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The final Moufang variety: FRUTE loops

Publication at Faculty of Mathematics and Physics |
2019

Abstract

FRUTE loops are loops that satisfy the identity (x . xy)z = (y . zx)x. We show that locally finite FRUTE loops are precisely the products O x H, where O is a commutative Moufang loop in which all elements are of odd order, and H is a 2-group such that the derived subloop H' is of exponent two and H' <= Z(H).