Volodin space

In mathematics, more specifically in topology, the Volodin space ${\displaystyle X}$ of a ring R is a subspace of the classifying space ${\displaystyle BGL(R)}$ given by

${\displaystyle X=\bigcup _{n,\sigma }B(U_n(R{)}^{\sigma })}$

where ${\displaystyle U_n(R)\subset G{L}_n(R)}$ is the subgroup of upper triangular matrices with 1's on the diagonal (i.e., the unipotent radical of the standard Borel) and ${\displaystyle \sigma }$ a permutation matrix thought of as an element in ${\displaystyle G{L}_n(R)}$ and acting (superscript) by conjugation.^[1] The space is acyclic and the fundamental group ${\displaystyle {\pi }_{1}X}$ is the Steinberg group ${\displaystyle \mathrm{St}(R)}$ of R. In fact, Template:Harvtxt showed that X yields a model for Quillen's plus-construction ${\displaystyle BGL(R)/X\simeq BG{L}^{+}(R)}$ in algebraic K-theory.

An analogue of Volodin's space where GL(R) is replaced by the Lie algebra ${\displaystyle 𝔤𝔩(R)}$ was used by Template:Harvtxt to prove that, after tensoring with Q, relative K-theory K(A, I), for a nilpotent ideal I, is isomorphic to relative cyclic homology HC(A, I). This theorem was a pioneering result in the area of trace methods.

Template:Reflist

• Template:Citation
• Template:Cite web
• Template:Citation
• Template:Citation, (Translation: Math. USSR Izvestija Vol. 5 (1971) No. 4, 859–887)

Template:Topology-stub