A question of Norton-Sullivan in the analytic case

Abstract

In 1996, A. Norton and D. Sullivan asked the following question: If f:T2→T2 is a diffeomorphism, h:T2→T2 is a continuous map homotopic to the identity, and h f=T h where ∈R2 is a totally irrational vector and T:T2→T2,\, z z+ is a translation, are there natural geometric conditions (e.g. smoothness) on f that force h to be a homeomorphism? In [ J. Wang and Z. Zhang, GAFA 2018 ], the first author and Z. Zhang gave a negative answer to the above question in the C∞ category: In general, not even the infinite smoothness condition can force h to be a homeomorphism. In this article, we give a negative answer in the Cω category: We construct a real-analytic conservative and minimal totally irrational pseudo-rotation of T2 that is semi-conjugate to a translation but not conjugate to a translation, which simultaneously answers a question raised in [ J. Wang and Z. Zhang, GAFA 2018 ].