Groups of generalized Moufang type and Z2-graded algebras
Abstract
A pair (G,T) is called a faithful odd transposition group if T is a normal set of involutions generating the group G and the product of any two distinct elements of T has odd order. We introduce a special subclass of such groups, a generalized Moufang group of p-type (or GM(p)-type), in which the product of any two distinct involutions from T has a fixed prime order p. For any such group (G,T) and a scalar parameter η in a field F, we construct a non-associative, non-commutative algebra A = A F(G,T,η). We prove that every element of T considered as an element of the algebra A, is a primitive semisimple idempotent, defining a Z2-grading of A. The Miyamoto group of A with respect to T is isomorphic to G/Z(G). The algebra A contains no nontrivial right ideals and, for a specific choice of the parameter η, admits a symmetric left Frobenius form. When G is a free Burnside group of odd prime period p extended by an involutory automorphism, the finiteness of G is equivalent to the finite-dimensionality of A F(G,T,η), providing a reformulation of the Burnside problem. For p=5 and η=-1/3, the algebra generated by two idempotents from T is left-axial and satisfies the Monster-type fusion law M(4/3, -4/3). For a prime p>5, the two-generated algebra is also axial, but obeys a more general fusion law. Although the algebra A F(G,T,η) is initially defined using a group GM(p)-type, we show that it admits an intrinsic, group-free characterization by axiomatizing a class of so-called GM(p,η)-type algebras. We prove that every algebra in this class is isomorphic to one arising from the construction above, establishing the equivalence of the two definitions.
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