Fedor Sukochev, Anna Tomskova
Published 2012-04-12Version 1
For two given symmetric sequence spaces $E$ and $F$ we study the $(E,F)$-multiplier space, that is the space all of matrices $M$ for which the Schur product $M\ast A$ maps $E$ into $F$ boundedly whenever $A$ does. We obtain several results asserting continuous embedding of $(E,F)$-multiplier space into the classical $(p,q)$-multiplier space (that is when $E=l_p$, $F=l_q$). Furthermore, we present many examples of symmetric sequence spaces $E$ and $F$ whose projective and injective tensor products are not isomorphic to any subspace of a Banach space with an unconditional basis, extending classical results of S. Kwapie\'{n} and A. Pe{\l}czy\'{n}ski and of G. Bennett for the case when $E=l_p$, $F=l_q$.
Compact subsets of $\Ps(\N)$ with applications to the embedding of symmetric sequence spaces into $C(α)$
A T(1)-Theorem in relation to a semigroup of operators and applications to new paraproducts
On ideals of polynomials and their applications
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