A Fibonacci analogue of the two’s complement numeration system

• Published in: RAIRO. Informatique théorique et applications Vol. 57
• Main Authors: Labbé, Sébastien, Lepšová, Jana
• Format: Journal Article
• Language: English
• Published: EDP Sciences 2023
• Subjects: Mathematics; transducer; numeration system; Fibonacci; Two’s complement
• ISSN: 0988-3754; 1290-385X
• DOI: 10.1051/ita/2023007

Using the classic two’s complement notation of signed integers, the fundamental arithmetic operations of addition, subtraction, and multiplication are identical to those for unsigned binary numbers. We introduce a Fibonacci-equivalent of the two’s complement notation and we show that addition in this numeration system can be performed by a deterministic finite-state transducer. The result is based on the Berstel adder, which performs addition of the usual Fibonacci representations of nonnegative integers and for which we provide a new constructive proof. Moreover, we characterize the Fibonacci-equivalent of the two’s complement notation as an increasing bijection between ℤ and a particular language.