Hecke algebras, Specht modules and Gröbner–Shirshov bases

We show that a set of monic polynomials in a free Lie superalgebra is a Grobner᎐Shirshov basis for a Lie superalgebra if and only if it is a Grobner᎐Shirshov basis for its universal enveloping algebra. We investigate the structure of Grobner᎐Shirshov bases for Kac᎐Moody superalgebras and give ëxplic

We determine the Gröbner-Shirshov bases for finite-dimensional irreducible representations of the special linear Lie algebra sl n+1 and construct explicit monomial bases for these representations. We also show that each of these monomial bases is in 1-1 correspondence with the set of semistandard Yo

We give an account of the theory of Gröbner bases for Clifford and Grassmann algebras, both important in physical applications. We describe a characterization criterion tailored to these algebras which is significantly simpler than those given earlier or for more general non-commuting algebras. Our

It is shown that a finite-dimensional basic algebra over an algebraically closed field is representation-finite special biserial if and only if every module over it has a right Gröbner basis theory.

We define a special type of reduction in a free left module over a ring of differencedifferential operators and use the idea of the Gröbner basis method to develop a technique that allows us to determine the Hilbert function of a finitely generated differencedifferential module equipped with the nat

We present an algorithm for computing Gröbper and free canonical Schreier bestes for finitely generated ono-sided ideals in free group algebras. That is, given a zet of \(n\) elements of a free group algebra, we construct a canonical Schrejer basie of free generators as well an a Gröbnar basis for t