An observation of the subspaces of S'
Abstract
The spaces S'/ P equipped with the quotient topology and S'∞ equipped with the weak-* topology are known to be homeomorphic, where P denotes the set of all polynomials. The proof is a combination of the fact in the textbook by Treves and the well-known bipolar theorem. In this paper by extending slightly the idea employed in NNS15, we give an alternative proof of this fact and then we extend this proposition so that we can include some related function spaces.
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