# Article

Full entry | PDF   (0.8 MB)
References:
[1] M. Anderson: Subprojectable and locally flat lattice-ordered groups. University of Kansas Dissertation, 1977.
[2] M. Anderson and P. Conrad: Epicomplete $ł$-group. Algebra Universalis 12 (1981), 224–241. DOI 10.1007/BF02483881 | MR 0608666
[3] S. J. Bernau: Unique representations of archimedean lattice groups and normal archimedean lattice rings. Proc. London Math. Soc. 15 (1965), 599–631. MR 0182661
[4] S. J. Bernau: Lateral and Dedekind completion of archimedean lattice groups. J. London Math. Soc 12 (1976), 320–322. DOI 10.1112/jlms/s2-12.3.320 | MR 0401579 | Zbl 0333.06008
[5] P. Conrad: Lattice-Ordered Groups. Lecture Notes, Tulane University, 1970. Zbl 0258.06011
[6] P. Conrad: The essential closure of an Archimedean lattice-ordered group. Duke Math. J. 38 (1971), 151–160. MR 0277457 | Zbl 0216.03104
[7] P. Conrad and J. Martinez: Signature and discrete lattice-ordered groups. (to appear). MR 1101776
[8] J. Martinez: The hyper-archimedean kernel sequence of a lattice-ordered group. Bull. Austral. Math. Soc. 10 (1974), 337–349. DOI 10.1017/S0004972700041022 | MR 0349524 | Zbl 0275.06026
[9] Dao-Rong Ton: The structure of a complete $ł$-group. Czech. Math. J. (1993) (to appear). MR 1263123
[10] Dao-Rong Ton: Radical classes of $ł$-groups. International Journal of Mathematics and Mathematical Science 2(17) (1994), 361–374. MR 1255233
[11] E. C. Weinberg: Free lattice-ordered abelian groups II. Math. Annalen 159 (1965), 217–222. DOI 10.1007/BF01362439 | MR 0181668 | Zbl 0138.26201

Partner of