Abstract We classify small binary bibraces, using the correspondence with alternating algebras over the field F₂ F 2, up to dimension eight, also determining their isomorphism classes. These finite-dimensional algebras, defined by an alternating bilinear multiplication and nilpotency of class two, can be represented by subspaces of skew-symmetric matrices, with classification corresponding to {\, GL\, } (m, F₂) GL (m, F 2) -orbits under congruence. Our approach combines theoretical invariants, such as rank sequences and the identification of primitive algebras, with computational methods implemented in. These results also count the number of possible alternative operations that can be used in differential cryptanalysis.
Civino et al. (Tue,) studied this question.