Hanna Neumann conjecture
This article is about a conjecture in the following area in/related to group theory: presentation theory. View all conjectures and open problems
This conjecture was made/proposed by: Hanna Neumann
Statement
Let and be finitely generated nontrivial subgroups of a free group. Then:
Progress towards the conjecture
Neumann's own work
Hanna Neumann, in her paper On the intersection of finitely generated free groups, proved the following:
Let and be finitely generated nontrivial subgroups of a free group. Then:
She then asked whether the factor of 2 can be dropped.
Offshoots
Myasnikov has raised the following question:
Let , be positive integers, and and nontrivial finitely generated subgroups of a free group such that and . Which numbers between 1 and can be realized as ? In particular, can be realized?
References
- On the intersection of finitely generated free groups by Hanna Neumann, Publ. Math. Debrecen 4 (1955-56) 186-169
- On the intersection of finitely generated subgroups of a free group by Robert G. Burns, Math Z. 119 (1971), 121-130
- On intersections of finitely generated subgroups of free groups by Walter D. Neumann, Groups-Canberra 1989, Lecture Notes in Mathematics Vol. 1456