The round Ideal Completion via Sobrification

@inproceedings{Lawson2008TheRI,
  title={The round Ideal Completion via Sobrification},
  author={J. C. Lawson},
  year={2008}
}
In this paper we consider an important order completion, the rounded-ideal completion, that has arisen in the modern theory of continuous domains. We show that it can be alternately viewed as a special case of a more general topo­ logical method of completion, namely taking the sobrification of a topological space. A number of important special caSes and examples are in­ cluded. 
9 Citations
13 References
Similar Papers

References

Publications referenced by this paper.
Showing 1-10 of 13 references

A Compendium of Continuous Lattices

  • G. Gierz, K. Hofmann, K. Keimel, J. Lawson, M. Mislove, D. Scott
  • Springer­ Verlag
  • 1980
Highly Influential
4 Excerpts

Sobrification of partially ordered sets

  • R.-E. Hoffmann
  • Semigroup Forum,
  • 1979

The duality of continuous posets

  • J. Lawson
  • Houston J. of Math.,
  • 1979

Similar Papers

Loading similar papers…