Fibonacci Numbers and Vieta Jumping for a Rational Diophantine Equation
Abstract
We study the Diophantine equation a+1b + b+1a \ = \ k, where k is an integer. Using Vieta jumping, we completely classify all positive integer pairs (a, \, b). We prove that the associated integer value k can only be 3 or 4. The corresponding solution pairs (a,\,b) are related to the classical Fibonacci numbers. As a consequence, the quantity a+b(a, \,b)2 takes only the values 1, \, 2, \, 3 and 5. This reveals an unexpected connection between a simple rational Diophantine condition, Vieta jumping, and Fibonacci numbers.
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