On the structure of a class of archimedean lattice-ordered algebras

M. Henriksen; D. Johnson

Fundamenta Mathematicae (1961)

  • Volume: 50, Issue: 1, page 73-94
  • ISSN: 0016-2736

How to cite


Henriksen, M., and Johnson, D.. "On the structure of a class of archimedean lattice-ordered algebras." Fundamenta Mathematicae 50.1 (1961): 73-94. <http://eudml.org/doc/213636>.

author = {Henriksen, M., Johnson, D.},
journal = {Fundamenta Mathematicae},
keywords = {functional analysis},
language = {eng},
number = {1},
pages = {73-94},
title = {On the structure of a class of archimedean lattice-ordered algebras},
url = {http://eudml.org/doc/213636},
volume = {50},
year = {1961},

AU - Henriksen, M.
AU - Johnson, D.
TI - On the structure of a class of archimedean lattice-ordered algebras
JO - Fundamenta Mathematicae
PY - 1961
VL - 50
IS - 1
SP - 73
EP - 94
LA - eng
KW - functional analysis
UR - http://eudml.org/doc/213636
ER -

Citations in EuDML Documents

  1. Anthony W. Hager, Lewis C. Robertson, Extremal units in an archimedean Riesz space
  2. Anthony W. Hager, Jorge Martinez, Functorial approximation to the lateral completion in archimedean lattice-ordered groups with weak unit
  3. Kaori Yamazaki, A proof for the Blair-Hager-Johnson theorem on absolute z -embedding
  4. Sudip Kumar Acharyya, Dibyendu De, An interesting class of ideals in subalgebras of C ( X ) containing C * ( X )
  5. Anthony W. Hager, Local/global uniform approximation of real-valued continuous functions
  6. A. W. Hager, D. G. Johnson, Some comments and examples on generation of (hyper-)archimedean -groups and f -rings
  7. G. De Marco, Projectivity of pure ideals
  8. Lothar Redlin, Saleem Watson, Structure spaces for rings of continuous functions with applications to realcompactifications
  9. F. Montalvo, Antonio A. Pulgarín, Batildo Requejo Fernández, Closed ideals in topological algebras: a characterization of the topological Φ -algebra C k ( X )
  10. Anthony W. Hager, Chawne M. Kimber, Warren W. McGovern, Unique a -closure for some -groups of rational valued functions

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