A Minimal Non-solvable Group of Homeomorphisms
Abstract
Let PL0(I) represent the group of orientation-preserving piecewise-linear homeomorphisms of the unit interval which admit finitely many breaks in slope, under the operation of composition. We find a non-solvable group W and show that W embeds in every non-solvable subgroup of PL0(I). We find mild conditions under which other non-solvable subgroups (B, ()∞, ()∞, and ∞()) embed in subgroups of PL0(I). We show that all solvable subgroups of PL0(I) embed in all non-solvable subgroups of PL0(I). These results continue to apply if we replace PL0(I) by any generalized R. Thompson group Fn.
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