Gabriel–Rosenberg reconstruction theorem explained

In algebraic geometry, the Gabriel–Rosenberg reconstruction theorem, introduced in, states that a quasi-separated scheme can be recovered from the category of quasi-coherent sheaves on it.[1] The theorem is taken as a starting point for noncommutative algebraic geometry as the theorem says (in a sense) working with stuff on a space is equivalent to working with the space itself. It is named after Pierre Gabriel and Alexander L. Rosenberg.

See also

References

External links

Notes and References

  1. Brandenburg. Martin. 2013-10-22. Rosenberg's Reconstruction Theorem (after Gabber). 1310.5978. math.AG.