Stable range condition

In mathematics, particular in abstract algebra and algebraic K-theory, the stable range of a ring ${\displaystyle R}$ is the smallest integer ${\displaystyle n}$ such that whenever ${\displaystyle v_{0},v_{1},...,v_{n}}$ in ${\displaystyle R}$ generate the unit ideal (they form a unimodular row), there exist some ${\displaystyle t_{1},...,t_{n}}$in ${\displaystyle R}$ such that the elements ${\displaystyle v_{i}-v_{0}t_{i}}$ for ${\displaystyle 1\leq i\leq n}$ also generate the unit ideal.

If ${\displaystyle R}$ is a commutative Noetherian ring of Krull dimension ${\displaystyle d}$ , then the stable range of ${\displaystyle R}$ is at most ${\displaystyle d+1}$ (a theorem of Bass).

Bass stable range

The Bass stable range condition ${\displaystyle SR_{m}}$  refers to precisely the same notion, but for historical reasons it is indexed differently: a ring ${\displaystyle R}$  satisfies ${\displaystyle SR_{m}}$  if for any ${\displaystyle v_{1},...,v_{m}}$  in ${\displaystyle R}$  generating the unit ideal there exist ${\displaystyle t_{2},...,t_{m}}$  in ${\displaystyle R}$  such that ${\displaystyle v_{i}-v_{1}t_{i}}$  for ${\displaystyle 2\leq i\leq m}$  generate the unit ideal.

Comparing with the above definition, a ring with stable range ${\displaystyle n}$  satisfies ${\displaystyle SR_{n+1}}$ . In particular, Bass's theorem states that a commutative Noetherian ring of Krull dimension ${\displaystyle d}$  satisfies ${\displaystyle SR_{d+2}}$ . (For this reason, one often finds hypotheses phrased as "Suppose that ${\displaystyle R}$  satisfies Bass's stable range condition ${\displaystyle SR_{d+2}}$ ...")

Stable range relative to an ideal

Less commonly, one has the notion of the stable range of an ideal ${\displaystyle I}$  in a ring ${\displaystyle R}$ . The stable range of the pair ${\displaystyle (R,I)}$  is the smallest integer ${\displaystyle n}$  such that for any elements ${\displaystyle v_{0},...,v_{n}}$  in ${\displaystyle R}$  that generate the unit ideal and satisfy ${\displaystyle v\equiv 1}$  mod ${\displaystyle I}$  and ${\displaystyle v_{i}\equiv 0}$  mod ${\displaystyle I}$  for ${\displaystyle 0\leq i\leq n-1}$ , there exist ${\displaystyle t_{1},...,t_{n}}$  in ${\displaystyle R}$  such that ${\displaystyle v_{i}-v_{0}t_{i}}$  for ${\displaystyle 1\leq i\leq n}$  also generate the unit ideal. As above, in this case we say that ${\displaystyle (R,I)}$  satisfies the Bass stable range condition ${\displaystyle SR_{n+1}}$ .

By definition, the stable range of ${\displaystyle (R,I)}$  is always less than or equal to the stable range of ${\displaystyle R}$ .

References

• Charles Weibel, The K-book: An introduction to algebraic K-theory

• H. Chen, Rings Related Stable Range Conditions, Series in Algebra 11, World Scientific, Hackensack, NJ, 2011. [1]

External links

• Bass' stable range condition for principal ideal domains