ANALOGUES OF NIELSEN'S AND MAGNUS'S THEOREMS FOR FREE BURNSIDE GROUPS OF PERIOD 3

V.S. Atabekyan; H.T. Aslanyan; H.A. Grigoryan; A.E. Grigoryan

doi:10.46991/PYSU:A/2017.51.3.217

ANALOGUES OF NIELSEN'S AND MAGNUS'S THEOREMS FOR FREE BURNSIDE GROUPS OF PERIOD 3

Authors

V.S. Atabekyan Chair of Algebra and Geometry, YSU, Armenia
H.T. Aslanyan Chair of Mathematical Cybernetics, RAU, Armenia
H.A. Grigoryan Chair of Mathematical Cybernetics, RAU, Armenia
A.E. Grigoryan Chair of Mathematical Cybernetics, RAU, Armenia

DOI:

https://doi.org/10.46991/PYSU:A/2017.51.3.217

Keywords:

Nielsen automorphism, Magnus’s property, tame automorphism, free Burnside group, free group

Abstract

We prove that the free Burnside groups $B(m,3)$ of period 3 and rank $m\geq1$ have Magnus's property, that is if in $B(m,3)$ the normal closures of $r$ and $s$ coincide, then $r$ is conjugate to $s$ or $s^{-1}$. We also prove that any automorphism of $B(m,3)$ induced by a Nielsen automorphism of the free group $F_m$ of rank $m$. We show that the kernel of the natural homomorphism $\text{Aut}(B(2,3)) \rightarrow GL_2(\mathbb{Z}_3)$ is the group of inner automorphisms of $B(2,3)$.

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Published

2017-12-15

How to Cite

Atabekyan, V., Aslanyan, H., Grigoryan, H., & Grigoryan, A. (2017). ANALOGUES OF NIELSEN’S AND MAGNUS’S THEOREMS FOR FREE BURNSIDE GROUPS OF PERIOD 3. Proceedings of the YSU A: Physical and Mathematical Sciences, 51(3 (244), 217–223. https://doi.org/10.46991/PYSU:A/2017.51.3.217