Thomas W. Cusick
Affiliations: | State University of New York, Buffalo, Buffalo, NY, United States |
Area:
MathematicsGoogle:
"Thomas Cusick"Children
Sign in to add trainee| Younhwan Cheon | grad student | 2005 | SUNY Buffalo |
| Lavinia C. Ciungu | grad student | 2010 | SUNY Buffalo |
| Alyssa Brown | grad student | 2012 | SUNY Buffalo |
| Bryan R. Johns | grad student | 2013 | SUNY Buffalo |
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Publications
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| Cusick TW, Cheon Y. (2021) Weights for short quartic Boolean functions Information Sciences. 547: 18-27 |
| Cusick TW, Cheon Y, Dougan K. (2020) Equivalence of 2-rotation symmetric quartic Boolean functions Information Sciences. 508: 358-379 |
| Chirvasitu A, Cusick TW. (2020) Affine equivalence for quadratic rotation symmetric Boolean functions Designs, Codes and Cryptography. 88: 1301-1329 |
| Cusick TW. (2018) Weight Recursions for Any Rotation Symmetric Boolean Functions Ieee Transactions On Information Theory. 64: 2962-2968 |
| Cusick TW. (2017) Highly nonlinear plateaued functions Iet Information Security. 11: 78-81 |
| Cusick TW, Lakshmy KV, Sethumadhavan M. (2016) Affine equivalence of monomial rotation symmetric Boolean functions: A Pólya’s theorem approach Journal of Mathematical Cryptology. 10: 145-156 |
| Cusick TW. (2016) Hamming weights of symmetric Boolean functions Discrete Applied Mathematics |
| Cusick TW, Stănică P. (2016) Counting equivalence classes for monomial rotation symmetric Boolean functions with prime dimension Cryptography and Communications. 8: 67-81 |
| Cusick TW, Cheon Y. (2015) Theory of 3-rotation symmetric cubic Boolean functions Journal of Mathematical Cryptology. 9: 45-62 |
| Cusick TW. (2015) Permutation equivalence of cubic rotation symmetric Boolean functions International Journal of Computer Mathematics. 92: 1568-1573 |