Free Zp-actions on the three dimensional torus
Abstract
We show that for each natural p≥ 2, the Lefschetz fixed point theorem is optimal when applied to Zp-actions by homeomorphisms on the three dimensional torus T3. More precisely, we show that for a spectrally unitary Zp-action A on the first homology group H1( T3, Z) with trivial fixed point set, there exists a free Zp-action by real analytic diffeomorphisms of T3 whose induced Zp-action on H1( T3, Z) is the action A. In particular, we establish the normal form for this type of actions.
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