On the basic sequence structure of variable exponent Lebesgue spaces
Abstract
We study the subsymmetric basic sequence structure of variable exponent Lebesgue spaces LP built from index functions P(0,∞] on σ-finite measure spaces (,,μ). Specifically, we prove that if P is bounded away from infinity, then any complemented subsymmetric basic sequence of LP is equivalent to the canonical basis of r for some r 1 in the essential range of P.
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