| A probable prime test with high confidence J Grantham Journal of Number Theory 72 (1), 32-47, 1998 | 66 | 1998 |
| Frobenius pseudoprimes J Grantham Mathematics of computation 70 (234), 873-891, 2001 | 61 | 2001 |
| There are infinitely many Perrin pseudoprimes J Grantham Journal of Number Theory 130 (5), 1117-1128, 2010 | 28 | 2010 |
| The largest prime dividing the maximal order of an element of 𝑆_𝑛 J Grantham Mathematics of Computation 64 (209), 407-410, 1995 | 15 | 1995 |
| Constructing Carmichael numbers through improved subset-product algorithms WR Alford, J Grantham, S Hayman, A Shallue Mathematics of Computation 83 (286), 899-915, 2014 | 11 | 2014 |
| Binary Curves of small fixed genus and gonality with many rational points X Faber, J Grantham J. Algebra, 2022 | 9 | 2022 |
| Repeatedly appending any digit to generate composite numbers J Grantham, W Jarnicki, J Rickert, S Wagon The American Mathematical Monthly 121 (5), 416-421, 2014 | 6 | 2014 |
| Ternary and quaternary curves of small fixed genus and gonality with many rational points X Faber, J Grantham Experimental Mathematics 32 (2), 337-349, 2023 | 5 | 2023 |
| On the maximum gonality of a curve over a finite field X Faber, J Grantham, EW Howe arXiv preprint arXiv:2207.14307, 2022 | 4 | 2022 |
| Finding a Widely Digitally Delicate Prime J Grantham arXiv preprint arXiv:2109.03923, 2021 | 2 | 2021 |
| The abc Conjecture Implies That Only Finitely Many s-Cullen Numbers Are Repunits J Grantham, H Graves Journal of Integer Sequences, 2021 | 2 | 2021 |
| Brazilian primes which are also Sophie Germain primes J Grantham, H Graves INTEGERS 20, 2, 2020 | 1 | 2020 |
| Fibonacci primes, primes of the form and beyond J Grantham, A Granville Journal of Number Theory, 2024 | | 2024 |
| Representing integers as a sum of three cubes J Grantham, PG Walsh arXiv preprint arXiv:2211.12149, 2022 | | 2022 |
| Only finitely many -Cullen numbers are repunits for a fixed M Filaseta, J Grantham, H Graves arXiv preprint arXiv:2112.04935, 2021 | | 2021 |
| On Integers Whose Sum is the Reverse of their Product X Faber, J Grantham arXiv preprint arXiv:2108.13441, 2021 | | 2021 |
| Proof of Two Conjectures of Andrica and Bagdasar J Grantham INTEGERS 21, 3, 2021 | | 2021 |
| An unconditional improvement to the running time of the quadratic Frobenius test J Grantham Journal of Number Theory 210, 476-480, 2020 | | 2020 |
| Collecting primes with 1163-smooth OR Reduced sets for likely solutions to the $620 problem J Grantham SERMON, 2013 | | 2013 |
| No new Goormaghtigh primes up to 2^500 J Grantham 2024 Joint Mathematics Meetings (JMM 2024), 0 | | |
John RickertProfessor of Mathematics, Rose-Hulman Institute of TechnologyVerified email at rose-hulman.edu
