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Fréchet Envelopes of Nonlocally Convex Variable Exponent Hörmander Spaces

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  • Joaquín Motos
  • María Jesús Planells
  • César F. Talavera

Abstract

We show that the dual of the variable exponent Hörmander space is isomorphic to the Hörmander space (when the exponent satisfies the conditions , the Hardy-Littlewood maximal operator is bounded on for some and is an open set in ) and that the Fréchet envelope of is the space . Our proofs rely heavily on the properties of the Banach envelopes of the -Banach local spaces of and on the inequalities established in the extrapolation theorems in variable Lebesgue spaces of entire analytic functions obtained in a previous article. Other results for , , are also given (e.g., all quasi-Banach subspace of is isomorphic to a subspace of , or is not isomorphic to a complemented subspace of the Shapiro space ). Finally, some questions are proposed.

Suggested Citation

  • Joaquín Motos & María Jesús Planells & César F. Talavera, 2016. "Fréchet Envelopes of Nonlocally Convex Variable Exponent Hörmander Spaces," Abstract and Applied Analysis, Hindawi, vol. 2016, pages 1-9, November.
  • Handle: RePEc:hin:jnlaaa:1393496
    DOI: 10.1155/2016/1393496
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