On 3-dimensional foliated dynamical systems and Hilbert type reciprocity law

Abstract

We show some fundamental results concerning 3-dimensional foliated dynamical systems (FDS3 for short) introduced by Deninger. Firstly, we give a decomposition theorem for an FDS3, which yields a classification of FDS3's. Secondly, for each type of the classification, we construct concrete examples of FDS3's. Finally, by using the integration theory for smooth Deligne cohomology, we introduce geometric analogues of local symbols and show a Hilbert type reciprocity law for an FDS3. Our results answer the question posed by Deninger.