Abstract
The following result has been recently proved by the author: Let E be a Frechet Schwartz space with unconditional basis and with continuous norm; let F be any infinite dimensional subspace of E. Then we can write E as where G and H do not have any subspace isomorphic to F. This theorem is extended here in two directions: (i)If E is a Montel Kothe sequence space (with certain additional assumptions which are satisfied by the examples described in the literature) and the subspace F is Montel non-Schwartz; (ii) If E is any Frechet Schwartz space with unconditional basis (so the existence of continuous norm is dropped) and F is not isomorphic to .
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