Add to ORKGWe construct finitely generated nil algebras with prescribed growth rate. In particular, any increasing submultiplicative function is realized as the growth function of a nil algebra up to a polynomial error term and an arbitrarily slow distortion. We then move on to examples of nil algebras and domains with strongly oscillating growth functions and construct primitive algebras for which the Gelfand-Kirillov dimension is strictly sub-additive with respect to tensor products, thus answering a question raised by Krempa-Okninski and Krause-Lenagan
We study codimension growth of infinite dimensional Lie algebras over a field of characteristic zero...
AbstractThe problem of calculating the growth of a finitely generated (f.g.) semigroup satisfying th...
This dissertation is devoted to the study of the growth of algebras and formal languages. It consist...
The research is motivated by a construction of groups of oscillating growth by Kassabov and Pak [25]...
AbstractLenagan and Smoktunowicz (2007) [LS] (see also Lenagan, Smoktunowicz and Young (in press) [L...
AbstractIn this paper we discuss some recent results on two different types of growth of Lie algebra...
AbstractLet F be a field of characteristic zero and let A be an F-algebra. The polynomial identities...
Let A be a (non-necessarily associative) finite-dimensional algebra over a field of characteristic z...
AbstractLet A be a (non-necessarily associative) finite-dimensional algebra over a field of characte...
We construct three examples of affine, associative algebras with relatively low growth. We construct...
A non-nilpotent variety of algebras is almost nilpotent if any proper subvariety is nilpotent. Let t...
We construct a non-associative algebra A over a field of characteristic zero with the following prop...
This project was partially supported by RFBR, grants 99-01-00233, 98-01-01020 and 00-15-96128.We stu...
We consider uniform exponential growth in algebras. We give conditions for the uniform exponential g...
In this paper we prove that if A is any algebra with involution * satisfying a non-trivial polynomia...
We study codimension growth of infinite dimensional Lie algebras over a field of characteristic zero...
AbstractThe problem of calculating the growth of a finitely generated (f.g.) semigroup satisfying th...
This dissertation is devoted to the study of the growth of algebras and formal languages. It consist...
The research is motivated by a construction of groups of oscillating growth by Kassabov and Pak [25]...
AbstractLenagan and Smoktunowicz (2007) [LS] (see also Lenagan, Smoktunowicz and Young (in press) [L...
AbstractIn this paper we discuss some recent results on two different types of growth of Lie algebra...
AbstractLet F be a field of characteristic zero and let A be an F-algebra. The polynomial identities...
Let A be a (non-necessarily associative) finite-dimensional algebra over a field of characteristic z...
AbstractLet A be a (non-necessarily associative) finite-dimensional algebra over a field of characte...
We construct three examples of affine, associative algebras with relatively low growth. We construct...
A non-nilpotent variety of algebras is almost nilpotent if any proper subvariety is nilpotent. Let t...
We construct a non-associative algebra A over a field of characteristic zero with the following prop...
This project was partially supported by RFBR, grants 99-01-00233, 98-01-01020 and 00-15-96128.We stu...
We consider uniform exponential growth in algebras. We give conditions for the uniform exponential g...
In this paper we prove that if A is any algebra with involution * satisfying a non-trivial polynomia...
We study codimension growth of infinite dimensional Lie algebras over a field of characteristic zero...
AbstractThe problem of calculating the growth of a finitely generated (f.g.) semigroup satisfying th...
This dissertation is devoted to the study of the growth of algebras and formal languages. It consist...