Generalization of Binet's formula for Fibonacci-type numeric sequences through the use of arithmetic pseudo-operators
Abstract
This paper presents an innovative approach to the study of recurrent sequences by introducing the concept of arithmetic pseudo-operators. Unlike conventional operators, these pseudo-operators are pure complex numbers with specific structural properties, allowing for unprecedented operational reformulations. Represented by the symbols ``+'', ``/'' (slash), ``'' (aslash), ``'', ``'', and ``'', these operators correspond to rotations in the unit circle of the complex plane and generalize fundamental operations, as seen in the identities ``1 / 1 1 = 0'' and ``1 1 1 1 = 0'', which exhibit behavior analogous to conventional subtraction ``1 - 1 = 0''. Based on this structure, we reformulate Binet's equations for the Fibonacci and Tribonacci sequences and outline the path for their generalization to the Tetranacci sequence koshy. This new perspective not only enhances the understanding of higher-order recurrences but also suggests potential applications in discrete mathematics and computational algebra, expanding the scope of classical algebraic operations.
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