Lucas-Sierpinski and Lucas-Riesel numbers D Baczkowski, O Fasoranti, CE Finch Fibonacci Quart 49, 334-339, 2011 | 10 | 2011 |
ON VALUES OF d (n!)/m!, phi(n!)/m! AND sigma(n!)/m! D Baczkowski, M Filaseta, F Luca, O Trifonov International Journal of Number Theory 6 (6), 1199-1214, 2010 | 8* | 2010 |
Polygonal, Sierpinski, and Riesel Numbers. D Baczkowski, J Eitner, CE Finch, B Suminski, M Kozek J. Integer Seq. 18 (8), 15.8.1, 2015 | 6 | 2015 |
Counting the decimation classes of binary vectors with relatively prime length and density JS Turner, DA Bulutoglu, D Baczkowski, AJ Geyer Journal of Algebraic Combinatorics 55 (1), 61-87, 2022 | 5 | 2022 |
ON VALUES OF d (n!)/m!, ϕ (n!)/m! AND σ (n!)/m! D Baczkowski, M Filaseta, F Luca, O Trifonov International Journal of Number Theory 6 (06), 1199-1214, 2010 | 4 | 2010 |
Polygonal-Sierpinski-Riesel Sequences with Terms Having at Least Two Distinct Prime Divisors. D Baczkowski, J Eitner Integers 16, A40, 2016 | 3 | 2016 |
Polygonal, Sierpiński, and Riesel numbers D Baczkowski, J Eitner, CE Finch, M Kozek, B Suminski J. Integer Seq 18, 2015 | 2 | 2015 |
Applications of the hardy-littlewood circle method D Baczkowski | 1 | 2008 |
Diophantine equations involving arithmetic functions of factorials DM Baczkowski Miami University, 2004 | 1 | 2004 |
Decimation classes of nonnegative integer vectors using multisets DM Baczkowski, DA Bulutoglu arXiv preprint arXiv:2310.00403, 2023 | | 2023 |
POLYGONAL NUMBERS THAT CANNOT BE REPRESENTED AS pa ± qb. D Baczkowski, J Eitner Journal of Combinatorics & Number Theory 10 (1), 2018 | | 2018 |
COVERING SYSTEMS IN NUMBER FIELDS D BACZKOWSKI, A BLODGETT | | |
A Smorgasbord of Applications of Fourier Analysis to Number Theory D Baczkowski | | |