Barry, Paul (2009) Continued Fractions and Transformations of Integer Sequences. Journal of Integer Sequences, 12. ISSN 1530-7638
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Official URL: https://cs.uwaterloo.ca/journals/JIS/VOL12/Barry3/...
Abstract
We show how various transformations of integer sequences, normally realized by Riordan or generalized Riordan arrays, can be translated into continued fraction form. We also examine the Deleham number triangle construction using bi-variate continued fractions, giving examples from the field of associahedra.
Item Type: | Article |
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Departments or Groups: | *NONE OF THESE* |
Divisions: | School of Science |
Depositing User: | Paul Barry |
Date Deposited: | 16 May 2013 18:38 |
Last Modified: | 22 Aug 2016 10:26 |
URI: | https://repository.wit.ie/id/eprint/2649 |
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