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Non-Free Groups Generated by Two 2 X 2 Matrices

Published online by Cambridge University Press:  20 November 2018

J. L. Brenner ,
R. A. Macleod  and
D. D. Olesky
J. L. Brenner
Affiliation:
10 Phillips Road, Palo Alto, California;
R. A. Macleod
Affiliation:
10 Phillips Road, Palo Alto, California;
D. D. Olesky
Affiliation:
University of Victoria, Victoria, British Columbia
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Let m be any real or complex number, and let Gm be the group generated by the 2 X 2 matrices A = (1, m\ 0, 1) and B = (1, 0; m, 1), where we use the notation (C11, C12; c21, C22) to denote (by rows) the elements of a 2 X 2 matrix C. Thus, Gm is the set of all finite products (or words) of the form

Ah(3)Bh(2)Ah(1)

where the h(i) are nonzero integers with h﹛\) possibly zero. If a non-trivial word of this form equals the identity / = (1, 0; 0, 1), then Gm is non-free; otherwise, Gm is free.

Type
Research Article
Information
Canadian Journal of Mathematics , Volume 27 , Issue 2 , 01 April 1975 , pp. 237 - 245
Copyright
Copyright © Canadian Mathematical Society 1975

References

1. Brenner, J. L., Quelques groupes libres de matrices, C. R. Acad. Sci. Paris Sér. A-B. 2-1 (1955), 16891691.Google Scholar
2. Chang, B., Jennings, S. A., and Ree, R., On certain matrices which generate free groups, Can. J. Math. 10 (1958), 279284.Google Scholar
3. Fuchs-Rabinowitsch, D. J., On a certain representation of a free group, Leningrad State University Annals (Uchenye Zapiski), Math. Ser. 10 (1940), 154157.Google Scholar
4. Lyndon, R. C. and Ullman, J. L., Groups generated by two parabolic linear fractional transformations, Can. J. Math. 21 (1969), 13881403.Google Scholar
5. Ree, R., On certain pairs of matrices which do not generate a free group, Can. Math. Bull. 4 (1961), 4952.Google Scholar
6. Sanov, I. N., A property of a representation of a free group, Dokl. Akad. Nauk SSSR57 (1947), 657659.Google Scholar