[论文解读] Some Results on dh-Closed Homogeneous Gr\"obner Bases and dh-Closed Graded Ideals

Let $K$ be a field and $R=\oplus_{p\in\mathbb{N}}R_p$ an $\mathbb{N}$-graded $K$-algebra, which has an SM $K$-basis (i.e. a skew multiplicative $K$-basis) such that $R$ holds a Grobner basis theory. It is proved that there is a one-to-one correspondence between the set of Grobner bases in $R$ and the set of dh-closed homogeneous Grobner bases in the polynomial algebra $R[t]$; and that the similar result holds true if $R$ and $R[t]$ are replaced respectively by the free algebra $K $ and the free algebra $K $. Moreover, it is shown that dh-closed graded ideals in $R[t]$ and $K $ can be realized by dh-closed homogeneous Grobner bases. The latter result indeed tells us that algebras defined by dh-homogeneous Grobner bases can be studied as Rees algebras effectively via more simpler algebras as demonstrated in ([7], [8]).