Planar Groups
Colin L. Starr1
and Galen E. III Turner2
1Department of Mathematics Willamette University 900 State Street Salem OR 97302 USA
2Program of Mathematics and Statistics Louisiana Tech University P.O. Box 3189 Ruston LA 71272 USA
2Program of Mathematics and Statistics Louisiana Tech University P.O. Box 3189 Ruston LA 71272 USA
DOI: 10.1023/B:JACO.0000030704.77583.7b
Abstract
In abstract algebra courses, teachers are often confronted with the task of drawing subgroup lattices. For purposes of instruction, it is usually desirable that these lattices be planar graphs (with no crossings). We present a characterization of abelian groups with this property. We also resolve the following problem in the abelian case: if the subgroup lattice is required to be drawn hierarchically (that is, in monotonic order of index within the group), when is it possible to draw the lattice without crossings?
Pages: 283–295
Keywords: graph; subgroup lattice; planar; abelian group
Full Text: PDF
References
1. A. Barlow, “Galois theory and applications,” Master's Thesis at Stephen F. Austin State University, 2000.
2. R. Diestel, Graph Theory, 2nd edition, Springer Graduate Texts in Mathematics, 2000.
3. I. Kaplansky, Infinite Abelian Groups, revised edition, University of Michigan Press, 1969.
4. K. Kuratowski, “Sur le probl`eme des courbes gauches en topologie,” Fund. Math. 15 (1930), 271-283.
5. C.R. Platt, “Planar lattices and planar graphs,” J. Comb. Theory Series B. 21 (1976), 30-39.
2. R. Diestel, Graph Theory, 2nd edition, Springer Graduate Texts in Mathematics, 2000.
3. I. Kaplansky, Infinite Abelian Groups, revised edition, University of Michigan Press, 1969.
4. K. Kuratowski, “Sur le probl`eme des courbes gauches en topologie,” Fund. Math. 15 (1930), 271-283.
5. C.R. Platt, “Planar lattices and planar graphs,” J. Comb. Theory Series B. 21 (1976), 30-39.