# Generalization of a connectedness result to cohomologically complete   intersections

**Authors:** Michael Hellus

arXiv: 1903.00874 · 2019-03-08

## TL;DR

This paper extends a classical connectedness result from set-theoretic complete intersections to cohomologically complete intersections, showing that disconnected punctured spectra imply low depth in a broader algebraic context.

## Contribution

It generalizes a key connectedness theorem from set-theoretic to cohomologically complete intersections using local cohomology properties.

## Key findings

- Disconnection of punctured spectra implies depth at most 1 for cohomologically complete intersections.
- Endomorphism ring of local cohomology modules is the ring itself, indicating indecomposability.
- The generalization is smooth and relies on properties of local cohomology in complete local rings.

## Abstract

It is a well-known result that, in projective space over a field, every set-theoretical complete intersection of positive dimension in connected in codimension one (Hartshorne [H1,3.4.6] or [H2, Theorem 1.3]). Another important connectedness result is that a local ring with disconnected punctured sprectrum has depth at most $1$ ([H1, Proposition 2.1]). The two results are related, Hartshorne calls the latter "the keystone to the proof" of the former (loc. cit).   In this short note we show that the latter result generalizes smoothly from set-theoretical to cohomologically complete intersections, i. e. to ideals for which there is in terms of local cohomology no obstruction to be a complete intersection ([HeSc1], [HeSc2]). The proof is based on the fact that, for cohomologically complete intersections over a complete local ring, the endomorphism ring of the (only) local cohomology cohomology module is the ring itself ([HeSt, Theorem 2.2 (iii)]) and hence indecomposable as a module.

## Full text

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## References

9 references — full list in the complete paper: https://tomesphere.com/paper/1903.00874/full.md

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Source: https://tomesphere.com/paper/1903.00874