The following publications are possibly variants of this publication:
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- Affine equivalence of cubic homogeneous rotation symmetric functionsThomas W. Cusick. isci, 181(22):5067-5083, 2011. [doi]
- Permutation equivalence of cubic rotation symmetric Boolean functionsThomas W. Cusick. ijcm, 92(8):1568-1573, 2015. [doi]
- Affine equivalence for quadratic rotation symmetric Boolean functionsAlexandru Chirvasitu, Thomas W. Cusick. dcc, 88(7):1301-1329, 2020. [doi]
- Affine equivalence classes of 2-rotation symmetric cubic Boolean functionsElizabeth M. Reid, Thomas W. Cusick. ijcmcst, 3(3):145-159, 2018. [doi]
- Affine equivalence of quartic homogeneous rotation symmetric Boolean functionsThomas W. Cusick, Younhwan Cheon. isci, 259:192-211, 2014. [doi]
- Affine equivalence of monomial rotation symmetric Boolean functions: A PĆ³lya's theorem approachThomas W. Cusick, K. V. Lakshmy, Madathil Sethumadhavan. jmc, 10(3-4):145-156, 2016. [doi]
- Equivalence classes for cubic rotation symmetric functionsAlyssa Brown, Thomas W. Cusick. ccds, 5(2):85-118, 2013. [doi]
- Weights of Boolean cubic monomial rotation symmetric functionsMaxwell L. Bileschi, Thomas W. Cusick, Daniel Padgett. ccds, 4(2):105-130, 2012. [doi]
- Recursion orders for weights of Boolean cubic rotation symmetric functionsThomas W. Cusick, Bryan Johns. DAM, 186:1-6, 2015. [doi]
- Counting equivalence classes for monomial rotation symmetric Boolean functions with prime dimensionThomas W. Cusick, Pantelimon Stanica. ccds, 8(1):67-81, 2016. [doi]