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Interior Estimates for Elliptic Partial Differential Equations in the ℒ(q,λ) Spaces of Strong Type

Published online by Cambridge University Press:  20 November 2018

Akira Ono*
Affiliation:
Kyushu University, Fukuoka, Japan
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Recently the (q,λ) spaces have been investigated by many authors and the theory of these spaces has proved to be particularly important for research in partial differential equations (see for example [15], [16] and [18]).

The equations of elliptic type in these spaces were first studied by C. B. Morrey [8], [9], who applied his well-known imbedding theorems, and afterwards by S. Campanato [3], [4] with the aid of isomorphism theorems and the so-called fundamental inequalities due to him.

On the other hand, G. Stampacchia introduced the (q,λ) spaces of strong type [17], the structures of which are more general and complicated than those of (q,λ) Spaces in the usual sense, and greater part of them were characterized by him, L. C. Piccinini, Y. Furusho, the author and others (see [5], [11]-[14], [16] and [17]).

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1984

References

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