Bi-element representations of ternary groups
arXiv:math/0306210 · doi:10.1080/00927870500542564
Abstract
General properties of ternary semigroups and groups are considered. The bi-element representation theory in which every representation matrix corresponds to a pair of elements is built, connection with the standard theory is considered and several concrete examples are constructed. For clarity the shortened versions of classical Gluskin-Hosszú and Post theorems are given for them.
18 pages, AmSLaTeX