Let $G$ be an abelian group. A subgroup $A$ of $G$ is said to be {\it purifiable} in $G$ if, among the pure subgroups of $G$ containing $A$, there exists a minimal one. Suppose that $A$ is purifiable in $G$ and $H$ is a pure subgroup of $G$ containing $A$. Then $A$ need not be purifiable in $H$. In this note, we ask for conditions that guarantee that $A$ is purifiable in the intermediate group $H$. First, we prove that if $A$ is a torsion--free purifiable subgroup of a group $G$ and $H$ is a direct summand of $G$ containing $A$, then $A$ is purifiable in $H$. Next, we characterize the pure subgroups $K$ of a group $G$ with the property that a torsion--free finite rank subgroup $A$ of $K$ is purifiable in $K$ if $A$ is purifiable in $G$.

Publié le : 2007-05-15
Classification:  purifiable subgroup,  pure hull,  strongly ADE decomposable group,  mixed basic subgroup,  20K21,  20K27

@article{1277472809,
     author = {OKUYAMA, Takashi},
     title = {Purifiability in pure subgroups},
     journal = {Hokkaido Math. J.},
     volume = {36},
     number = {4},
     year = {2007},
     pages = { 365-381},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1277472809}
}

OKUYAMA, Takashi. Purifiability in pure subgroups. Hokkaido Math. J., Tome 36 (2007) no. 4, pp.  365-381. http://gdmltest.u-ga.fr/item/1277472809/