Straightening Banach-Lie-group-valued almost-cocycles
Abstract
For a compact group G acting continuously on a Banach Lie group U, we prove that maps G U close to being 1-cocycles for the action can be deformed analytically into actual 1-cocycles. This recovers Hyers-Ulam stability results of Grove-Karcher-Ruh (trivial G-action, compact Lie G and U) and de la Harpe-Karoubi (trivial G-action, U:=invertible elements of a Banach algebra). The obvious analogues for higher cocycles also hold for abelian U.
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