6533b7d4fe1ef96bd12626a5

RESEARCH PRODUCT

AUTOMORPHISMS OF THE ENDOMORPHISM SEMIGROUP OF A FREE ASSOCIATIVE ALGEBRA

A. BerzinsRuvim LipyanskiAlexei Belov-kanelAlexei Belov-kanel

subject

Pure mathematicsEndomorphismGroup (mathematics)SemigroupGeneral MathematicsFree algebraAssociative algebraField (mathematics)Variety (universal algebra)AutomorphismMathematics

description

Let [Formula: see text] be the variety of associative algebras over a field K and A = K 〈x1,…, xn〉 be a free associative algebra in the variety [Formula: see text] freely generated by a set X = {x1,…, xn}, End A the semigroup of endomorphisms of A, and Aut End A the group of automorphisms of the semigroup End A. We prove that the group Aut End A is generated by semi-inner and mirror automorphisms of End A. A similar result is obtained for the automorphism group Aut [Formula: see text], where [Formula: see text] is the subcategory of finitely generated free algebras of the variety [Formula: see text]. The later result solves Problem 3.9 formulated in [17].

yearjournalcountryeditionlanguage
2007-08-01International Journal of Algebra and Computation
https://doi.org/10.1142/s0218196707003901