Continuity of discrete homomorphisms of diffeomorphism groups
Abstract
Let M and N be two closed C∞ manifolds and let Diffc(M) denote the group of C∞ diffeomorphisms isotopic to the identity. We prove that any (discrete) group homomorphism between Diffc(M) and Diffc(N) is continuous. We also show that a non-trivial group homomorphism : Diffc(M) Diffc(N) implies that (M) ≤ (N) and give a classification of such homomorphisms when (M) = (N).
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