scholarly journals AUTOMORPHIC EQUIVALENCE PROBLEM FOR FREE ASSOCIATIVE ALGEBRAS OF RANK TWO

2007 ◽  
Vol 17 (02) ◽  
pp. 221-234 ◽  
Author(s):  
VESSELIN DRENSKY ◽  
JIE-TAI YU
Keyword(s):  
Associative Algebra ◽  
Simple Proof ◽  
Equivalence Problem ◽  
Free Associative Algebra ◽  
Associative Algebras ◽  
Nontrivial Automorphism ◽  
Simpler Algorithm ◽  
Unpublished Thesis ◽  
Rank 2 ◽  
Automorphic Equivalence

Let K 〈x,y〉 be the free associative algebra of rank 2 over an algebraically closed constructive field of any characteristic. We present an algorithm which decides whether or not two elements in K 〈x,y〉 are equivalent under an automorphism of K 〈x,y〉. A modification of our algorithm solves the problem whether or not an element in K 〈x,y〉 is a semiinvariant of a nontrivial automorphism. In particular, it determines whether or not the element has a nontrivial stabilizer in Aut K 〈x,y〉. An algorithm for equivalence of polynomials under automorphisms of ℂ[x,y] was presented by Wightwick. Another, much simpler algorithm for automorphic equivalence of two polynomials in K[x,y] for any algebraically closed constructive field K was given by Makar-Limanov, Shpilrain, and Yu. In our approach we combine an idea of the latter three authors with an idea from the unpublished thesis of Lane used to describe automorphisms which stabilize elements of K 〈x,y〉. This also allows us to give a simple proof of the corresponding result for K[x,y] obtained by Makar-Limanov, Shpilrain, and Yu.

Standard Gröbner-Shirshov Bases of Free Algebras Over Rings, I

1998 ◽  
Vol 08 (06) ◽  
pp. 689-726 ◽  
Author(s):  
Alexander A. Mikhalev ◽  
Andrej A. Zolotykh
Keyword(s):  
Associative Algebra ◽  
Standard Basis ◽  
Free Associative Algebra ◽  
Semigroup Algebras ◽  
Finitely Generated ◽  
Associative Algebras ◽  
Standard Bases ◽  
Equality Problem ◽  
Algebra Over A Field ◽  
The Ideal

We consider standard bases of ideals of free associative algebras over rings. The main result of the article is a criterion for a subset of a free associative algebra to be a standard basis of the ideal it generates. Based on this result, we present an infinite algorithm to construct the reduced standard basis of an ideal. A generalization in case of some semigroup algebras is presented. We also describe a way to construct weak standard bases and reduced standard bases of ideals of a free associative algebra over an arbitrary finitely generated ring (over a finitely generated algebra over a field). Some examples of constructions of standard bases and of solutions of the equality problem are included.

scholarly journals THE GROUP OF AUTOMORPHISMS OF THE SEMIGROUP OF ENDOMORPHISMS OF FREE COMMUTATIVE AND FREE ASSOCIATIVE ALGEBRAS

2007 ◽  
Vol 17 (05n06) ◽  
pp. 941-949 ◽  
Author(s):  
A. BERZINS
Keyword(s):  
Associative Algebra ◽  
Free Associative Algebra ◽  
Associative Algebras ◽  
Group Of Automorphisms

Let W(X) be a free commutative or a free associative algebra. The group of automorphisms of the semigroup End (W(X)) is studied.

On the augmentation topology of automorphism groups of affine spaces and algebras

2018 ◽  
Vol 28 (08) ◽  
pp. 1449-1485 ◽  
Author(s):  
Alexei Kanel-Belov ◽  
Jie-Tai Yu ◽  
Andrey Elishev
Keyword(s):  
Automorphism Group ◽  
Associative Algebra ◽  
Automorphism Groups ◽  
Jacobian Conjecture ◽  
Free Associative Algebra ◽  
Topological Properties ◽  
Negative Solution ◽  
Base Field ◽  
Associative Algebras ◽  
Affine Spaces

We study topological properties of Ind-groups [Formula: see text] and [Formula: see text] of automorphisms of polynomial and free associative algebras via Ind-schemes, toric varieties, approximations, and singularities. We obtain a number of properties of [Formula: see text], where [Formula: see text] is the polynomial or free associative algebra over the base field [Formula: see text]. We prove that all Ind-scheme automorphisms of [Formula: see text] are inner for [Formula: see text], and all Ind-scheme automorphisms of [Formula: see text] are semi-inner. As an application, we prove that [Formula: see text] cannot be embedded into [Formula: see text] by the natural abelianization. In other words, the Automorphism Group Lifting Problem has a negative solution. We explore close connection between the above results and the Jacobian conjecture, as well as the Kanel-Belov–Kontsevich conjecture, and formulate the Jacobian conjecture for fields of any characteristic. We make use of results of Bodnarchuk and Rips, and we also consider automorphisms of tame groups preserving the origin and obtain a modification of said results in the tame setting.

scholarly journals Odd automorphisms of two generated braided free associative algebras

2020 ◽  
Vol 131 (2) ◽  
pp. 42-50
Author(s):  
R. Mutalip ◽  
◽  
A.S. Naurazbekova ◽  
Keyword(s):  
Associative Algebra ◽  
Free Associative Algebra ◽  
Arbitrary Field ◽  
Associative Algebras ◽  
Alpha Beta

It is proved that an endomorphism $\varphi$ of an braided free associative algebra in two generators over an arbitrary field $k$ with an involutive diagonal braiding $\tau = (- 1, -1, -1, -1)$ given by the rule $\varphi (x_1) = x_1, \, \varphi (x_2) = \alpha x_2 + \beta x^m_1,$ where $\alpha, \, \beta \in k, \, m $ is an odd number, is an odd automorphism. It is also proved that the linear endomorphism $\psi$ of this algebra is an automorphism if and only if $\psi$ is affine. It is shown that the group of all automorphisms of braided free associative algebra in two variables over an arbitrary field $ k $ with an involutive diagonal braiding $ \tau = (- 1, -1, -1, -1) $ coincides with the group of odd automorphisms of this algebra.

scholarly journals Grothendieck groups of twisted free associative algebras

1977 ◽  
Vol 18 (2) ◽  
pp. 193-196
Author(s):  
Koo-Guan Choo
Keyword(s):  
Associative Algebra ◽  
Associative Ring ◽  
Free Associative Algebra ◽  
Associative Algebras ◽  
Grothendieck Groups

Let R be an associative ring with identity, X a set of noncommuting variables, = {αx} x ∈ X a set of automorphisms αx of R and R {X} the -twisted free associative algebra on X over R. Let Y be another set of noncommuting variables, ℬ = {βy}y∈Y a set of automorphisms βy of R {X} and S = (R{X})ℬ {Y} the ℬ-twisted free associative algebra on Y over R{X}. Next, let X1 be a set of noncommuting variables, for each l = 1,2,…. We form the free associative algebra S1 = S{X1}on Xl over S and inductively, we form the free associative algebra Sl+1 = Sl{Xl+1} on Xl+1 over Sl, l = 1,2,….

scholarly journals TAME AUTOMORPHISMS FIXING A VARIABLE OF FREE ASSOCIATIVE ALGEBRAS OF RANK THREE

2007 ◽  
Vol 17 (05n06) ◽  
pp. 999-1011 ◽  
Author(s):  
VESSELIN DRENSKY ◽  
JIE-TAI YU
Keyword(s):  
Associative Algebra ◽  
Free Associative Algebra ◽  
Associative Algebras

We study automorphisms of the free associative algebra K〈x,y,z〉 over a field K which fix the variable z. We describe the structure of the group of z-tame automorphisms and derive algorithms which recognize z-tame automorphisms and z-tame coordinates.

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