Computation of Minimal Homogeneous Generating Sets and Minimal Standard Bases for Ideals of Free Algebras

Abstract: Let $\KX =K\langle X_1,\ldots ,X_n\rangle$ be the free algebra generated by $X={ X_1,\ldots ,X_n}$ over a field $K$. It is shown that with respect to any weighted $\mathbb{N}$-gradation attached to $\KX$, minimal homogeneous generating sets for finitely generated graded (two-sided) ideals of $\KX$ can be algorithmically computed, and that if an ungraded (two-sided) ideal $I$ of $\KX$ has a finite Gr\"obner basis $\G$ with respect to a graded monomial ordering on $\KX$, then a minimal standard basis for $I$ can be computed via computing a minimal homogeneous generating set of the associated graded ideal $\langle\LH (I)\rangle$.