Repdigits as Product of Fibonacci and Tribonacci Numbers

Dušan Bednařı́k, Eva Trojovská

Type: Article

Publication Date: 2020-10-07

Citations: 6

DOI: https://doi.org/10.3390/math8101720

Abstract

In this paper, we study the problem of the explicit intersection of two sequences. More specifically, we find all repdigits (i.e., numbers with only one repeated digit in its decimal expansion) which can be written as the product of a Fibonacci by a Tribonacci number (both with the same indexes). To work on this problem, our approach is to combine lower bounds from the Baker’s theory with reduction methods (based on the theory of continued fractions) due to Dujella and Pethö.

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+ PDF Chat	Fibonacci and Lucas numbers of the form $2^{a}+3^{b}+5^{c}$	2013	Diego Marques Alain Togbé
+ PDF Chat	Classical and modular approaches to exponential Diophantine equations I. Fibonacci and Lucas perfect powers	2006	Yann Bugeaud Maurice Mignotte Samir Siksek
+	Fibonacci and Lucas Numbers With Applications	2018	Thomas Koshy
+ PDF Chat	A parametric family of quartic Thue equations	2002	Andrej Dujella Borka Jadrijević
+	Fibonacci and Lucas Numbers with Applications	2001	Thomas Koshy
+	Fibonacci and Lucas numbers with only one distinct digit.	2000	Florian Luca
+ PDF Chat	On the intersection of two distinct $k$-generalized Fibonacci sequences	2012	Diego Marques