Continuous homomorphisms on piecewise absolutely continuous maps of S1
Abstract
Let IET(S1) be the group of interval exchange transformation of S1 and AC+(S1) be the group of absolutely continuous preserving orientation bijection with inverse absolutely continuous. We denote by ACI the group generated by IET(S1) and AC+(S1). Given a suitable distance on ACI, we classify all continuous homomorphisms :R ACI. More precisely, is conjugated to a continuous homomorphism :R AC+(i(S1)i).
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