Contractive Projections in Nonatomic Function Spaces

Abstract: Abstract. We prove that there is no 1-complemented subspaces of finite codimension in separable rearrangament-invariant function spaces.We study contractive projections onto finite-codimensional subspaces of real nonatomic function spaces. In general such projections are not common. It is well known that only In this paper we prove that in rearrangement-invariant nonatomic function spaces not isometric to L 2 there is no 1-complemented subspaces of any finite codimension.We use the terminology and notation as … Show more

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