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Fourier approximation and embeddings of Sobolev spaces

D. E. Edmunds; V. B. Moscatelli — 1977

CONTENTSIntroduction............................................................................................................ 51. Preliminaries............................................................................................................. 82. Embedding into $W^{m, p} (Ω)$ into $L^{S} (Ω)$ (n>1).......................................... 103. The case n = 1.......................................................................................................... 284. Embedding $W^{m, p} (Ω)$ into $L^{φ} (Ω)$ ...............................................................

On exact sequences of quojections.

G. Metafune; V. B. Moscatelli — 1991

Revista Matemática de la Universidad Complutense de Madrid

We give some general exact sequences for quojections from which many interesting representation results for standard twisted quojections can be deduced. Then the methods are also generalized to the case of nuclear Fréchet spaces.

Complemented subspaces of sums and products of copies of L[0, 1].

A. A. Albanese; V. B. Moscatelli — 1996

Revista Matemática de la Universidad Complutense de Madrid

We prove that the direct sum and the product of countably many copies of L[0, 1] are primary locally convex spaces. We also give some related results.

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Fourier approximation and embeddings of Sobolev spaces

On exact sequences of quojections.

Complemented subspaces of sums and products of copies of L[0, 1].