Determinantal ring

History

The definition that we are using follows Commutative algebra with a view towards algebraic geometry by David Eisenbud.

Definition

A commutative unital ring ${\displaystyle R}$ is said to be a determinantal ring over the commutative unital ring ${\displaystyle S}$ if it can be written as ${\displaystyle S/I}$ where ${\displaystyle I}$ is the ideal generated by the ${\displaystyle r\times r}$ minors of a ${\displaystyle p\times q}$ matrix ${\displaystyle M}$, for some ${\displaystyle p,q,r}$, such that that codimension of ${\displaystyle I}$ in ${\displaystyle S}$ is exactly ${\displaystyle (p-r+1)(q-r+1)}$.

Facts

• A determinantal ring of type ${\displaystyle (1,1)}$ over a regular ring is termed a complete intersection
• Any determinantal ring over a Cohen-Macaulay ring is Cohen-Macaulay