Beata Randrianantoanina
Published 1998-12-09Version 1
We show that injective isometries in Orlicz space $L_M$ have to preserve disjointness, provided that Orlicz function $M$ satisfies $\Delta_2$-condition, has a continuous second derivative $M''$, satisfies another ``smoothness type'' condition and either $\lim_{t\to0} M''(t) = \infty$ or $M''(0) = 0$ and $M''(t)>0$ for all $t>0$. The fact that surjective isometries of any rearrangement-invariant function space have to preserve disjointness has been determined before. However dropping the assumption of surjectivity invalidates the general method. In this paper we use a differential technique.
Comments: 20 pages, 2 figures, to appear in the Proceedings of the Third Conference on Function Spaces held in Edwardsville in May 1998, Contemporary Math
On one class of Orlicz functions
The structure of subspaces in Orlicz spaces between $L^1$ and $L^2$
Modular convergence in $H$-Orlicz spaces of Banach valued functions
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