Trevor Clokie scite author profile

Trevor Clokie

5Publications

6Citation Statements Received

38Citation Statements Given

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Affiliations

University of Waterloo

Publications

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Circularly Squarefree Words and Unbordered Conjugates: A New Approach

Clokie

Gabric

Shallit

2019

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Using a new approach based on automatic sequences, logic, and a decision procedure, we reprove some old theorems about circularly squarefree words and unbordered conjugates in a new and simpler way. Furthermore, we prove three new results about unbordered conjugates: we complete the classification, due to Harju and Nowotka, of binary words with the maximum number of unbordered conjugates; we prove that for every possible number, up to the maximum, there exists a word having that number of unbordered conjugates, and finally, we determine the expected number of unbordered conjugates in a random word.

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Digital Literacy for Secondary School Students: Using Computer Technology to Educate about Credibility of Content Online

Cohen¹,

Parmentier²,

Melo³

et al. 2020

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Computational aspects of sturdy and flimsy numbers

Clokie

Lidbetter²,

Lovett³

et al. 2022

Theoretical Computer Science

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Computational Fun with Sturdy and Flimsy Numbers

Clokie

Lidbetter

Lovett³

et al. 2020

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Computational Aspects of Sturdy and Flimsy Numbers

Clokie¹,

Lidbetter²,

Lovett³

et al. 2020

Preprint

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Following Stolarsky, we say that a natural number n is flimsy in base b if some positive multiple of n has smaller digit sum in base b than n does; otherwise it is sturdy. We develop algorithmic methods for the study of sturdy and flimsy numbers.We provide some criteria for determining whether a number is sturdy. Focusing on the case of base b = 2, we study the computational problem of checking whether a given number is sturdy, giving several algorithms for the problem. We find two additional, previously unknown sturdy primes. We develop a method for determining which numbers with a fixed number of 0's in binary are flimsy. Finally, we develop a method that allows us to estimate the number of k-flimsy numbers with n bits, and we provide explicit results for k = 3 and k = 5. Our results demonstrate the utility (and fun) of creating algorithms for number theory problems, based on methods of automata theory.

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Trevor Clokie

Circularly Squarefree Words and Unbordered Conjugates: A New Approach

Digital Literacy for Secondary School Students: Using Computer Technology to Educate about Credibility of Content Online

Computational aspects of sturdy and flimsy numbers

Computational Fun with Sturdy and Flimsy Numbers

Computational Aspects of Sturdy and Flimsy Numbers

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