Noncommutative geometry on the Berkovich projective line

Abstract

We construct several C*-algebras and spectral triples associated to the Berkovich projective line P1Berk(Cp). In the commutative setting, we construct a spectral triple as a direct limit over finite R-trees. More general C*-algebras generated by partial isometries are also presented. We use their representations to associate a Perron-Frobenius operator and a family of projection valued measures. Finally, we show that invariant measures, such as the Patterson-Sullivan measure, can be obtained as KMS-states of the crossed product algebra with a Schottky subgroup of PGL2(Cp).

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