Spaceability of the set of bounded linear non-absolutely summing operators in Quasi-Banach sequence spaces
Abstract
In the short note we prove that for every 0<p<1, there exists an infinite dimensional closed linear subspace of L( p;p) every nonzero element of which is non (r,s)-absolutely summing operator for the real numbers r,s with 1≤ s≤ r<∞. This improve a result obtained in DanielT.
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