2005, 2005(Special): 60-69. doi: 10.3934/proc.2005.2005.60

Semiconjugacy of quasiperiodic flows and finite index subgroups of multiplier groups

1. 

Department of Mathematics, Brigham Young University, Provo, UT 84602

Received  August 2004 Revised  May 2005 Published  September 2005

The multiplier group of a flow describes the types of generalized spacetime symmetries that the flow has. It will be shown that if an F-algebraic quasiperiodic flow is smoothly semiconjugate to flow generated by a constant vector field, then the second flow is F-algebraic quasiperiodic and its multiplier group is a finite index subgroup of the multiplier group of the first flow.
Citation: L. Bakker. Semiconjugacy of quasiperiodic flows and finite index subgroups of multiplier groups. Conference Publications, 2005, 2005 (Special) : 60-69. doi: 10.3934/proc.2005.2005.60
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