Sums of Fibonacci numbers close to a power of 2
Speaker: Elchin Hasanalizade
Date: Mon, Oct 17, 2022
Location: PIMS, University of Lethbridge, Zoom, Online
Conference: Lethbridge Number Theory and Combinatorics Seminar
Subject: Mathematics, Number Theory
Class: Scientific
Date: Mon, Oct 17, 2022
Location: PIMS, University of Lethbridge, Zoom, Online
Conference: Lethbridge Number Theory and Combinatorics Seminar
Subject: Mathematics, Number Theory
Class: Scientific
Abstract:
Elchin Hasanalizade (University of Lethbridge, Canada)
The Fibonacci sequence \(F(n) : (n\geq 0) is the binary recurrence sequence defined by
$$
F(0) = F(1) = 1 \qquad \mbox{and} \\
F(n+2) = F(n+1) + F(n) \qquad \forall n \geq 0.
$$
There is a broad literature on the Diophantine equations involving the Fibonacci numbers. In this talk, we will study the Diophantine inequality
$$
\left\lvert F(n) + F(m) − 2a\right\rvert < 2a/2
$$
in positive integers n,m and a with $n \geq m$. The main tools used are lower bounds for linear forms in logarithms due to Matveev and Dujella-Petho version of the Baker-Davenport reduction method in Diophantine approximation.
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