Perfect complex

In algebra, a perfect complex of modules over a commutative ring A is an object in the derived category of A-modules that is quasi-isomorphic to a bounded complex of finite projective A-modules.^[1] A perfect module is a module that is perfect when it is viewed as a complex concentrated at degree zero. For example, if A is Noetherian, a module over A is perfect if and only if it has finite projective dimension.

A compact object in the ∞-category of (say right) module spectra over a ring spectrum is often called perfect; ^[2] see also module spectrum.

See also

• Hilbert–Burch theorem
• Dualizable object

References

• http://stacks.math.columbia.edu/tag/0656

External links

• http://ncatlab.org/nlab/show/perfect+module