Perturbation Method in Musielak-Orlicz Sequence Spaces
Abstract
We generalize an abstract variational principle in Banach spaces, introduced by Topalova \& Zlateva, by showing that the set P0 of perturbations for which a perturbed lower semi-continuous function f is WPMC (Well Posed Modulus Compact) not only contains a dense Gδ subset, but is also a complement to a σ-porous subset in a specifically defined positive cone. Moreover, if the space is a Musielak-Orlicz sequence space satisfying h, then the notion WPMC is replaced by the stronger notion of Tikhonov well posedness, which is proved to be equivalent to the single-valuedness and upper semi-continuity of the multivalued mapping assigning a parameter to the solution set. We give several applications. The first one is that the Musielak-Orlicz sequence spaces have the Radon-Nikodym property and, therefore, are dentable by proving the validity of Stegall's variational principle. As a consequence we obtain that the duals of Musielak-Orlicz sequence spaces are w*-Asplund. We establish also a sufficient condition for Musielak-Orlicz and Nakano sequence spaces to be Asplund spaces. The next applications are for determining the type of the smoothness of certain Musielak-Orlicz, Nakano, and weighted Orlicz sequence spaces. We illustrate by an example that it is possible to consider an Orlicz function without the 2 condition, by a particular choice of the weighted sequence \wn\n=1∞ to get M(w) hM(w) and to be able to apply the main result.
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