileo and Leibniz
- Leibniz on The Elimination of Infinitesimals
- Leibniz’s Laws of Continuity and Homogeneity
- Periodic words connected with the Fibonacci words
- Non-standard analysis
- Recurrence and periodicity in infinite words from local periods
- What Makes a Theory of Infinitesimals Useful? A View by Klein and Fraenkel
