Remark on Compactness of Imbeddings in Weighted Spaces

We prove A r -weighted imbedding theorems for differential forms. These results can be used to study the weighted norms of the homotopy operator T from the Banach space L p D ∧ l to the Sobolev space W 1 p D ∧ l-1 l = 1 2 n, and to establish the basic weighted L p -estimates for differential forms.

## Abstract Calderon's extension theorem is a crucial tool in the proof of the compactneσs of the resolvent for the Maxwell operator, and whence this result is proved for domains with the strict cone property. However, the proof only requires an extension operator that extends __W__^2,2^‐functions

We extend the Littlewood᎐Paley theorem to L G , where G is a locally w compact Vilenkin group and w are weights satisfying the Muckenhoupt A p condition. As an application we obtain a mixed-norm type multiplier result on p Ž . L G and prove the sharpness of our result. We also obtain a sufficient co