The classification on simple Moufang loops

Abstract

Let C(F) be a matrix Cayley-Dickson algebra over field F. By M0(F) we denote the loop containing of all elements of algebra C(F) with norm 1. It is shown in this paper that with precision till isomorphism the loops M0(F)/<-1> they and only they are simple non-associative Moufang loops, where F are subfields of algebraic closed field