Search Results for: 11C08

A generalization of Euler’s Criterion to composite moduli

József Vass Notes on Number Theory and Discrete Mathematics Print ISSN 1310–5132, Online ISSN 2367–8275 Volume 22, 2016, Number 3, Pages 9—19 Download full paper: PDF, 150 Kb Details Authors and affiliations József Vass Department of Algebra and Number Theory, … Continue reading

Evaluationally relatively prime polynomials

Michelle L. Knox, Terry McDonald and Patrick Mitchell Notes on Number Theory and Discrete Mathematics, ISSN 1310-5132 Volume 21, 2015, Number 1, Pages 36—41 Download full paper: PDF, 154 Kb Details Authors and affiliations Michelle L. Knox Department of Mathematics, … Continue reading

AMS Codes

This functionality is currently in “beta”. You can use the search box for specific AMS codes, which are not in the list. 00A65 05A15 05A19 05A20 05C20 05C40 05C69 11A07 11A25 11A41 11A51 11A55 11B05 11B25 11B37 11B39 11B50 11B65 … Continue reading

On the polynomial and maximal solutions to a functional equation arising from multiplication of quantum integers

Lan Nguyen Notes on Number Theory and Discrete Mathematics, ISSN 1310-5132 Volume 18, 2012, Number 4, Pages 11—39 Download full paper: PDF, 257Kb Details Authors and affiliations Lan Nguyen Department of Mathematics, University of Wisconsin-Parkside Abstract We resolve two questions … Continue reading

Expansion of integer powers from Fibonacci’s odd number triangle

J. V. Leyendekkers and A. G. Shannon Notes on Number Theory and Discrete Mathematics, ISSN 1310-5132 Volume 7, 2001, Number 2, Pages 48—59 Download full paper: PDF, 1495 Kb Details Authors and affiliations J. V. Leyendekkers The University of Sydney … Continue reading

Solutions with infinite support bases of a functional equation arising from multiplication of quantum integers

Lan Nguyen Notes on Number Theory and Discrete Mathematics, ISSN 1310-5132 Volume 20, 2014, Number 3, Pages 1—28 Download full paper: PDF, 258 Kb Details Authors and affiliations Lan Nguyen Mathematics Department, University of Michigan-Ann Arbor Ann Arbor, MI 48109, … Continue reading