Self-Similar Structure of k- and Biperiodic Fibonacci Words

Darby Bortz; Nicholas Cummings; Suyi Gao; Elias Jaffe; Lan Mai; Benjamin Steinhurst; Pauline Tillotson

doi:10.46787/pump.v7i0.3334

Self-Similar Structure of k- and Biperiodic Fibonacci Words

Authors

Darby Bortz Washington County Public Schools
Nicholas Cummings Tufts University
Suyi Gao Purdue University
Elias Jaffe Acclaim Technical Services
Lan Mai University of Delaware
Benjamin Steinhurst McDaniel College
Pauline Tillotson McDaniel College

DOI:

https://doi.org/10.46787/pump.v7i0.3334

Keywords:

fractals; Fibonacci words; biperiodic Fibonacci words; L-systems; iterated function systems

Abstract

Defining the biperiodic Fibonacci words as a class of words over the alphabet {0,1}, and two specializations the k-Fibonacci and classical Fibonacci words, we provide a self-similar decomposition of these words into overlapping words of the same type. These self-similar decompositions complement the previous literature where self-similarity was indicated but the specific structure of how the pieces interact was left undiscussed.

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Published

2024-01-11

How to Cite

Bortz, D., Cummings, N., Gao, S., Jaffe, E., Mai, L., Steinhurst, B., & Tillotson, P. (2024). Self-Similar Structure of k- and Biperiodic Fibonacci Words. The PUMP Journal of Undergraduate Research, 7, 1–13. https://doi.org/10.46787/pump.v7i0.3334

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Issue

Vol. 7 (2024): PUMP Journal of Undergraduate Research

Section

Articles

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