Generalized Small Cancellation Theory
Abstract
We present four generalized small cancellation conditions for finite presentations and solve the word- and conjugacy problem in each case. Our conditions and contain the non-metric small cancellation cases C(6), C(4)T(4), C(3)T(6) (see [LS]) but are considerably more general. also contains as a special case the small cancellation condition of Juhasz [J2]. If a finite presentation satisfies or then it has a quadratic isoperimetric inequality and therefore solvable word problem. For the class this was first observed by Gersten in [G7] which also contains an idea of the proof. Our main result here is the proof of the conjugacy problem for the classes and which uses the geometry of non-positively curved piecewise Euclidean complexes developed by Bridson in [Bri]. The conditions and generalize the small cancellation conditions C(7), C(5)T(4), C(4)T(5), C(3)T(7). If a finite presentation satisfies the condition or , then it has a linear isoperimetric inequality and hence the group is hyperbolic.
Keywords
Cite
@article{arxiv.math/9509206,
title = {Generalized Small Cancellation Theory},
author = {Stephan Rosebrock and Gunter Huck},
journal= {arXiv preprint arXiv:math/9509206},
year = {2009}
}
Comments
PostScript file, 27 pages