Train algebras of degree 2 and exponent 3 (Q542533)

In this paper, the authors study the structure of a particular case of weighted algebras \(A\), namely the weighted algebras of degree \(2\) and exponent \(n\). They investigate the particular case of the weighted algebras satisfying the equation \((x^3)^2=\omega (x)^3 x^3\), where \(\omega(x)\) is the weight function of the algebra \(A\) (these algebras are called the train algebras of degree \(2\) and exponent \(3\)). The authors also give the classification of these algebras in dimension \(3\) (see Section 6, Theorem 6.1)